Posts by Radu Precup

Abstract

In this paper we discuss the localization and the multiplicity of solutions for the stationary Stokes system with variable viscosity and a reaction force term. The results obtained apply to systems with strongly oscillating periodic viscosity and the corresponding homogenized systems.

Authors

Renata Bunoiu
University of Lorraine, Metz, France

Radu Precup
Faculty of Mathematics and Computer Science and Institute of Advanced Studies in Science and Technology, Babes-Bolyai, University, Cluj-Napoca, Romania
Tiberiu Popoviciu Institute of Numerical Analysis, Romanian Academy, Romania

Keywords

Stokes system, localization and multiplicity of solutions, fixed point method, homogenization

Paper coordinates

R. Bunoiu, R. Precup, Localization and multiplicity for stationary Stokes systems with variable viscosity, Communications in Mathematical Analysis and Applications, (2025), 1-28, https://dx.doi.org/10.2139/ssrn.4887415

PDF

About this paper

Journal

Communications in Mathematical Analysis and Applications

Publisher Name

DOI

https://dx.doi.org/10.2139/ssrn.4887415

Print ISSN

Online ISSN

google scholar link

[1] Allaire, G., Ghosh, T., Vanninathan, M.: Homogenization of Stokes System using Bloch Waves. Netw. Heterog. Media 12(4), 525–550 (2017)

[2] Bunoiu, R., Cardone, G., Kengne, R., Woukeng, J.L.: Homogenization of 2D Cahn-Hilliard-Navier-Stokes system. J. Elliptic Parabol. Equ. 6, 377–408 (2020)

[3] Bunoiu, R., Precup, R.: Vectorial Approach to Coupled Nonlinear Schrödinger Systems under Nonlocal Cauchy Conditions. Appl. Anal. 95(4), 731–747 (2016)

[4] Bunoiu, R., Precup, R.: Localization and multiplicity in the homogenization of nonlinear problems. Adv. Nonlinear Anal. 9, 292–304 (2020)

[5] Colli, P., Gilardi, G., Marinoschi, G.: Global solution and optimal control of an epidemic propagation with a heterogeneous diffusion. Appl. Math. Optim. 89 (2024)

[6] Cai, Z., Wang, Y.: Pseudostress-velocity formulation for incompressible Navier-Stokes equations. Int. J. Numer. Methods Fluids 63(3), 341–356 (2010)

[7] Camaño, J., Gatica, G.N., Oyarzúa, R., Tierra, G.: An augmented mixed finite element method for the Navier-Stokes equations with variable viscosity. SIAM J. Numer. Anal. 54(2), 1069–1092 (2016)

[8] Cardone, G., Fares, R., Panasenko, G.P.: Asymptotic expansion of the solution of the steady Stokes equation with variable viscosity in a two-dimensional tube structure. J. Math. Phys. 53 (2012)

[9] Codina, R., Soto, O.: Finite element solution of the Stokes problem with dominating Coriolis force. Comput. Methods Appl. Mech. Engrg. 142, 215–234 (1997)

[10] Constantin, P., Foiaş, C.: Navier-Stokes Equations (1988)

[11] Fares, R., Panasenko, G.P., Stavre, R.: A viscous fluid flow through a thin channel with mixed rigid-elastic boundary: Variational and asymptotic analysis. Abstr. Appl. Anal. 2012 (2012)

[12] Gahn, M., Neuss-Radu, M., Knabner, P.: Homogenization of reaction-diffusion processes in a two-component porous medium with nonlinear flux conditions at the interface. SIAM J. Appl. Math. 76, 1819–1843 (2016)

[13] Gilbarg, D., Trudinger, N.S.: Elliptic Partial Differential Equations of Second Order (1998)

[14] Girault, V., Raviart, P.-A.: Finite Element Approximation of the Navier-Stokes Equations (1981)

[15] Jost, J.: Partial Differential Equations (2007)

[16] Kohr, M., Mikhailov, S.E., Wendland, W.L.: Potentials and transmission problems in weighted Sobolev spaces for anisotropic Stokes and Navier-Stokes systems with L$^\infty$ strongly elliptic coefficient tensor. Complex Var. Elliptic Equ. 66, 109–140 (2020)

[17] Lee, S., Ryi, S.-K., Lim, H.: Solutions of Navier-Stokes equation with Coriolis force. Adv. Math. Phys. 2017, Article ID 7042686, 1–9 (2017)

[18] Lukaszewicz, G., Kalita, P.: Navier-Stokes Equations (2016)

[19] Neuss-Radu, M., Jäger, W.: Effective Transmission Conditions for Reaction-Diffusion Processes in Domains Separated by an Interface. SIAM J. Math. Anal. 39, 687–720 (2007)

[20] Panasenko, G.P., Stavre, R.: Asymptotic analysis of the Stokes flow with variable viscosity in a thin elastic channel. Netw. Heterog. Media 5(4), 783–812 (2010)

[21] Perov, A.I.: On the Cauchy problem for a system of ordinary differential equations. Pviblizhen. Met. Reshen. Differ. Uvavn. 2, 115–134 (1964)

[22] Precup, R.: The role of matrices that are convergent to zero in the study of semilinear operator systems. Math. Comput. Modell. 49, 703–708 (2009)

[23] Precup, R.: Moser-Harnack inequality, Krasnosel’skii type fixed point theorems in cones and elliptic problems. Topol. Methods Nonlinear Anal. 40, 301–313 (2012)

[24] Precup, R.: Nash-type equilibria and periodic solutions to nonvariational systems. Adv. Nonlinear Anal. 3, 197–207 (2014)

[25] Sohr, H.: The Navier-Stokes Equations (2001)

[26] Stan, A.: Nonlinear systems and Nash type equilibria. 66, 397–408 (2021)

[27] Temam, R.: Navier-Stokes Equations and Nonlinear Functional Analysis (1995)

Paper (preprint) in HTML form

Localization and multiplicity for stationary Stokes systems with variable viscosity

Renata

\text{Bunoiu}^{*}

University of Lorraine, CNRS, IECL, F-57000, Metz, France
renata.bunoiu@univ-lorraine.fr Radu Precup
Institute of Advanced Studies in Science and Technology STAR-UBB,
Babeş-Bolyai University &
Tiberiu Popoviciu Institute of Numerical Analysis, Romanian Academy,
Cluj-Napoca, Romania
r.precup@math.ubbcluj.ro

Abstract

¹¹12020 Mathematics Subject Classification : 35Q30, 47J05 Key words: Stokes system, localization and multiplicity of solutions, fixed point method, homogenization

*

corresponding author

1 Introduction

In fluid mechanics, Stokes system describes the linear flow of a viscous fluid. The case of a constant viscosity was extensively studied in the literature (see for instance [14], [10], and [27]). The aim of this paper is to study the localization, multiplicity and homogenization for stationary Stokes systems with variable viscosity in bounded domains. The viscosity is a characteristic of the nature of the fluid and in our case it is supposed to depend on the position. This describes the variable properties of the fluid, as for instance in the case of complex multiphase flow. As applications of such flow one can mention a wide range of engineering problems such as power generation, water treatment, water desalination, refrigeration and air conditioning, and carbon capture and sequestration. We may refer the reader to [20], [8], [11] for the Stokes flow with variable viscosity in thin domains, and to [1], [2] for homogenization results.

We start our study with the Stokes system (2.1) in pseudo-stress-velocity formulation (see for instance [6], [7], and [16]), modeling the steady-state motion under an external force $f$ , of an incompressible fluid with variable viscosity $\mu$ , where $u$ represents the velocity of the fluid and $p$ is the pressure. Our first objective is to study the localization and the multiplicity of the solution for a system similar to (2.1), if the right-hand side in the first equation depends in a nonlinear manner on the velocity (see (2.11)). From the physical point of view, this corresponds to a reaction external force. A first practical application of our study is to find a velocity dependent reaction force which guarantees that each component of the velocity stays bounded between two a priori given bounds. A second application is to find bounds for the velocity when the reaction external force is given.

In general, two essential tools for proving the localization and multiplicity are the maximum principle and Moser-Harnack type inequalities (see [23]). In order to compensate the loss of these tools in the case of Stokes system, the idea is to associate to system (2.1) (and thus to system (2.11)) a diffusion problem. To do so, we notice that in (2.1) the term $\nabla p$ can be seen as a correction of the external force $f$ , in order to keep the incompressibility of the fluid. Through the system (2.6) we associate to $\nabla p$ the function $q$ , which can be seen as a correction of the velocity $u$ and then we define $w=u+q$ , which solves the diffusion problem (2.7) and so $w$ can be interpreted as the recovered velocity for problem (2.1), under the external force $f$ and a constant pressure. Consequently, following this idea, we can match a Stokes system with variable viscosity and a corresponding diffusion problem with diffusion coefficients varying with space (see for instance [5]). Once we do this, we prove localization and multiplicity results for the diffusion problem, which will give localization and multiplicity results for the recovered velocity of the Stokes system.

Except for the case of the Navier-Stokes system, where the velocity-dependent convective term can be seen as a reaction force, and for the case of the Coriolis force (see, e.g., [9], [17]), up to our knowledge, there are few mathematical studies in the literature on Stokes systems with a more general reaction force. In this paper we first consider nonlinear reaction forces of the type $\ h\left(x,u\left(x\right)+q\left(x\right)\right)$ (see (2.11)). Thus the external force $h$ is sensitive to the recovered velocity $\ w=u+q\$ incorporating both velocity $u$ and pressure $p$ (the last one by means of $q$ , which is a correction of the velocity). The main result concerning this first system in given in Theorem 4. Then, we consider the special case of planar Stokes systems with a constant pressure, namely such that $\nabla p=0.$ We start by giving a sufficient condition on the right-hand side, which guarantees that the pressure of the planar Stokes system is constant. Then we are able to discuss the case of velocity-dependent reaction forces, to localize the velocity $u$ itself, and to obtain multiple solutions with distinct velocity components. The main result concerning this second case in given in Theorem 11. Following the ideas in our previous work [4], we end this paper by giving localization and multiplicity results for the two previous cases, under the hypothesis that the viscosity is highly heterogeneous, being an $\varepsilon$ -periodic function on each spatial direction, with $\varepsilon$ a small positive parameter that we will let tend to zero. From the physical point of view, this situation modelizes for instance a particular mixture of fluids. We refer to [1] for the homogenization of the Stokes system in pseudo-stress-velocity formulation with $\varepsilon$ -periodic viscosity. For homogenization problems with nonlinear reaction terms we refer for instance to [19] and [12]. Localization and multiplicity results for a nonlinear right-hand side in the homogenization context are given in Theorem 15 and Theorem 17.

The paper is organized as follows. In Section 2 we state the problem and we give some preliminary results. Section 3 deals with the localization and multiplicity results for the two cases under study. In Section 4 we give analogous results in the periodic homogenization context.

2 Statement of the problem and preliminary results

We consider the mathematical model for the steady-state motion of an incompressible fluid with variable viscosity given by the pseudo-stress-velocity formulation Stokes system (2.1) below

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu\left(x\right)\nabla u% \right)+\nabla p=f\left(x\right)&\text{in }\Omega\\ \operatorname{div}\,u=0&\text{in }\Omega\\ u=0&\text{on }\partial\Omega.\end{array}\right.

(2.1)

Here $\Omega\subset\mathbb{R}^{n}\$ ( $n\geq 2$ ) is a $C^{2}$ bounded open set, $\mu\in C^{1}\left(\overline{\Omega}\right)$ with $0<\underline{\mu}\leq\mu\left(x\right)\leq\overline{\mu}$ and $f=\left(f_{1},..,f_{n}\right)\in L^{2}\left(\Omega;\mathbb{R}^{n}\right)$ . Physically, there are relevant the cases $n=2$ and $n=3,$ where $\mu\left(x\right)$ stands for the variable viscosity of the fluid, $f\left(x\right)$ for the external force, the unknown functions $u$ and $p$ are the velocity and pressure, respectively, while the condition $\operatorname{div}\,u=\sum_{i=1}^{n}\partial_{x_{i}}u_{i}=0$ means that the fluid is incompressible. On the boundary of the domain $\Omega$ we consider no-slip condition.

It is known (see, e.g., [10], [14], [18], [25], [27]) that a weak solution exists and is unique, that is a pair $\left(u,p\right)$ with $u\in H_{0}^{1}\left(\Omega;\mathbb{R}^{n}\right),$ $\operatorname{div}\,u=0,$ $p\in L^{2}\left(\Omega\right)$ , $p$ being unique up to an additive constant, and

\left(\left(u,v\right)\right)_{H_{0}^{1}}+\left(p,\operatorname{div}\,v\right)% _{L^{2}}=\left(f,v\right)_{L^{2}}\ \ \ \text{for all }v\in H_{0}^{1}\left(% \Omega;\mathbb{R}^{n}\right),

(2.2)

where $~{}\left(\left(u,v\right)\right)_{H_{0}^{1}}=\int_{\Omega}\mu\left(x\right)% \nabla u\cdot\nabla v\,dx$ . By $\ \nabla u\cdot\nabla v$ we mean $\ \sum\limits_{i=1}^{n}\nabla u_{i}\cdot\nabla v_{i}$ and $\ \left(f,v\right)_{L^{2}}=\sum\limits_{i=1}^{n}\left(f_{i},v_{i}\right)_{L^{2% }}.~{}$ Also $u$ is the unique function in $V=\left\{v\in H_{0}^{1}\left(\Omega;\mathbb{R}^{n}\right):\ \operatorname{div}% \,v=0\right\}$ satisfying

\left(\left(u,v\right)\right)_{H_{0}^{1}}-\left(f,v\right)_{L^{2}}=0\ \ \ % \text{for all \ }v\in V.

(2.3)

Indeed, for any $p\in L^{2}\left(\Omega\right)$ one has $\nabla p$ $\in H^{-1}\left(\Omega;\mathbb{R}^{n}\right)$ and $\left(\nabla p,v\right)=\left(p,\operatorname{div}\,v\right)_{L^{2}}=0$ for all $v\in V.$ Thus we may define $S$ , the velocity operator given by

S:L^{2}\left(\Omega;\mathbb{R}^{n}\right)\rightarrow V,\ \ \ \ \ Sf:=u_{f},

(2.4)

where $u_{f}$ is the unique solution in $V$ solving problem (2.3).

In addition, according for instance to [14, Theorem 5.3], we have that if $J\left(v,q\right)$ is defined by

J\left(v,q\right)=\int_{\Omega}\left(\frac{1}{2}\mu\left(x\right)\left|\nabla v% \right|^{2}-f\cdot v-q\operatorname{div}\,v\right)dx\ \ \ \left(v\in H_{0}^{1}% \left(\Omega;\mathbb{R}^{n}\right),\ q\in L^{2}\left(\Omega\right)\right),

then

J\left(u,p\right)=\inf_{v\in H_{0}^{1}\left(\Omega;\mathbb{R}^{n}\right)}\sup_% {q\in L^{2}\left(\Omega\right)}J\left(v,q\right)

and $u$ minimizes in $V$ the functional

J_{V}\left(v\right)=\int_{\Omega}\left(\frac{1}{2}\mu\left(x\right)\left|% \nabla v\right|^{2}-f\cdot v\right)dx\ \ \ \left(v\in V\right).

Denoting $\ Lv:=-\operatorname{div}\left(\mu\left(x\right)\nabla v\right),$ we define the operator $\ L^{-1}:H^{-1}\left(\Omega;\mathbb{R}^{n}\right)\rightarrow H_{0}^{1}\left(% \Omega;\mathbb{R}^{n}\right)$ where $\ L^{-1}f=v_{f},\$ with $\ v_{f}\in H_{0}^{1}\left(\Omega;\mathbb{R}^{n}\right)$ solving the Dirichlet problem

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu\left(x\right)\nabla v_{% f}\right)=f\left(x\right)&\text{in }\Omega\\ v=0&\text{on }\partial\Omega.\end{array}\right.

(2.5)

Letting $\ q:=L^{-1}\nabla p$ for $\nabla p$ as in (2.1), one has

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu\left(x\right)\nabla q% \right)=\nabla p&\text{in }\Omega\\ q=0&\text{on }\partial\Omega.\end{array}\right.

(2.6)

We define $w=u+q$ and let Pr ${}_{V}\$ be the projection operator on $V$ . Then, by using (2.6), the system (2.1) can be rewritten under the equivalent form of a diffusion problem with a variable diffusion coefficient

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu\left(x\right)\nabla w% \right)=f\left(x\right)&\text{in }\Omega\\ w=0&\text{on }\partial\Omega\end{array}\right.

(2.7)

or alternatively

\left\{\begin{array}[]{ll}Lw=f\left(x\right)&\text{in }\Omega\\ w=0&\text{on }\partial\Omega.\end{array}\right.

(2.8)

Indeed, if $w\in H_{0}^{1}\left(\Omega;\mathbb{R}^{n}\right)$ solves (2.8), then the pair $\left(u,p\right)$ where $u=$ Pr ${}_{V}w$ and $\nabla p=L\left(w-u\right)$ solves the Stokes system (2.1). Let us notice that the existence and the uniqueness of the solution of problem (2.8) is a direct consequence of the Lax-Milgram theorem.

If in the case of system (2.1), $\nabla p$ can be seen as an intrinsic correction of the external force $f$ in order to keep the incompressibility of the fluid, in case of system (2.8), we may see the term $q$ as a correction of the velocity due to the pressure and which is also necessary to express the incompressibility. Thus $w=u+q$ can be seen as the recovered velocity under the external force $f$ and a constant pressure, or equivalently as the density of a diffusion process governed by the source density $f.$ As regards the relationship between $p$ and $q,$ namely the equality $q=L^{-1}\nabla p,$ by which the pressure $p$ is covered into a velocity, we note that $q$ appears as the solution of the Dirichlet problem (2.6), that is, in terms of diffusion, as a diffusion density due to the source density $\nabla p.$

By associating a diffusion problem to the Stokes model, we are able to compensate the loss in case of the Stokes problem of the maximum principle and of Moser-Harnack type inequalities, some essential tools for the localization and multiplicity of solutions (see [23]), which are the main objectives of our paper. By means of this association, we can however discuss the multiplicity of solutions for the Stokes problem with a reaction force. Let us notice that except for the case of the Navier-Stokes system, where the velocity-dependent convective term $(u\cdot\nabla)u$ can be seen as a reaction force, and for the case of the inertial Coriolis force $\omega\times u$ (see, e.g., [9], [17]), up to our knowledge, there are few mathematical studies in the literature on Stokes systems with a more general reaction force. In this paper we consider nonlinear reaction forces of the type $\ h\left(x,u\left(x\right)+q\left(x\right)\right)$ , with $q=L^{-1}\nabla p$ . Thus the external force $h$ is sensitive to the recovered velocity $\ w=u+q\$ and incorporates both the velocity and the pressure of the Stokes system, by means of the correction function $q$ (see (2.11)).

Coming back to the association between a diffusion problem and the Stokes system, we remark that if for the reaction-diffusion problem

\left\{\begin{array}[]{ll}Lw=h\left(x,w\left(x\right)\right)&\text{in }\Omega% \\ w=0&\text{on }\partial\Omega,\end{array}\right.

(2.9)

we are able to localize two solutions $w$ and $\overline{w}$ in the following form

	$\displaystyle r$	$\displaystyle\leq$	$\displaystyle w\left(x\right)\ \ \text{for a.e. }x\in\Omega^{\prime},\ \ 0\leq w% \left(x\right)\leq R\text{ \ for a.e. }x\in\Omega;$		(2.10)
	$\displaystyle\overline{r}$	$\displaystyle\leq$	$\displaystyle\overline{w}\left(x\right)\ \ \text{for a.e. }x\in\Omega^{\prime}% ,\ \ 0\leq\overline{w}\left(x\right)\leq\overline{R}\text{ \ for a.e. }x\in\Omega,$

where $\Omega^{\prime}\subset\subset\Omega$ is a subdomain of $\Omega,$ the vectors $r,\overline{r},R,\overline{R}$ belong to $\mathbb{R}_{+}^{n}$ with $0<r<R\lvertneqq\overline{r}<\overline{R},$ and the inequalities are understood component-wise, then the corresponding solutions $\left(u,p\right),$ $\left(\overline{u},\overline{p}\right)$ of the reaction Stokes system

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu\left(x\right)\nabla u% \right)+\nabla p=h\left(x,u\left(x\right)+q\left(x\right)\right)&\text{in }% \Omega\\ \operatorname{div}\,u=0&\text{in }\Omega\\ u=0&\text{on }\partial\Omega\end{array}\right.

(2.11)

are distinct. Indeed, if the solutions are not distinct we have $\ w=u+q=\overline{u}+\overline{q}=\overline{w}$ $\left(u=\text{Pr}_{V}w,\,\overline{u}=\text{Pr}_{V}\overline{w},\,q=L^{-1}% \nabla p,\,\overline{q}=L^{-1}\nabla\overline{p}\right),$ which is clearly excluded by the localization relations (2.10), in view of the relation $\ R\lvertneqq\overline{r}.$

In what follows, the localization of solutions will be given in the set $D_{rR}$ defined by

D_{rR}=\left\{w\in H_{0}^{1}\left(\Omega;\mathbb{R}^{n}\right):\ r\leq w\left(% x\right)\ \ \text{for a.e. }x\in\Omega^{\prime},\ \ 0\leq w\left(x\right)\leq R% \text{ \ for a.e. }x\in\Omega\right\}.

(2.12)

For $i\in\left\{1,..,n\right\},$ we shall also use the notation

D_{r_{i}R_{i}}=\left\{w_{i}\in H_{0}^{1}\left(\Omega\right):\ r_{i}\leq w_{i}% \left(x\right)\ \ \text{for a.e. }x\in\Omega^{\prime},\ \ 0\leq w_{i}\left(x% \right)\leq R_{i}\text{ \ for a.e. }x\in\Omega\right\}.

Notice that in general system (2.9) does not have a variational form. However, each of its equations has one. Thus we may consider the partial energy functionals of (2.9), namely the functionals $\ J_{i}:H_{0}^{1}\left(\Omega;\mathbb{R}^{n}\right)\rightarrow\mathbb{R}\ \ % \left(i=1,..,n\right),$ defined by

J_{i}\left(w\right)=\int_{\Omega}\left(\frac{1}{2}\mu\left(x\right)\left|% \nabla w_{i}\right|^{2}-\int_{0}^{w_{i}\left(x\right)}h_{i}\left(x,w_{1}\left(% x\right),..,w_{i-1}\left(x\right),\tau_{i},w_{i+1}\left(x\right),..,w_{n}\left% (x\right)\right)d\tau_{i}\right)dx,

which will allow to characterize the solution $w$ of the stationary model (2.9) in terms of Nash equilibrium.

To end this introductory section we recall some basic results from the theory of linear elliptic equations and the theory of matrices.

(R1) If $f(x)\geq 0$ for a.e. $x\in\Omega$ , then the weak maximum principle (see for instance [13, Theorem 8.1]) guarantees that the solution $w=L^{-1}f$ of problem (2.8) satisfies $w\left(x\right)\geq 0$ a.e. in $\Omega.$

(R2) If $f\in L^{\infty}(\Omega)$ then, according to [13, Theorem 8.15], the solution $w$ of problem (2.8) belongs to $L^{\infty}(\Omega)$ and there is a constant $\Gamma_{f}$ independent of $\mu$ which satisfies $0<\underline{\mu}\leq\mu\left(x\right)\leq\overline{\mu},$ such that

\left\|w\right\|_{L^{\infty}(\Omega)}\,\leq\Gamma_{f}.

(R3) For each $f\in L^{\infty}\left(\Omega\right)$ with $f\geq 0$ in $\Omega$ and $f>0$ on a subset of nonzero measure of $\Omega,$ there exists $\gamma_{f}>0$ such that the solution $w$ of problem (2.8) verifies $\ w\left(x\right)\geq\gamma_{f}\$ for a.e. $x$ in the fixed subdomain $\Omega^{\prime}\subset\subset\Omega.$ For $\mu$ which satisfies $0<\underline{\mu}\leq\mu\left(x\right)\leq\overline{\mu},$ the constant $\ \gamma_{f}$ can be chosen to be independent of $\mu$ (see [15, Theorem 12.1.2]).

For a square matrix $\mathcal{M}$ with nonnegative entries, the spectral radius $\rho\left(\mathcal{M}\right)$ is the maximum of the modulus of its eigenvalues $\lambda,$ i.e., of all $\lambda\in\mathbb{C}$ with $\ \det\left(\mathcal{M}-\lambda I\right)=0.$ There are known the following characterizations of such kind of matrices:

(a) $\mathcal{M}^{k}$ tends to the zero matrix as $k\rightarrow\infty;$

(b) The matrix $I-\mathcal{M}$ is invertible and the entries of $\left(I-\mathcal{M}\right)^{-1}$ are also nonnegative.

3 Main results

We give now the main results of the paper. In Section 3.1, the localization and multiplicity results are proven for the recovered velocity of system (2.11), under the hypotheses $\mathbf{(h1)}$ and $\mathbf{(h2)}$ below on the nonlinear right-hand side data function. In Section 3.2 we deal with the case of a uniform pressure. In this case, the recovered velocity and the velocity of the Stokes system coincide and thus the localization and the multiplicity results are obtained for the velocity itself. We first give the sufficient condition (3.10) in order the pressure of a Stokes system to be uniform and then we prove localization results for the system (3.11), under the hypotheses (3.16) on the right-hand side data function. These latest results are proven in the planar case.

3.1 Localization of the recovered velocity

We start by giving a localization of the solution for the linear diffusion problem (2.8), which for the classical Stokes system (2.1) represents a localization of the recovered velocity $u+q$ in terms of some bounds of the external force $f\left(x\right).$

Proposition 1

\frac{r}{\gamma_{1_{\Omega^{\prime}}}}\leq f\left(x\right)\ \ \ \text{for a.e.% }x\in\Omega^{\prime}\ \ \ \text{and\ \ \ }0\leq f\left(x\right)\leq\frac{R}{% \Gamma_{1}}\ \ \text{for a.e. }x\in\Omega,

then the solution $\ w=L^{-1}f$ of (2.8) satisfies

r\leq w\left(x\right)\ \ \ \text{for a.e. }x\in\Omega^{\prime}\ \ \ \text{and% \ \ \ }0\leq w\left(x\right)\leq R\ \ \text{for a.e. }x\in\Omega.

Here $1_{\Omega^{\prime}}$ is the characteristic function of the domain $\ \Omega^{\prime}$ and $\gamma_{1_{\Omega^{\prime}}},\ \Gamma_{1}$ are the constants given by the remarks (R3), (R2), associated to the functions $1_{\Omega^{\prime}}$ and constant $1,$ respectively.

Proof. From the relation $f\left(x\right)\geq 0$ on $\Omega,$ according to (R1), one has $w\geq 0$ on $\Omega.$ Next, using (R2), from the relation $f\left(x\right)\leq\frac{R}{\Gamma_{1}}$ on $\Omega,$ we have

w\left(x\right)\leq\frac{R}{\Gamma_{1}}\left(L^{-1}1\right)\left(x\right)\leq% \frac{R}{\Gamma_{1}}\Gamma_{1}=R\ \ \text{on }\Omega.

Similarly, using (R3), since $\displaystyle f\left(x\right)\geq\frac{r}{\gamma_{1_{\Omega^{\prime}}}}1_{% \Omega^{\prime}}\left(x\right)$ on $\Omega,$ we obtain

w\left(x\right)\geq\frac{r}{\gamma_{1_{\Omega^{\prime}}}}\left(L^{-1}1_{\Omega% ^{\prime}}\right)\left(x\right)\geq\frac{r}{\gamma_{1_{\Omega^{\prime}}}}% \gamma_{1_{\Omega^{\prime}}}=r\ \ \text{on }\Omega^{\prime}.

We now state and prove an existence and localization theorem for the semi-linear reaction-diffusion problem (2.9) which consequently leads to an existence and localization result for the reaction Stokes system (2.11). The assumptions on the data are as follows:

(h1)

There are two functions $\ \underline{h},\ \overline{h}\in L^{\infty}\left(\Omega;\mathbb{R}_{+}^{n}\right)$ such that

	$\displaystyle\underline{h}\left(x\right)$	$\displaystyle\leq$	$\displaystyle h\left(x,\tau\right)\leq\overline{h}\left(x\right)\ \ \text{on % \ }\Omega^{\prime}\times\left[r,R\right],$		(3.1)
	$\displaystyle\underline{h}\left(x\right)$	$\displaystyle\leq$	$\displaystyle h\left(x,\tau\right)=h\left(x\right)\leq\overline{h}\left(x% \right)\ \ \text{on \ }\left(\Omega\setminus\Omega^{\prime}\right)\times% \mathbb{R}_{+}^{n},$

r\leq L^{-1}\underline{h}\text{ \ \ on\ }\Omega^{\prime}\ \ \ \text{and\ \ \ }% L^{-1}\overline{h}\leq R\ \ \ \text{on\ }\Omega.

(h2)

There exist constants $\ l_{ij}\geq 0$ $\left(i,j=1,..,n\right)$ such that for each $i\in\left\{1,..,n\right\},$

\left|h_{i}\left(x,\tau\right)-h_{i}\left(x,\overline{\tau}\right)\right|\leq% \sum\limits_{j=1}^{n}l_{ij}\left|\tau_{j}-\overline{\tau}_{j}\right|\ \ \ % \text{for a.e. }x\in\Omega^{\prime}\text{ and all }\tau,\overline{\tau}\in\left[r,R\right]

(3.2)

and the spectral radius of the matrix

\mathcal{M}=\left(L_{ij}\right)_{1\leq i,j\leq n}=\left(\frac{l_{ij}}{% \underline{\mu}\lambda_{1}}\right)_{1\leq i,j\leq n}

is strictly less than one. Here $\lambda_{1}$ is the first eigenvalue of the Dirichlet problem for the operator $-\Delta.$

Remark 2

(a) Condition (3.1), more exactly the requirement $\ h\left(x,\tau\right)=h\left(x\right)$ on $\left(\Omega\setminus\Omega^{\prime}\right)\times\mathbb{R}_{+}^{n}$ shows that the external force does not react in the exterior of $\Omega^{\prime},$ namely in the vicinity of the boundary $\partial\Omega.$ For example, $\ h\left(x,\tau\right)=f_{0}\left(x\right)+g\left(x\right)f\left(\tau\right)$ with $\ g\left(x\right)=0$ on $\Omega\setminus\Omega^{\prime}$ is such a function.

(b) We underline the local form of the conditions imposed on $h,$ which are given only on a vector interval $\left[r,R\right].$ This makes possible for a given function $h$ these conditions to be satisfied for several intervals $\left[r,R\right]$ leading then to multiple solutions.

Theorem 3

Assume that conditions (h1) and (h2) hold. Then problem (2.9) has a unique solution $w$ in $D_{rR},$ with $D_{rR}$ defined in (2.12). Moreover, the solution $w$ is in $D_{rR}$ a Nash equilibrium with respect to the partial energy functionals of the system.

Proof. (a) Existence, uniqueness and localization. Let us notice that system (2.9) is equivalent to the fixed point equation $\ w=N\left(w\right),\ w\in D_{rR},$ where $\ N\left(w\right)=L^{-1}h\left(\cdot,w\left(\cdot\right)\right).$ We apply Perov’s vector version of Banach’s fixed point theorem. Perov’s vectorial approach, initiated by Perov ([21]) in connection with the contraction principle, was extended for instance in [22] and [3] for other results from nonlinear functional analysis. We first prove the invariance condition $\ N\left(D_{rR}\right)\subset D_{rR}.$ To this aim, let $w$ be any element of $D_{rR}.$ Using (h1) we have

\underline{h}\left(x\right)\leq h\left(x,w\left(x\right)\right)\leq\overline{h% }\left(x\right)\ \ \ \text{for a.e. }x\in\Omega,

whence

	$\displaystyle 0$	$\displaystyle\leq$	$\displaystyle\left(L^{-1}\underline{h}\right)\left(x\right)\leq N\left(w\right% )\left(x\right)\leq\left(L^{-1}\overline{h}\right)\left(x\right)\leq R\ \ \ % \text{on\ }\Omega,$
	$\displaystyle N\left(w\right)\left(x\right)$	$\displaystyle\geq$	$\displaystyle\left(L^{-1}\underline{h}\right)\left(x\right)\geq r\ \ \ \text{% on }\Omega^{\prime}.$

Hence $\ N\left(w\right)\in D_{rR}.$

Next we prove that $N$ is a Perov contraction on $D_{rR}.$ To show this, let $w^{1},w^{2}\in D_{rR}$ and denote $v^{i}=N\left(w^{i}\right),$ $i=1,2.$ Then one has

\left\{\begin{array}[]{ll}L\left(v^{1}-v^{2}\right)=h\left(x,w^{1}\right)-h% \left(x,w^{2}\right)&\text{in }\Omega\\ v^{1}-v^{2}=0&\text{on }\partial\Omega\end{array}\right.

in the weak sense. Thus, multiplying the $i$ -th equation by $v_{i}^{1}-v_{i}^{2}$ and integrating over $\Omega$ yield

\int_{\Omega}\mu\left(x\right)\nabla\left(v_{i}^{1}-v_{i}^{2}\right)\cdot% \nabla\left(v_{i}^{1}-v_{i}^{2}\right)\,dx=\int_{\Omega}\left(h_{i}\left(x,w^{% 1}\right)-h_{i}\left(x,w^{2}\right)\right)\left(v_{i}^{1}-v_{i}^{2}\right)\,dx.

(3.3)

The left-hand side is greater than $\underline{\mu}\left\|v_{i}^{1}-v_{i}^{2}\right\|_{H_{0}^{1}\left(\Omega\right% )}^{2},$ while for the right-hand side, in view of the fact that $h\left(x,\tau\right)$ does not depend on $\tau$ for $x\in\Omega\setminus\Omega^{\prime}$ and using (h2), we have

$\displaystyle\int_{\Omega}\left(h_{i}\left(x,w^{1}\right)-h_{i}\left(x,w^{2}% \right)\right)\left(v_{i}^{1}-v_{i}^{2}\right)\,dx$	$\displaystyle=$	$\displaystyle\int_{\Omega^{\prime}}\left(h_{i}\left(x,w^{1}\right)-h_{i}\left(% x,w^{2}\right)\right)\left(v_{i}^{1}-v_{i}^{2}\right)\,dx$
	$\displaystyle\leq$	$\displaystyle\sum\limits_{j=1}^{n}l_{ij}\int_{\Omega^{\prime}}\left\|w_{j}^{1}-% w_{j}^{2}\right\|\left\|v_{i}^{1}-v_{i}^{2}\right\|$
	$\displaystyle\leq$	$\displaystyle\sum\limits_{j=1}^{n}l_{ij}\left\\|w_{j}^{1}-w_{j}^{2}\right\\|_{L^% {2}\left(\Omega\right)}\left\\|v_{i}^{1}-v_{i}^{2}\right\\|_{L^{2}\left(\Omega% \right)}$
	$\displaystyle\leq$	$\displaystyle\frac{1}{\lambda_{1}}\left(\sum\limits_{j=1}^{n}l_{ij}\left\\|w_{j% }^{1}-w_{j}^{2}\right\\|_{H_{0}^{1}\left(\Omega\right)}\right)\left\\|v_{i}^{1}-% v_{i}^{2}\right\\|_{H_{0}^{1}\left(\Omega\right)},$

where for the last inequality Poincaré’s inequality with the best constant $1/\sqrt{\lambda_{1}}$ has been applied twice. Hence

\left\|N_{i}\left(w^{1}\right)-N_{i}\left(w^{2}\right)\right\|_{H_{0}^{1}\left% (\Omega\right)}\leq\frac{1}{\underline{\mu}\lambda_{1}}\sum\limits_{j=1}^{n}l_% {ij}\left\|w_{j}^{1}-w_{j}^{2}\right\|_{H_{0}^{1}\left(\Omega\right)}\ \ \ % \left(i=1,..,n\right).

These $n$ inequalities can be put together under the form of the matrix inequality

\left(\begin{array}[]{c}\left\|N_{1}\left(w^{1}\right)-N_{1}\left(w^{2}\right)% \right\|_{H_{0}^{1}\left(\Omega\right)}\\ ..\\ \left\|N_{n}\left(w^{1}\right)-N_{n}\left(w^{2}\right)\right\|_{H_{0}^{1}\left% (\Omega\right)}\end{array}\right)\leq\left(\begin{array}[]{ccc}\frac{l_{11}}{% \underline{\mu}\lambda_{1}}&..&\frac{l_{1n}}{\underline{\mu}\lambda_{1}}\\ ..&..&..\\ \frac{l_{n1}}{\underline{\mu}\lambda_{1}}&..&\frac{l_{nn}}{\underline{\mu}% \lambda_{1}}\end{array}\right)\left(\begin{array}[]{c}\left\|w_{1}^{1}-w_{1}^{% 2}\right\|_{H_{0}^{1}\left(\Omega\right)}\\ ..\\ \left\|w_{n}^{1}-w_{n}^{2}\right\|_{H_{0}^{1}\left(\Omega\right)}\end{array}\right)

where the spectral radius of the matrix $\left(l_{ij}/\left(\underline{\mu}\lambda_{1}\right)\right)_{1\leq i,j\leq n}$ is less than one. Thus $N$ is a Perov contraction on $D_{rR}.$ This implies that $N$ has a unique fixed point $w$ in $D_{rR}.$

(b) Nash equilibrium. In order to prove that the solution $\ w=\left(w_{1},..,w_{n}\right)\$ is a Nash equilibrium, we use an iterative approximation scheme. We start with some fixed elements $w_{2}^{0},..,w_{n}^{0}$ in $D_{r_{2}R_{2}}\times..\times D_{r_{n}R_{n}}.$ At each step $k$ ( $k\geq 1$ ), the elements $w_{2}^{k-1},..,w_{n}^{k-1}$ having been determined at step $k-1$ , first we apply Ekeland’s principle to $\ J_{1}\left(\cdot\ ,w_{2}^{k-1},..,w_{n}^{k-1}\right)$ and find a $\ w_{1}^{k}\in D_{r_{1}R_{1}}$ such that

J_{1}\left(w_{1}^{k},w_{2}^{k-1},..,w_{n}^{k-1}\right)\leq\inf_{D_{r_{1}R_{1}}% }J_{1}\left(\cdot,w_{2}^{k-1},..,w_{n}^{k-1}\right)+\frac{1}{k},\ \ \left\|J_{% 11}\left(w_{1}^{k},w_{2}^{k-1},..,w_{n}^{k-1}\right)\right\|_{H_{0}^{1}\left(% \Omega\right)}\leq\frac{1}{k}.

Next we apply Ekeland’s principle to $J_{2}\left(w_{1}^{k},\cdot\ ,w_{3}^{k-1},..,w_{n}^{k-1}\right)$ and obtain an $\ w_{2}^{k}\in D_{r_{2}R_{2}}$ with

J_{2}\left(w_{1}^{k},w_{2}^{k},..,w_{n}^{k-1}\right)\leq\inf_{D_{r_{2}R_{2}}}J% _{2}\left(w_{1}^{k},\cdot,w_{3}^{k-1},..,w_{n}^{k-1}\right)+\frac{1}{k},\ \ % \left\|J_{22}\left(w_{1}^{k},w_{2}^{k},..,w_{n}^{k-1}\right)\right\|_{H_{0}^{1% }\left(\Omega\right)}\leq\frac{1}{k}.

After $n$ steps we obtain $\ w_{1}^{k},..,w_{n}^{k},$ where for each $i\in\left\{1,..,n\right\},$ one has

J_{i}\left(w_{1}^{k},..,w_{i}^{k},w_{i+1}^{k-1},..,w_{n}^{k-1}\right)\,\leq\,% \inf_{D_{r_{i}R_{i}}}J_{i}\left(w_{1}^{k},..,w_{i-1}^{k},\cdot,w_{i+1}^{k-1},.% .,w_{n}^{k-1}\right)+\frac{1}{k},

\left\|J_{ii}\left(w_{1}^{k},..,w_{i}^{k},w_{i+1}^{k-1},..,w_{n}^{k-1}\right)% \right\|_{H_{0}^{1}\left(\Omega\right)}\,\leq\,\frac{1}{k}.

(3.4)

Our next goal is to prove the convergence of the sequences $\left(w_{i}^{k}\right)_{k\geq 1}\ (i=1,..,n).\$ To this aim we use a technique first suggested in [24] and extended in [26]. For $i=1,..,n$ and $k\geq 1,$ we let

v_{ik}:=J_{ii}\left(w_{1}^{k},..,w_{i}^{k},w_{i+1}^{k-1},..,w_{n}^{k-1}\right).

From (3.4), one has $\ v_{ik}\rightarrow 0$ in $H_{0}^{1}\left(\Omega\right)$ as $k\rightarrow\infty.$ We have

w_{i}^{k}-N_{i}\left(w_{1}^{k},..,w_{i}^{k},w_{i+1}^{k-1},..,w_{n}^{k-1}\right% )\ =v_{ik}

(3.5)

which yields

	$\displaystyle\left\\|w_{i}^{k+p}-w_{i}^{k}\right\\|_{H_{0}^{1}\left(\Omega\right% )}\leq$		(3.6)
	$\displaystyle\left\\|N_{i}\left(w_{1}^{k+p},..,w_{i}^{k+p},w_{i+1}^{k+p-1},..,w% _{n}^{k+p-1}\right)-N_{i}\left(w_{1}^{k},..,w_{i}^{k},w_{i+1}^{k-1},..,w_{n}^{% k-1}\right)\right\\|_{H_{0}^{1}\left(\Omega\right)}+\left\\|v_{ik+p}-v_{ik}% \right\\|_{H_{0}^{1}\left(\Omega\right)}\leq$
	$\displaystyle\sum\limits_{j=1}^{i}L_{ij}\left\\|w_{j}^{k+p}-w_{j}^{k}\right\\|_{% H_{0}^{1}\left(\Omega\right)}+\sum\limits_{j=i+1}^{n}L_{ij}\left\\|w_{j}^{k+p-1% }-w_{j}^{k-1}\right\\|_{H_{0}^{1}\left(\Omega\right)}+\left\\|v_{ik+p}-v_{ik}% \right\\|_{H_{0}^{1}\left(\Omega\right)}.$

Denote

a_{i,k,p}=\left\|w_{i}^{k+p}-w_{i}^{k}\right\|_{H_{0}^{1}\left(\Omega\right)},% \ \ b_{i,k,p}=\left\|v_{ik+p}-v_{ik}\right\|_{H_{0}^{1}\left(\Omega\right)}.

One clearly has,

b_{i,k,p}\rightarrow 0\,\,\text{ as }k\rightarrow\infty,\,\text{ uniformly with respect to }p.

(3.7)

With the notations before, inequality (3.6) writes

\left(\begin{array}[]{c}a_{1,k,p}\\ a_{2,k,p}\\ ..\\ a_{n,k,p}\end{array}\right)\leq\left(\begin{array}[]{cccc}L_{11}&0&..&0\\ L_{21}&L_{22}&..&0\\ ..&..&..&..\\ L_{n1}&L_{n2}&..&L_{nn}\end{array}\right)\left(\begin{array}[]{c}a_{1,k,p}\\ a_{2,k,p}\\ ..\\ a_{n,k,p}\end{array}\right)+\left(\begin{array}[]{cccc}0&L_{12}&..&L_{1n}\\ 0&0&..&L_{2n}\\ ..&..&..&..\\ 0&..&..&0\end{array}\right)\left(\begin{array}[]{c}b_{1,k,p}\\ b_{2,k,p}\\ ..\\ b_{n,k,p}\end{array}\right).

By denoting $\ \mathcal{M}^{\prime}=\left(a_{ij}\right)_{1\leq i,j\leq n},$ where $\ a_{ij}=L_{ij}$ for $j\leq i$ and $\ a_{ij}=0$ for $j>i,$ and $\ \mathcal{M}^{\prime\prime}=\mathcal{M}-\mathcal{M}^{\prime},$ the above inequality can be written in the form

\left(\begin{array}[]{c}a_{1,k,p}\\ ..\\ a_{n,k,p}\end{array}\right)\leq\mathcal{M}^{\prime}\left(\begin{array}[]{c}a_{% 1,k,p}\\ ..\\ a_{n,k,p}\end{array}\right)+\mathcal{M}^{\prime\prime}\left(\begin{array}[]{c}% b_{1,k,p}\\ ..\\ b_{n,k,p}\end{array}\right).

Since $\ \mathcal{M}^{k}\rightarrow 0\$ as $k\rightarrow\infty,$ we clearly have that $\ \mathcal{M}^{\prime k}\rightarrow\infty$ as $k\rightarrow\infty,$ so the matrix $\ I-\mathcal{M}^{\prime}$ is invertible and its inverse is nonnegative. Consequently

\left(\begin{array}[]{c}a_{1,k,p}\\ ..\\ a_{n,k,p}\end{array}\right)\leq\left(I-\mathcal{M}^{\prime}\right)^{-1}% \mathcal{M}^{\prime\prime}\left(\begin{array}[]{c}b_{1,k,p}\\ ..\\ b_{n,k,p}\end{array}\right).

It follows that the sequences $a_{i,k,p}$ converge to zero as $k\rightarrow\infty$ uniformly with respect to $p.$ Thus, for each $i\in\left\{1,..,n\right\},$ the sequence $\left(w_{i}^{k}\right)_{k}$ is Cauchy in $H_{0}^{1}\left(\Omega\right)$ and therefore convergent to some $\overline{w}_{i}.$ Passing to the limit in (3.4) we obtain

J_{ii}\left(\overline{w}\right)=0\ \ \ \left(i=1,..,n\right),

(3.8)

J_{i}\left(\overline{w}\right)=\inf_{D_{r_{i}R_{i}}}J_{i}\left(\overline{w}_{1% },..,\overline{w}_{i-1},\cdot,\overline{w}_{i+1},..,\overline{w}_{n}\right)\ % \ \ \left(i=1,..,n\right).

(3.9)

Now (3.8) shows that $\ \overline{w}$ solves (2.9) in $D_{rR},$ and the uniqueness of solution implies that $\ \overline{w}=w,$ where $\ w$ is the solution given by Perov’s theorem. Finally, (3.9) shows that $w$ is a Nash equilibrium with respect to the partial energy functionals $\left(J_{1},..\ ,J_{n}\right).$

In terms of the Stokes system, Theorem 3 immediately yields the following localization and multiplicity result.

Theorem 4

(a) Under conditions (h1) and (h2), problem (2.11) has a unique (modulo an additive constant in pressure) solution $\left(u,p\right)$ such that the recovered velocity $u+q$ belongs to $D_{rR}$ and is a Nash equilibrium with respect to the associated partial energy functionals.

(b) In case that conditions (h1) and (h2) are satisfied for two pairs of vectors $\left(r,R\right)$ and $\left(\overline{r},\overline{R}\right)$ with $\ 0<r<R\lvertneqq\overline{r}<\overline{R},$ problem (2.11) has two distinct solutions $\left(u,p\right),$ $\left(\overline{u},\overline{p}\right)$ with $\ u+q\in D_{rR}$ and $\ \overline{u}+\overline{q}\in D_{\overline{r}\overline{R}}.$

3.2 Localization of the velocity

The results established in Section 3.1 clearly yield localization of the velocity $u$ also in the particular case $\nabla p=0,$ that is for a uniform pressure. In this section we give an answer to the question concerning the type of forces which guarantee us to have a uniform pressure. More precisely, we give a sufficient condition for the external force $f$ in order to guarantee that $\nabla p=0,$ namely the equality

\operatorname{div}\Delta L^{-1}f=0.

(3.10)

We underline the dependence of the sufficient condition (3.10) on the viscosity $\mu\left(x\right)$ by means of the operator $L$ and the fact that in case of a constant viscosity this condition reduces to the self property of the force $\ \operatorname{div}f=0,$ namely the force $f$ is irrotational. For the same condition yielding constant pressure in the case of periodic boundary conditions, we refer the reader to [18, pag. 84].

Our aim is to investigate the localization of the velocity $u$ for planar Stokes systems with an additional reaction force depending on the velocity itself, namely

\left\{\begin{array}[]{ll}Lu+\nabla p=f\left(x\right)+\phi\left[u\right]\left(% x\right)&\text{in }\Omega\\ \operatorname{div}\,u=0&\text{in }\Omega\\ u=0&\text{on }\partial\Omega.\end{array}\right.

(3.11)

Here $f\in L^{2}\left(\Omega;\mathbb{R}^{2}\right)$ and $\phi:V\rightarrow L^{2}\left(\Omega;\mathbb{R}^{2}\right).$ We shall consider the special type of the reaction additional force, defined by

\phi\left[u\right]\left(x\right)=L\left(-\Delta\right)^{-1}\left(1_{\Omega^{% \prime}}\eta\left(u\left(.\right)\right)\right)\left(x\right),

(3.12)

where $\ \eta:\mathbb{R}^{2}\rightarrow\mathbb{R}^{2}$ and the hypothesis on $\eta$ will be made precise later.

We start with some preliminary results. We analyze first system (2.1) with a given non reactive external force $f\left(x\right)$ satisfying the sufficient condition (3.10). One has the following result.

Lemma 5

If $\ \operatorname{div}\Delta L^{-1}f=0,$ then $\ \nabla p=0$ and $\ Sf=L^{-1}f$ , where $S$ is the velocity operator defined in (2.4).

Proof. The function $\ \overline{u}=L^{-1}f\in H_{0}^{1}\left(\Omega;\mathbb{R}^{n}\right)$ satisfies

\left(\left(\overline{u},v\right)\right)_{H_{0}^{1}}-\left(f,v\right)=0\ \ \ % \text{for all \ }v\in H_{0}^{1}\left(\Omega;\mathbb{R}^{n}\right).

In particular, since $V\subset H_{0}^{1}\left(\Omega;\mathbb{R}^{n}\right),$ $\overline{u}$ satisfies the identity (2.3). It remains to prove that $\overline{u}\in V,$ that is $\ \operatorname{div}\,\overline{u}=0.$ It suffices to prove that the function $\ \operatorname{div}\,\overline{u}$ is zero on any subset $\Omega^{\prime}\subset\subset\Omega.\$ Since $C_{0}^{\infty}\left(\Omega^{\prime}\right)$ is dense in $L^{2}\left(\Omega^{\prime}\right),$ it is enough to show that

\left(\operatorname{div}\,\overline{u},\varphi\right)_{L^{2}\left(\Omega^{% \prime}\right)}=0\ \ \ \text{for all }\varphi\in C_{0}^{\infty}\left(\Omega^{% \prime}\right).

(3.13)

From the equality $\ \operatorname{div}\Delta L^{-1}f=0,$ one has, for any $\psi\in$ $C_{0}^{\infty}\left(\Omega^{\prime}\right)$

$\displaystyle 0$	$\displaystyle=$	$\displaystyle\left(\operatorname{div}\Delta L^{-1}f,\psi\right)=\sum\limits_{i% =1}^{n}\left(\frac{\partial\Delta L^{-1}f_{i}}{\partial x_{i}},\psi\right)$
	$\displaystyle=$	$\displaystyle\sum\limits_{i=1}^{n}\left(\Delta\frac{\partial L^{-1}f_{i}}{% \partial x_{i}},\psi\right)=\sum\limits_{i=1}^{n}\left(\frac{\partial L^{-1}f_% {i}}{\partial x_{i}},\Delta\psi\right)_{L^{2}\left(\Omega^{\prime}\right)}$
	$\displaystyle=$	$\displaystyle\left(\operatorname{div}\,\overline{u},\Delta\psi\right)_{L^{2}% \left(\Omega^{\prime}\right)}.$

The symbol $\left(.,.\right)$ is used to denote the value of a distribution on a test function. Thus

\left(\operatorname{div}\,\overline{u},\Delta\psi\right)_{L^{2}\left(\Omega^{% \prime}\right)}=0\ \ \ \text{for all }\psi\in C_{0}^{\infty}\left(\Omega^{% \prime}\right).

Now let $\varphi\in C_{0}^{\infty}\left(\Omega^{\prime}\right)$ be arbitrary. Denote $\psi:=\left(-\Delta\right)^{-1}\varphi.$ Then $-\Delta\psi=\varphi.$ Consider a sequence $\ \psi_{k}\in C_{0}^{\infty}\left(\Omega^{\prime}\right)$ with $\ \psi_{k}\rightarrow\psi$ in $H_{0}^{1}\left(\Omega^{\prime}\right).$ Since $\ \mu$ is uniformly Lipschitz continuous and $f\in L^{2}\left(\Omega;\mathbb{R}^{n}\right),$ one has $\ \overline{u}\in H^{2}\left(\Omega^{\prime};\mathbb{R}^{n}\right)$ (see [13, Theorem 8.8]). Consequently

\frac{\partial}{\partial x_{i}}\operatorname{div}\,\overline{u}\in L^{2}\left(% \Omega^{\prime}\right),\ \ \ i=1,..,n.

We have

0=\left(\operatorname{div}\,\overline{u},\Delta\psi_{k}\right)_{L^{2}\left(% \Omega^{\prime}\right)}=-\sum\limits_{i=1}^{n}\left(\frac{\partial}{\partial x% _{i}}\operatorname{div}\,\overline{u},\frac{\partial\psi_{k}}{\partial x_{i}}% \right)_{L^{2}\left(\Omega^{\prime}\right)}.

From $\psi_{k}\rightarrow\psi$ in $H_{0}^{1}\left(\Omega^{\prime}\right)$ one has $\displaystyle\frac{\partial\psi_{k}}{\partial x_{i}}\rightarrow\frac{\partial% \psi}{\partial x_{i}}\ \left(i=1,..,n\right)$ in $L^{2}\left(\Omega^{\prime}\right).$ Passing to the limit gives

	$\displaystyle 0$	$\displaystyle=$	$\displaystyle\sum\limits_{i=1}^{n}\left(\frac{\partial}{\partial x_{i}}% \operatorname{\,}{div}\,\overline{u},\frac{\partial\psi}{\partial x_{i}}\right% )_{L^{2}\left(\Omega^{\prime}\right)}=-\sum\limits_{i=1}^{n}\left(% \operatorname{div}\,\overline{u},\frac{\partial^{2}\psi}{\partial x_{i}^{2}}% \right)_{L^{2}\left(\Omega^{\prime}\right)}$
		$\displaystyle=$	$\displaystyle-\left(\operatorname{div}\,\overline{u},\Delta\psi\right)_{L^{2}% \left(\Omega^{\prime}\right)}=\left(\operatorname{div}\,\overline{u},\varphi% \right)_{L^{2}\left(\Omega^{\prime}\right)}.$

Thus (3.13) is proved.

Remark 6

If $f$ is such that $\ \operatorname{div}\Delta L^{-1}f=0,$ then denoting $\ h:=-\Delta L^{-1}f$ one has the following expression of $f,$

f=L\left(-\Delta\right)^{-1}h=-\operatorname{div}\left(\mu\left(x\right)\nabla% \left(-\Delta\right)^{-1}h\right),

where $\ \operatorname{div}h=0.$ This formula shows that for an external force to make the pressure constant it has to depend on the viscosity.

Note that since $\Omega$ is $C^{2},\$ if $h\in L^{2}\left(\Omega;\mathbb{R}^{n}\right)$ then $\left(-\Delta\right)^{-1}h\in H^{2}\left(\Omega;\mathbb{R}^{n}\right)$ (see [13, Theorem 8.12]), which together with $\mu\in C^{1}\left(\overline{\Omega}\right)$ gives $f\in L^{2}\left(\Omega;\mathbb{R}^{n}\right).$

We show now that a localization of $\ h$ immediately implies the localization of $u.$

Proposition 7

Assume that $\ \operatorname{div}\Delta L^{-1}f=0.\$ Let $\ \Omega^{\prime}\subset\subset\Omega$ and $\ r,R\in\left(0,\infty\right)^{n}$ be such that $\ \ 0<\frac{r}{\gamma}<\frac{R}{\Gamma},$ where $\Gamma=\left\|\left(-\Delta\right)^{-1}1\right\|_{\infty}$ and $\gamma$ is such that $\left(-\Delta\right)^{-1}1_{\Omega^{\prime}}\left(x\right)\geq\gamma$ on $\Omega^{\prime}.$ If

0\leq\left(-\Delta L^{-1}f\right)\left(x\right)\leq\frac{R}{\Gamma}\text{\ \ % \ for a.e. }x\in\Omega\ \text{ and}

(3.14)

\frac{r}{\gamma}\leq\left(-\Delta L^{-1}f\right)\left(x\right)\text{\ \ \ for % a.e. }x\in\Omega^{\prime},

(3.15)

then the velocity $u$ satisfies

	$\displaystyle 0$	$\displaystyle\leq$	$\displaystyle u\left(x\right)\leq R\ \ \ \text{\ for a.e. }x\in\Omega\text{\ % \ and}$
	$\displaystyle r$	$\displaystyle\leq$	$\displaystyle u\left(x\right)\text{\ \ \ for a.e. }x\in\Omega^{\prime}.$

Proof. From Lemma 5, one has $\ u=Sf=L^{-1}f.\$ Next, from (3.14) and the remark (R2), we have

0\leq\left(\left(-\Delta\right)^{-1}h\right)\left(x\right)=u\left(x\right)\leq% \frac{R}{\Gamma}\left(\left(-\Delta\right)^{-1}1\right)\left(x\right)\leq R\ % \ \ \text{for a.e. }x\in\Omega.

From (3.15) and $\ 0\leq\left(-\Delta L^{-1}f\right)\left(x\right)$ in $\Omega,\$ we have $\displaystyle\ \left(-\Delta L^{-1}f\right)\left(x\right)\geq\frac{r}{\gamma}1% _{\Omega^{\prime}}\left(x\right)\$ for a.e. $x\in\Omega,$ whence

	$\displaystyle u\left(x\right)$	$\displaystyle=$	$\displaystyle\left(-\Delta\right)^{-1}\left(-\Delta L^{-1}f\right)\left(x% \right)\geq\left(-\Delta\right)^{-1}\left(\frac{r}{\gamma}1_{\Omega^{\prime}}% \right)\left(x\right)$
		$\displaystyle=$	$\displaystyle\frac{r}{\gamma}\left(\left(-\Delta\right)^{-1}1_{\Omega^{\prime}% }\right)\left(x\right)\geq r\ \ \text{\ for a.e. }x\in\Omega^{\prime}.$

Let us mention that in the particular case of a constant viscosity $\mu\in{\mathbb{R}}^{*}_{+},$ one has $\ L=-\mu\Delta$ and assumptions (3.14), (3.15) read as

0\leq f\left(x\right)\leq\frac{R\mu}{\Gamma}\text{\ \ \ for a.e. }x\in\Omega,% \ \ \ \ \frac{r\mu}{\gamma}\leq f\left(x\right)\text{\ \ \ for a.e. }x\in\Omega^{\prime}.

Next we consider planar Stokes systems with a velocity-dependent reaction force. It is convenient that besides the property $\operatorname{div}\,u=0,$ to have $\operatorname{div}\,u^{s}=0,$ where for a given vector $v=\left(v_{1},v_{2}\right),$ $v^{s}$ is the vector defined by $v^{s}=\left(v_{2},v_{1}\right).$ We have the two propositions below.

Proposition 8

If $\ f\in L^{2}\left(\Omega;\mathbb{R}^{2}\right)$ is such that

\operatorname{div}\Delta L^{-1}f=\operatorname{div}\Delta L^{-1}f^{s}=0,

then $\ \left(Sf\right)^{s}\in V.$

Proof. According to Lemma 5, $\ Sf^{s}=L^{-1}f^{s}.$ Clearly, one has $\ L^{-1}f^{s}=\left(L^{-1}f\right)^{s}.$ Hence $\ \left(Sf\right)^{s}=Sf^{s}\in V.$

Let us now consider a closed subspace of $V,$ namely

V^{s}:=\left\{u\in V:\ u^{s}\in V\right\}.

Also denote

X=\left\{f\in L^{2}\left(\Omega;\mathbb{R}^{2}\right):\ \operatorname{div}% \Delta L^{-1}f=0\right\},\ \ \ \ X^{s}=\left\{f\in X:\ \operatorname{div}% \Delta L^{-1}f^{s}=0\right\}.

Hence one has

S\left(X^{s}\right)\subset V^{s},\ \ \ \ \ \ Sf=L^{-1}f\ \ \ \left(f\in X% \right).

We are now in position to consider the planar Stokes system (3.11) with the special type of reaction additional force defined by (3.12). We assume that $\ \eta:$ $\mathbb{R}^{2}\rightarrow\mathbb{R}^{2}$ is of class $C^{1}$ and

\frac{\partial\eta_{1}}{\partial u_{1}}=\frac{\partial\eta_{2}}{\partial u_{2}% },\ \ \ \ \frac{\partial\eta_{1}}{\partial u_{2}}=\frac{\partial\eta_{2}}{% \partial u_{1}}.

(3.16)

One has the following result.

Proposition 9

Under assumption (3.16), $\eta\left(u\right)$ belongs to $X^{s}$ for every $u\in V^{s}.$

Proof. We have to show that $\ \operatorname{div}\,\eta\left(u\right)=\operatorname{div}\,\eta\left(u\right% )^{s}=0$ in $\Omega.$ Indeed, using (3.16) and $\operatorname{div}\,u=\operatorname{div}\,u^{s}=0$ we deduce

$\displaystyle\operatorname{div}\,\eta\left(u\right)$	$\displaystyle=$	$\displaystyle\frac{\partial}{\partial x_{1}}\eta_{1}\left(u\right)+\frac{% \partial}{\partial x_{2}}\eta_{2}\left(u\right)$
	$\displaystyle=$	$\displaystyle\frac{\partial\eta_{1}\left(u\right)}{\partial u_{1}}\frac{% \partial u_{1}}{\partial x_{1}}+\frac{\partial\eta_{1}\left(u\right)}{\partial u% _{2}}\frac{\partial u_{2}}{\partial x_{1}}+\frac{\partial\eta_{2}\left(u\right% )}{\partial u_{1}}\frac{\partial u_{1}}{\partial x_{2}}+\frac{\partial\eta_{2}% \left(u\right)}{\partial u_{2}}\frac{\partial u_{2}}{\partial x_{2}}$
	$\displaystyle=$	$\displaystyle\frac{\partial\eta_{1}\left(u\right)}{\partial u_{1}}% \operatorname{div}\,u+\frac{\partial\eta_{1}\left(u\right)}{\partial u_{2}}% \operatorname{div}\,u^{s}=0.$

Similarly one has

$\displaystyle\operatorname{div}\,\eta\left(u\right)^{s}$	$\displaystyle=$	$\displaystyle\frac{\partial}{\partial x_{1}}\eta_{2}\left(u\right)+\frac{% \partial}{\partial x_{2}}\eta_{1}\left(u\right)$
	$\displaystyle=$	$\displaystyle\frac{\partial\eta_{2}\left(u\right)}{\partial u_{1}}\frac{% \partial u_{1}}{\partial x_{1}}+\frac{\partial\eta_{2}\left(u\right)}{\partial u% _{2}}\frac{\partial u_{2}}{\partial x_{1}}+\frac{\partial\eta_{1}\left(u\right% )}{\partial u_{1}}\frac{\partial u_{1}}{\partial x_{2}}+\frac{\partial\eta_{1}% \left(u\right)}{\partial u_{2}}\frac{\partial u_{2}}{\partial x_{2}}$
	$\displaystyle=$	$\displaystyle\frac{\partial\eta_{1}\left(u\right)}{\partial u_{1}}% \operatorname{div}\,u^{s}+\frac{\partial\eta_{1}\left(u\right)}{\partial u_{2}% }\operatorname{div}\,u=0.$

Assume that $\ f\in X^{s},$ i.e., $f\in L^{2}\left(\Omega;\mathbb{R}^{2}\right)$ and $\ \operatorname{div}\Delta L^{-1}f=\operatorname{div}\Delta L^{-1}f^{s}=0.\$ We give the fixed point formulation of problem (3.11) (under hypothesis (3.12)). Under the above conditions, we have

\eta:V^{s}\rightarrow X^{s},\ \ \ S:X^{s}\rightarrow V^{s}.

Hence

T:=S\left(f+\phi\left[u\right]\right)=L^{-1}\left(f+\phi\left[u\right]\right)=% \left(-\Delta\right)^{-1}\left(h+1_{\Omega^{\prime}}\eta\left(u\right)\right):% V^{s}\rightarrow V^{s}

and the following result holds.

Proposition 10

(a) Problem (3.11) has a solution if and only if the operator $T$ has a fixed point.

(b) If $\left(u,p\right)$ solves (3.11), then $u$ is a fixed point of $T$ and $p=c$ (constant).

Let $D_{rR}^{s}$ be defined by

D_{rR}^{s}:=\left\{u\in V^{s}:\ r\leq u\left(x\right)\ \ \text{for a.e. }x\in% \Omega^{\prime},\ 0\leq u\left(x\right)\leq R\ \ \text{for a.e. }x\in\Omega% \right\}.

Hence, if $u\in D_{rR}^{s},$ then

	$\displaystyle u$	$\displaystyle\in$	$\displaystyle H_{0}^{1}\left(\Omega;\mathbb{R}^{2}\right),\ \ \operatorname{% div}\,u=\operatorname{div}\,u^{s}=0,$
	$\displaystyle r_{i}$	$\displaystyle\leq$	$\displaystyle u_{i}\left(x\right)\ \text{for a.e. }x\in\Omega^{\prime},\ 0\leq u% _{i}\left(x\right)\leq R_{i}\ \text{for a.e. }x\in\Omega\ \ \left(i=1,2\right).$

It is easy to see that the set $\ D_{rR}^{s}$ is closed in $H_{0}^{1}\left(\Omega;\mathbb{R}^{2}\right).$

Let us consider the matrix $\mathcal{M}=\left(\mu_{ij}\right)_{1\leq i,j\leq 2}$ with entries

\mu_{ij}=\frac{l_{ij}}{\lambda_{1}},

where

l_{ij}=\max_{{}_{\begin{subarray}{c}\tau_{1}\in\left[r_{1},R_{1}\right]\\ \tau_{2}\in\left[r_{2},R_{2}\right]\end{subarray}}}\left|\frac{\partial\eta_{i% }}{\partial\tau_{j}}\left(\tau_{1},\tau_{2}\right)\right|

(3.17)

and $\lambda_{1}$ is the first eigenvalue of $-\Delta$ in $\Omega,$ with the Dirichlet boundary condition.

For a function $\ h\in L^{\infty}\left(\Omega;\mathbb{R}_{+}^{2}\right)\$ denote

m_{h_{i}}=\inf_{\Omega^{\prime}}h_{i},\ \ \ M_{h_{i}}=\left\|h_{i}\right\|_{L^% {\infty}\left(\Omega\right)}\ \ \left(i=1,2\right).

Also, let us consider the following bounds of $\ \eta$ given only locally:

m_{\eta_{i}}=\min_{{}_{\begin{subarray}{c}\tau_{1}\in\left[r_{1},R_{1}\right]% \\ \tau_{2}\in\left[r_{2},R_{2}\right]\end{subarray}}}\eta_{i}\left(\tau_{1},\tau% _{2}\right),\ \ \ \ M_{\eta_{i}}:=\max_{\begin{subarray}{c}\tau_{1}\in\left[r_% {1},R_{1}\right]\\ \tau_{2}\in\left[r_{2},R_{2}\right]\end{subarray}}\eta_{i}\left(\tau_{1},\tau_% {2}\right)\ \ \ \left(i=1,2\right).

(3.18)

The main result in this section is the following localization theorem, also able to produce multiple solutions, depending on the oscillatory properties of function $\eta$ .

Theorem 11

Let $f\in X^{s}$ , $h=-\Delta L^{-1}f\in L^{\infty}\left(\Omega;\mathbb{R}_{+}^{2}\right)$ and let $\eta$ satisfy assumptions (3.16). If in addition $\eta\left(\tau\right)\geq 0$ for $\tau\geq 0,$

r\leq\left(m_{h}+m_{\eta}\right)\gamma,\ \ \ \left(M_{h}+M_{\eta}\right)\Gamma\leq R

(3.19)

and the spectral radius of the matrix $\mathcal{M}$ is strictly less than one, then problem (3.11) has a unique solution $\left(u,p\right)$ in $D_{r,R}^{s}\times L^{2}\left(\Omega\right)$ with $\nabla p=0.$

Proof. We follow the same ideas as in the proof of Theorem 3. Let $\ v\in D_{rR}^{s}.$ Since $\ r\leq v\left(x\right)\leq R$ on $\Omega^{\prime}$ and $\ 0\leq v\left(x\right)$ on $\Omega,$ we have $\ 0\leq 1_{\Omega^{\prime}}\left(x\right)\eta\left(v\left(x\right)\right)\leq M% _{\eta}\ \$ a.e. in $\Omega.$ Then using the positivity and monotonicity properties of $\left(-\Delta\right)^{-1},$ we obtain

	$\displaystyle 0$	$\displaystyle\leq$	$\displaystyle T\left(v\right)\left(x\right)=\left(-\Delta\right)^{-1}\left(h+1% _{\Omega^{\prime}}\eta\left(v\right)\right)\left(x\right)$
		$\displaystyle\leq$	$\displaystyle\left(M_{h}+M_{\eta}\right)\left(\left(-\Delta\right)^{-1}1\right% )\left(x\right)\leq\left(M_{h}+M_{\eta}\right)\Gamma\ \ \ \text{for a.e. }x\in\Omega.$

For the lower estimation in $\Omega^{\prime},$ since $\ r\leq v\left(x\right)\leq R$ on $\Omega^{\prime},$ we have $\ m_{\eta}\leq\eta\left(v\left(x\right)\right)\ \$ a.e. in $\Omega^{\prime}$ and thus $\ 1_{\Omega^{\prime}}\left(x\right)m_{\eta}\leq\eta\left(v\left(x\right)\right% )\ \$ a.e. in $\Omega.$ Then

T\left(v\right)\left(x\right)\geq\left(m_{h}+m_{\eta}\right)\left(\left(-% \Delta\right)^{-1}1_{\Omega^{\prime}}\right)\left(x\right)\geq\left(m_{h}+m_{% \eta}\right)\gamma\ \ \text{for a.e. }x\in\Omega^{\prime}.

(3.20)

Hence $T\left(D_{rR}^{s}\right)\subset D_{rR}^{s}$ due to (3.19).

Now we prove that the operator $T$ satisfies on $D_{rR}^{s}$ the contraction condition in the sense of Perov. To this aim, let $v^{1},v^{2}\in D_{rR}^{s},$ and denote $w^{i}=T\left(v^{i}\right),$ $i=1,2.$ Then

\left\{\begin{array}[]{ll}-\Delta w^{i}=h+1_{\Omega^{\prime}}\eta\left(v^{i}% \right)&\text{in }\Omega\\ w^{i}=0&\text{on }\partial\Omega\end{array}\right.

in the weak sense, for $i=1,2.$ These give

\left\{\begin{array}[]{ll}-\Delta\left(w^{1}-w^{2}\right)=\left(\eta\left(v^{1% }\right)\ -\eta\left(v^{2}\right)\right)1_{\Omega^{\prime}}&\text{in }\Omega\\ w^{1}-w^{2}=0&\text{on }\partial\Omega\end{array}\right.

in the weak sense. Thus, for each $i=1,2,$ multiplying by $w_{i}^{1}-w_{i}^{2}$ and integrating over $\Omega$ yield

	$\displaystyle\left\\|w_{i}^{1}-w_{i}^{2}\right\\|_{H_{0}^{1}\left(\Omega\right)}% ^{2}$	(3.21)
$\displaystyle=$	$\displaystyle\int_{\Omega^{\prime}}\left(\eta_{i}\left(v^{1}\right)-\eta_{i}% \left(v^{2}\right)\right)\left(w_{i}^{1}-w_{i}^{2}\right)$	(3.22)
$\displaystyle\leq$	$\displaystyle\left\\|\eta_{i}\left(v^{1}\right)-\eta_{i}\left(v^{2}\right)% \right\\|_{L^{2}\left(\Omega^{\prime}\right)}\left\\|w_{i}^{1}-w_{i}^{2}\right\\|% _{L^{2}\left(\Omega^{\prime}\right)}$	(3.23)
$\displaystyle\leq$	$\displaystyle\left(\left\\|\eta_{i}\left(v_{1}^{1},v_{2}^{1}\right)-\eta_{i}% \left(v_{1}^{2},v_{2}^{1}\right)\right\\|_{L^{2}\left(\Omega^{\prime}\right)}+% \left\\|\eta_{i}\left(v_{1}^{2},v_{2}^{1}\right)-\eta_{i}\left(v_{1}^{2},v_{2}^% {2}\right)\right\\|_{L^{2}\left(\Omega^{\prime}\right)}\right)\left\\|w_{i}^{1}-% w_{i}^{2}\right\\|_{L^{2}\left(\Omega\right)}$	(3.24)

One has

	$\displaystyle\left\\|\eta_{i}\left(v_{1}^{1},v_{2}^{1}\right)-\eta_{i}\left(v_{% 1}^{2},v_{2}^{1}\right)\right\\|_{L^{2}\left(\Omega^{\prime}\right)}$	$\displaystyle\leq$	$\displaystyle l_{i1}\left\\|v_{1}^{1}-v_{1}^{2}\right\\|_{L^{2}\left(\Omega% \right)},$
	$\displaystyle\left\\|\eta_{i}\left(v_{1}^{2},v_{2}^{1}\right)-\eta_{i}\left(v_{% 1}^{2},v_{2}^{2}\right)\right\\|_{L^{2}\left(\Omega^{\prime}\right)}$	$\displaystyle\leq$	$\displaystyle l_{i2}\left\\|v_{2}^{1}-v_{2}^{2}\right\\|_{L^{2}\left(\Omega% \right)}.$

Using twice Poincaré’s inequality we deduce

\left\|w_{i}^{1}-w_{i}^{2}\right\|_{H_{0}^{1}\left(\Omega\right)}\leq\frac{1}{% \lambda_{1}}\left(l_{i1}\left\|v_{1}^{1}-v_{1}^{2}\right\|_{H_{0}^{1}\left(% \Omega\right)}+l_{i2}\left\|v_{2}^{1}-v_{2}^{2}\right\|_{H_{0}^{1}\left(\Omega% \right)}\right).

Therefore

\left(\begin{array}[]{c}\left\|T_{1}\left(v^{1}\right)-T_{1}\left(v^{2}\right)% \right\|_{H_{0}^{1}\left(\Omega\right)}\\ \left\|T_{2}\left(v^{1}\right)-T_{2}\left(v^{2}\right)\right\|_{H_{0}^{1}\left% (\Omega\right)}\end{array}\right)\leq\mathcal{M}\left(\begin{array}[]{c}\left% \|v_{1}^{1}-v_{1}^{2}\right\|_{H_{0}^{1}\left(\Omega\right)}\\ \left\|v_{2}^{1}-v_{2}^{2}\right\|_{H_{0}^{1}\left(\Omega\right)}\end{array}% \right).

Since the spectral radius of $\mathcal{M}$ is less than one, we may apply Perov’s fixed point theorem to deduce the existence and uniqueness of $u\in D_{rR}^{s}$ with $u=T\left(u\right).$

Remark 12

If the functions $\eta_{1},\eta_{2}$ are nondecreasing in both variables in $\left[r_{1},R_{1}\right]\times\left[r_{2},R_{2}\right],$ then $m_{\eta_{i}}=\eta_{i}\left(r\right),$ $M_{\eta_{i}}=\eta_{i}\left(R\right)$ for $i=1,2$ and condition (3.19) becomes

r\leq\left(m_{h}+\eta\left(r\right)\right)\gamma,\ \ \ \ \left(M_{h}+\eta(R)% \right)\Gamma\leq R.\vskip 6.0pt plus 2.0pt minus 2.0pt

Let us notice that such vectors $r,R\$ always exist if the asymptotic conditions below are satisfied:

\ \lim_{\tau_{i}\rightarrow 0}\frac{\eta_{i}\left(\tau_{1},\tau_{2}\right)}{% \tau_{i}}=+\infty,\ \ \ \lim_{\tau_{i}\rightarrow+\infty}\frac{\eta_{i}\left(% \tau_{1},\tau_{2}\right)}{\tau_{i}}=0\ \ \left(i=1,2\right).

One also has the following variational characterizations of the localized solution.

Theorem 13

Under the assumptions of Theorem 11,

(a) $u=\left(u_{1},u_{2}\right)$ is a Nash equilibrium in $D_{rR\text{ }}^{s}\$ for the pair of partial energy functionals

	$\displaystyle J_{1}\left(v_{1},v_{2}\right)$	$\displaystyle=$	$\displaystyle\int_{\Omega}\left(\frac{1}{2}\left\|\nabla v_{1}\right\|^{2}-h_{1}% v_{1}\right)dx-\int_{\Omega^{\prime}}\int_{0}^{v_{1}\left(x\right)}\eta_{1}% \left(\tau,v_{2}\left(x\right)\right)d\tau dx,$
	$\displaystyle J_{2}\left(v_{1},v_{2}\right)$	$\displaystyle=$	$\displaystyle\int_{\Omega}\left(\frac{1}{2}\left\|\nabla v_{2}\right\|^{2}-h_{2}% v_{2}\right)dx-\int_{\Omega^{\prime}}\int_{0}^{v_{2}\left(x\right)}\eta_{2}% \left(v_{1}\left(x\right),\tau\right)d\tau dx.$

(b) if in addition $\eta$ is of potential type, i.e., $\ \eta=\nabla H,$ then $u$ minimizes in

$D_{rR}^{s}$ the functional

J_{D}\left(v\right)=\int_{\Omega}\left(\frac{1}{2}\left|\nabla v\right|^{2}-h% \cdot v\right)dx-\int_{\Omega^{\prime}}H\left(v\right)dx.

Proof. The proof is similar to that of Theorem 4.1 in [4] and we omit it.

4 Stokes systems with variable periodic viscosity

This section is devoted to the Stokes system with variable periodic viscosity (see [1]). We follow the same goals as in the previous section, namely the localization and multiplicity of solutions. The physical motivation consists in the incompressible flow in a domain filled with a mixture of fluids having a highly heterogeneous viscosity denoted $\mu^{\varepsilon}\left(x\right),$ which is a periodically varying function of the space variable with small period $\varepsilon>0$ . Mathematically, we have a family of equations depending on the small parameter $\varepsilon,$ and the problem consists in an asymptotic analysis, as $\varepsilon\rightarrow 0,$ aimed to give an averaged description of the process. As before, let $f\in L^{2}(\Omega;{\mathbb{R}}^{n})$ be a function representing the given external force. Let $Y=(0,1)^{n}$ be the unitary $n$ -cube and $\mu:Y\longrightarrow{\mathbb{R}}$ a $Y$ -periodic function belonging to $L^{\infty}(Y)$ . We define by $\mu^{\varepsilon}(x)=\mu\left(\frac{x}{\varepsilon}\right)$ the $\varepsilon$ -periodic scaled function, which represents the viscosity of a complex mixture of fluids having different viscosities. We assume that the viscosity $\mu^{\varepsilon}\left(x\right)$ is such that $\mu^{\varepsilon}\in C^{1}\left(\overline{\Omega}\right)$ and

0<\underline{\mu}\leq\mu^{\varepsilon}\left(x\right)\leq\overline{\mu}\text{\ % \ \ for all }x\in\Omega.\text{ }

(4.1)

Note that according to remarks (R2), (R3) from Section 2 and in view of (4.1), the constants $\Gamma_{f}$ and $\gamma_{f}$ do not depend on $\varepsilon.$ Consequently, all the estimations in Section 3 remain valid and we immediately obtain the following versions of the results in Section 3, for the $\varepsilon$ -parametrized problems and the homogenized ones. The convergence results and the localization of the solution for the homogenized problems are obtained as in [4, Theorem 3.2].

Thus we discuss below a series of parametrized problems.

1a. We start with the analogue of system (2.1), with the given external force $f$ , namely

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu^{\varepsilon}\left(x% \right)\nabla u^{\varepsilon}\right)+\nabla p^{\varepsilon}=f\left(x\right)&% \text{in }\Omega\\ \operatorname{div}\,u^{\varepsilon}=0&\text{in }\Omega\\ u^{\varepsilon}=0&\text{on }\partial\Omega,\end{array}\right.

(4.2)

where $u^{\varepsilon}$ and $p^{\varepsilon}$ represent the velocity and the pressure of the mixture. For a fixed $\varepsilon$ , system (4.2) is equivalent, as in the nonparametric case, to the diffusion problem

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu^{\varepsilon}\left(x% \right)\nabla w^{\varepsilon}\right)=f\left(x\right)&\text{in }\Omega\\ w^{\varepsilon}=0&\text{on }\partial\Omega.\end{array}\right.

(4.3)

The following analogue of Proposition 1 holds.

Theorem 14

\frac{r}{\gamma_{1_{\Omega^{\prime}}}}\leq f\left(x\right)\ \ \ \text{for a.e.% }x\in\Omega^{\prime}\ \ \ \text{and\ \ \ }0\leq f\left(x\right)\leq\frac{R}{% \Gamma_{1}}\ \ \text{for a.e. }x\in\Omega,

then the solution $w^{\varepsilon}=\left(L^{\varepsilon}\right)^{-1}f$ of (4.3) belongs to $D_{rR}$ . There is a function $w^{0}\in H^{1}_{0}(\Omega;{\mathbb{R}}^{n})$ such that

w^{\varepsilon}\rightharpoonup w^{0}\quad\quad\text{weakly in }H^{1}_{0}(% \Omega;{\mathbb{R}}^{n}),

$w^{0}$ belongs to $D_{rR}$ and it is the unique solution of the following homogenized problem

\left\{\begin{array}[]{ll}-\operatorname{div}\left(A^{\text{hom}}\nabla w^{0}% \right)=f&\text{in }\Omega\\ w^{0}=0&\text{on }\partial\Omega,\end{array}\right.

(4.4)

where the entries of the positive definite homogenized matrix $A^{\text{hom}}$ are given for $i,j\in\left\{1,..,n\right\}$ by

A^{\text{hom}}_{ij}=\int\limits_{Y}\mu(y)\nabla(\chi^{j}-y_{j})\cdot\nabla(% \chi^{i}-y_{i})dy,

(4.5)

and $\chi^{j}\in H^{1}_{\text{per}}(Y)=\{v\in H^{1}(Y);\,v\text{ is }\,Y-\text{% periodic}\}$ are the unique solutions of the local problems

\left\{\begin{array}[]{ll}-\operatorname{div}_{y}\left(\mu\left(y\right)\nabla% _{y}(\chi^{j}-y_{j}\right)=0&\text{in }Y\\ \int\limits_{Y}\chi^{j}dy=0.&\end{array}\right.

(4.6)

1b. We consider now the analogue of system (2.11), with an $\varepsilon$ -dependent reaction force, namely

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu^{\varepsilon}\left(x% \right)\nabla u^{\varepsilon}\right)+\nabla p^{\varepsilon}=h\left(x,u^{% \varepsilon}\left(x\right)+q^{\varepsilon}\left(x\right)\right)&\text{in }% \Omega\\ \operatorname{div}\,u^{\varepsilon}=0&\text{in }\Omega\\ u^{\varepsilon}=0&\text{on }\partial\Omega.\end{array}\right.

(4.7)

For a fixed $\varepsilon$ , system (4.7) is equivalent with the diffusion problem

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu^{\varepsilon}\left(x% \right)\nabla w^{\varepsilon}\right)=h\left(x,w^{\varepsilon}\left(x\right)% \right)&\text{in }\Omega\\ w^{\varepsilon}=0&\text{on }\partial\Omega.\end{array}\right.

(4.8)

Let the operator $L^{\varepsilon}$ be defined by $L^{\varepsilon}v=-\operatorname{div}(\mu^{\varepsilon}(x)\nabla v))$ . The analogue of Theorem 3 is the following.

Theorem 15

Assume that $h$ satisfies (h1) and (h2) with

r\leq\left(L^{\varepsilon}\right)^{-1}\underline{h}\text{ \ \ on\ }\Omega^{% \prime}\ \ \ \text{and\ \ \ }\left(L^{\varepsilon}\right)^{-1}\overline{h}\leq R% \ \ \ \text{on\ }\Omega

for every $\varepsilon\in(0,\varepsilon_{0}]$ and some $\varepsilon_{0}>0.$ Then problem (4.8) has a unique solution $w^{\varepsilon}\in D_{rR}.$ Moreover, $w^{\varepsilon}$ is in $D_{rR}$ a Nash equilibrium with respect to the partial energy functionals of the system. There is a function $w^{1}\in H^{1}_{0}(\Omega;{\mathbb{R}}^{n})$ such that

w^{\varepsilon}\rightharpoonup w^{1}\quad\quad\text{weakly in }H^{1}_{0}(% \Omega;{\mathbb{R}}^{n}),

$w^{1}$ belongs to $D_{rR}$ and it is the unique solution of the homogenized problem

\left\{\begin{array}[]{ll}-\operatorname{div}\left(A^{\text{hom}}\,\nabla w^{1% }\right)=h(x,w^{1})&\text{in }\Omega\\ w^{1}=0&\text{on }\partial\Omega,\end{array}\right.

(4.9)

where the matrix $A^{\text{hom}}$ is defined in (4.5).

So for both problems (4.2) and (4.7) we localized the recovered velocity $\ w^{\varepsilon}$ , as far as the homogenized recovered velocities $w$ and $w^{1}$ , respectively.

2a. The analogue of system (2.1), with an $\varepsilon$ -dependent external force is

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu^{\varepsilon}\left(x% \right)\nabla u^{\varepsilon}\right)+\nabla p^{\varepsilon}=f^{\varepsilon}% \left(x\right)&\text{in }\Omega\\ \operatorname{div}\,u^{\varepsilon}=0&\text{in }\Omega\\ u^{\varepsilon}=0&\text{on }\partial\Omega,\end{array}\right.

(4.10)

where $\ \operatorname{div}\Delta\left(L^{\varepsilon}\right)^{-1}f^{\varepsilon}=0;$

For fixed $\varepsilon$ , system (4.10) is equivalent with the diffusion problem

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu^{\varepsilon}\left(x% \right)\nabla u^{\varepsilon}\right)=f^{\varepsilon}\left(x\right)&\text{in }% \Omega\\ \operatorname{div}\,u^{\varepsilon}=0&\text{in }\Omega\\ u^{\varepsilon}=0&\text{on }\partial\Omega,\end{array}\right.

(4.11)

where $\ \operatorname{div}\Delta\left(L^{\varepsilon}\right)^{-1}f^{\varepsilon}=0.$ Moreover, if $f^{\varepsilon}\rightarrow f$ in $L^{2}(\Omega;{\mathbb{R}}^{n})$ , there is a function $u^{0}\in H^{1}_{0}(\Omega)$ such that for $\varepsilon\rightarrow 0$ one has

u^{\varepsilon}\rightharpoonup u^{0}\quad\text{weakly in }H^{1}_{0}(\Omega;{% \mathbb{R}}^{n})

(4.12)

and $u^{0}$ is the unique solution of the homogenized problem

\left\{\begin{array}[]{ll}-\operatorname{div}\left(A^{\text{hom}}\,\nabla u^{0% }\right)=f&\text{in }\Omega\\ \operatorname{div}u^{0}=0&\text{in }\Omega\\ u^{0}=0&\text{on }\partial\Omega,\end{array}\right.

(4.13)

where the matrix $A^{\text{hom}}$ is defined in (4.5).

For the case of an $\varepsilon$ -dependent non reactive force $f^{\varepsilon}$ strongly converging in $L^{2}(\Omega;{\mathbb{R}}^{2})$ to $f$ , assuming that $\ \operatorname{div}\Delta\left(L^{\varepsilon}\right)^{-1}f^{\varepsilon}=0$ and denoting $\ h^{\varepsilon}:=-\Delta\left(L^{\varepsilon}\right)^{-1}f^{\varepsilon},\$ we may state the following localization result for problem (4.10), the analogue of Proposition 7.

Theorem 16

If there is an $\ \varepsilon_{0}>0$ such that

0\leq h^{\varepsilon}\left(x\right)\leq\frac{R}{\Gamma}\text{\ \ \ for a.e. }x\in\Omega\ \text{ and}

(4.14)

\frac{r}{\gamma}\leq h^{\varepsilon}\left(x\right)\text{\ \ \ for a.e. }x\in% \Omega^{\prime},

(4.15)

for every $\ \varepsilon\in(0,\varepsilon_{0}],$ then the velocity $\ u^{\varepsilon}$ , unique solution of problem (4.11) satisfies

	$\displaystyle 0$	$\displaystyle\leq$	$\displaystyle u^{\varepsilon}\left(x\right)\leq R\ \ \ \text{\ for a.e. }x\in% \Omega\text{\ \ and}$
	$\displaystyle r$	$\displaystyle\leq$	$\displaystyle u^{\varepsilon}\left(x\right)\text{\ \ \ for a.e. }x\in\Omega^{% \prime}\ \ \left(0<\varepsilon\leq\varepsilon_{0}\right).$

Convergence (4.12) holds and the homogenized velocity $u^{0}$ , unique solution of problem (4.13) also satisfies

	$\displaystyle 0$	$\displaystyle\leq$	$\displaystyle u^{0}\left(x\right)\leq R\ \ \ \text{\ for a.e. }x\in\Omega\text% {\ \ and}$
	$\displaystyle r$	$\displaystyle\leq$	$\displaystyle u^{0}\left(x\right)\text{\ \ \ for a.e. }x\in\Omega^{\prime}\ \ .$

2b. For the analogue of the planar system (3.11) we consider, without loss of generality, the case $f(x)=0$

\left\{\begin{array}[]{ll}-\operatorname{div}\left(\mu^{\varepsilon}\left(x% \right)\nabla u^{\varepsilon}\right)+\nabla p^{\varepsilon}=\phi^{\varepsilon}% \left[u^{\varepsilon}\right]\left(x\right)&\text{in }\Omega\\ \operatorname{div}\,u^{\varepsilon}=0&\text{in }\Omega\\ u^{\varepsilon}=0&\text{on }\partial\Omega,\end{array}\right.

(4.16)

where the reaction force is of the form

\phi^{\varepsilon}\left[u^{\varepsilon}\right]\left(x\right)=L^{\varepsilon}% \left(-\Delta\right)^{-1}\left(1_{\Omega^{\prime}}\eta\left(u^{\varepsilon}% \left(.\right)\right)\right)\left(x\right).

Using the notations from Section 3.2 and the assumptions (3.16) on the given function $\ \eta,$ we have the following result for the system (4.16), which is the analogue of Theorem 11.

Theorem 17

Assume that $\eta$ is as in Theorem 11,

r\leq m_{\eta}\gamma,\ \ \ M_{\eta}\Gamma\leq R

(4.17)

and the spectral radius of the matrix $\ \mathcal{M}$ is strictly less than one. Then, there exists $\varepsilon_{0}>0$ such that for any $\ \varepsilon<\varepsilon_{0}$ , problem (4.16) has a unique solution $\ \left(u^{\varepsilon},0\right)$ in $D_{rR}^{s}\times L^{2}_{0}\left(\Omega\right)$ , where $L^{2}_{0}\left(\Omega\right)$ is the space of the $L^{2}\left(\Omega\right)$ functions with mean value zero on $\Omega$ . Moreover, there is a function $u^{1}\in H^{1}_{0}(\Omega;{\mathbb{R}}^{2})$ such that

u^{\varepsilon}\rightharpoonup u^{1}\quad\text{weakly in }H^{1}_{0}(\Omega;{% \mathbb{R}}^{2}),

$u^{1}$ belongs to $D_{rR}^{s}$ and it is the unique solution of the homogenized problem

\left\{\begin{array}[]{ll}-\operatorname{div}\left(A^{\text{hom}}\,\nabla u^{1% }\right)=\phi[u^{1}](x)&\text{in }\Omega\\ \operatorname{div}u^{1}=0&\text{in }\Omega\\ u^{1}=0&\text{on }\partial\Omega,\end{array}\right.

(4.18)

where the matrix $A^{\text{hom}}$ is defined in (4.5) and $\phi[u_{1}](x)=-\operatorname{div}(A^{\text{hom}}\,\nabla(-\Delta)^{-1}(1_{% \Omega^{\prime}}\eta(u^{1}(.)))(x))$ .

So for both problems (4.10) and (4.16) we localize the velocity $u^{\varepsilon},$ as far as the homogenized velocities $u^{0}$ and $u^{1}$ , respectively. For problem (4.16), multiple solutions can be obtained depending on the oscillatory properties of function $\eta.$

5 Conclusions

We addressed in this paper the stationary Stokes system with variable viscosity and a reaction force term. We gave appropriate conditions on the reaction force term in order to obtain the localization and multiplicity of solutions. The method used combines concepts and results from the linear theory of PDEs and nonlinear functional analysis. In particular, we use the Moser-Harnack inequality, arguments of fixed point theory and Ekeland’s variational principle The results obtained apply to systems with strongly oscillating periodic viscosity and the corresponding homogenized systems. In this context, a significant gain is that our method makes possible the emergence of finitely or infinitely many solutions.

As a perspective, let us mention that the method can be applied to other classes of partial differential equations.

References

[1] G. Allaire, T. Ghosh, and M. Vanninathan, Homogenization of Stokes System using Bloch Waves, Netw. Heterog. Media, 12(4) (2017), 525-550.
[2] R. Bunoiu, G. Cardone, R. Kengne, and J.L. Woukeng, Homogenization of 2D Cahn-Hilliard-Navier-Stokes system J. Elliptic Parabol. Equ., 6 (2020), 377-408.
[3] R. Bunoiu, and R. Precup, Vectorial Approach to Coupled Nonlinear Schrödinger Systems under Nonlocal Cauchy Conditions, Appl. Analysis, 95:4 (2016), 731-747.
[4] R. Bunoiu, and R. Precup, Localization and multiplicity in the homogenization of nonlinear problems, Adv. Nonlinear Anal., 9 (2020), 292-304.
[5] P. Colli, G. Gilardi, and G. Marinoschi, Global solution and optimal control of an epidemic propagation with a heterogeneous diffusion, Appl. Math. Optim., 89:1 (2024) 28.
[6] Z. Cai, and Y. Wang, Pseudostress-velocity formulation for incompressible Navier-Stokes equations, Int. J. Numer. Methods Fluids, 63:3 (2010), 341-356.
[7] J. Camaño, G.N. Gatica, R. Oyarzúa, and G. Tierra, An augmented mixed finite element method for the Navier-Stokes equations with variable viscosity, SIAM J. Numer. Anal., 54:2 (2016), 1069-1092.
[8] G. Cardone, R. Fares, and G.P. Panasenko, Asymptotic expansion of the solution of the steady Stokes equation with variable viscosity in a two-dimensional tube structure, J. Math. Phys., 53 (2012), 103702.
[9] R. Codina, and O. Soto, Finite element solution of the Stokes problem with dominating Coriolis force, Comput. Methods Appl. Mech. Engrg., 142 (1997), 215-234.
[10] P. Constantin and C. Foiaş, Navier-Stokes Equations, Chicago University Press, 1988.
[11] R. Fares, G.P. Panasenko and R. Stavre, A viscous fluid flow through a thin channel with mixed rigid-elastic boundary: Variational and asymptotic analysis, Abstr. Appl. Anal., volume 2012, (2012) ID 152743.
[12] M. Gahn, M. Neuss-Radu, and P. Knabner, Homogenization of reaction-diffusion processes in a two-component porous medium with nonlinear flux conditions at the interface, SIAM J. Appl. Math., 76:5 (2016), 1819-1843.
[13] D. Gilbarg, and N.S. Trudinger, Elliptic Partial Differential Equations of Second Order, Springer, Berlin, 1998.
[14] V. Girault, and P.-A. Raviart, Finite Element Approximation of the Navier-Stokes Equations, Springer, Berlin, 1981.
[15] J. Jost, Partial Differential Equations, Springer, New York, 2007.
[16] M. Kohr, S.E. Mikhailov, and W.L. Wendland, Potentials and transmission problems in weighted Sobolev spaces for anisotropic Stokes and Navier-Stokes systems with $L_{\infty}$ strongly elliptic coefficient tensor, Complex Var. Elliptic Equ., 66 (2020), 109-140.
[17] S. Lee, S.-K. Ryi, and H. Lim, Solutions of Navier-Stokes equation with Coriolis force, Adv. Math. Phys., Article ID 7042686, (2017) 1-9.
[18] G. Lukaszewicz, and P. Kalita, Navier-Stokes Equations, Springer, 2016.
[19] M. Neuss-Radu, W. Jäger, Effective Transmission Conditions for Reaction-Diffusion Processes in Domains Separated by an Interface, SIAM J. Math. Anal., 39:3 (2007), 687-720.
[20] G.P. Panasenko, and R. Stavre, Asymptotic analysis of the Stokes flow with variable viscosity in a thin elastic channel, Netw. Heterog. Media, 5(4) (2010), 783-812.
[21] A.I. Perov, On the Cauchy problem for a system of ordinary differential equations, Pviblizhen. Met. Reshen. Differ. Uvavn., 2 (1964), 115-134. Russian.
[22] R. Precup, The role of matrices that are convergent to zero in the study of semilinear operator systems, Math. Comp. Modell., 49 (2009), 703-708.
[23] R. Precup, Moser-Harnack inequality, Krasnosel’skii type fixed point theorems in cones and elliptic problems, Topol. Methods Nonlinear Anal., 40 (2012), 301-313.
[24] R. Precup, Nash-type equilibria and periodic solutions to nonvariational systems, Adv. Nonlinear Anal., 3 (2014), 197-207.
[25] H. Sohr, The Navier-Stokes Equations, Birkhäuser, Basel, 2001.
[26] A. Stan, Nonlinear systems and Nash type equilibria, Studia Univ. Babeş-Bolyai Math., 66:2 (2021), 397-408.
[27] R. Temam, Navier-Stokes Equations and Nonlinear Functional Analysis, SIAM, Philadelphia, 1995.

	$\displaystyle\left\\|w_{i}^{k+p}-w_{i}^{k}\right\\|_{H_{0}^{1}\left(\Omega\right% )}\leq$		(3.6)
	$\displaystyle\left\\|N_{i}\left(w_{1}^{k+p},..,w_{i}^{k+p},w_{i+1}^{k+p-1},..,w% _{n}^{k+p-1}\right)-N_{i}\left(w_{1}^{k},..,w_{i}^{k},w_{i+1}^{k-1},..,w_{n}^{% k-1}\right)\right\\|_{H_{0}^{1}\left(\Omega\right)}+\left\\|v_{ik+p}-v_{ik}% \right\\|_{H_{0}^{1}\left(\Omega\right)}\leq$
	$\displaystyle\sum\limits_{j=1}^{i}L_{ij}\left\\|w_{j}^{k+p}-w_{j}^{k}\right\\|_{% H_{0}^{1}\left(\Omega\right)}+\sum\limits_{j=i+1}^{n}L_{ij}\left\\|w_{j}^{k+p-1% }-w_{j}^{k-1}\right\\|_{H_{0}^{1}\left(\Omega\right)}+\left\\|v_{ik+p}-v_{ik}% \right\\|_{H_{0}^{1}\left(\Omega\right)}.$

	$\displaystyle\left\\|\eta_{i}\left(v_{1}^{1},v_{2}^{1}\right)-\eta_{i}\left(v_{% 1}^{2},v_{2}^{1}\right)\right\\|_{L^{2}\left(\Omega^{\prime}\right)}$	$\displaystyle\leq$	$\displaystyle l_{i1}\left\\|v_{1}^{1}-v_{1}^{2}\right\\|_{L^{2}\left(\Omega% \right)},$
	$\displaystyle\left\\|\eta_{i}\left(v_{1}^{2},v_{2}^{1}\right)-\eta_{i}\left(v_{% 1}^{2},v_{2}^{2}\right)\right\\|_{L^{2}\left(\Omega^{\prime}\right)}$	$\displaystyle\leq$	$\displaystyle l_{i2}\left\\|v_{2}^{1}-v_{2}^{2}\right\\|_{L^{2}\left(\Omega% \right)}.$

Posts by Radu Precup

Abstract

Authors

Keywords

Paper coordinates

PDF

About this paper

Journal

Publisher Name

DOI

Print ISSN

Online ISSN

References

Paper (preprint) in HTML form

Localization and multiplicity for stationary Stokes systems with variable viscosity

Abstract

1 Introduction

2 Statement of the problem and preliminary results

3 Main results

3.1 Localization of the recovered velocity

Proposition 1

Remark 2

Theorem 3

Theorem 4

3.2 Localization of the velocity

Lemma 5

Remark 6

Proposition 7

Proposition 8

Proposition 9

Proposition 10

Theorem 11

Remark 12

Theorem 13

4 Stokes systems with variable periodic viscosity

Theorem 14

Theorem 15

Theorem 16

Theorem 17

5 Conclusions

References

Related Posts