On a boundary problem that occurs in a steam boiler project

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C. Kalik
Institutul de Calcul

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C. Kalik, Sur un problème aux limites qui intervient dans un projet d’une chaudière à vapeur. (French) Mathematica (Cluj) 1 (24) 1959 27–34.

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Mathematica Cluj

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Published by the Romanian Academy Publishing House

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1222-9016

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2601-744X

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1959-Kalik-On-a-Boundary-Problem

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ON A LIMITATION PROBLEM THAT ARISES IN A STEAM BOILER PROJECT

by

C. KALIK

in Cluj

In his work [1], L. NÉMETI addresses a problem that arises when designing a tubular steam boiler with a forced passage. The author proposes a method for calculating the thermal stress in the tube walls. However, calculating the thermal stress requires knowing the temperature, which necessitates solving a boundary value problem. The aim of this work is to provide the solution to this boundary value problem.

First, we introduce the symbols used below and formulate the boundary value problem. Let

r, φ, z

cylindrical coordinates in three-dimensional space. The boiler tube is determined by the following inequalities:

r_{0} ⩽ r ⩽ r_{0} + s; 0 ⩽ φ ⩽ 2 π; - L ⩽ x ⩽ + L

Or

r_{0}

is the inner radius,

s

the thickness and

2 L

the length of the tube. The thermal field can be considered to be the same in each section of the tube with the plane

φ =

constant. The phenomenon becomes static at a certain point, therefore the function

u

which gives us the temperature values must satisfy the following partial differential equation:

\begin{matrix} (1.1) & HAS (u) = \frac{1}{r} \frac{\partial}{\partial r} (r \frac{\partial u}{\partial r}) + \frac{\partial^{2} u}{\partial z^{2}} = 0 \end{matrix}

at each point on the tube wall.
The boundary conditions are determined by the following data: outside the tube, a constant regime is maintained such that the heat flux is constant

Q

Let's assume that heat does not pass through the extremities

z = \pm L

of the tube, which means that here the
flow is equal to zero. The water in the tube reaches the level

z = 0

, while above this level there is steam. Let us also assume that at the inner surface of the tube the heat flux is proportional to the temperature. Based on these data, we obtain the following boundary conditions:

\frac{\partial u}{\partial v} = \frac{Q}{k}

on the outer surface of the tube,

\frac{\partial u}{\partial v} = 0

at the ends of the tube, and

\frac{\partial u}{\partial v} = \frac{h}{k} u

on the inner surface of the tube. Here

v

is the normal external surface of the tube,

k

is the coefficient of thermal conductivity and

h

is the heat transfer coefficient. It should be noted that

h

is equal to the constant

h_{1}

for water and at constant

h_{2}

for steam. We will write the boundary conditions we just formulated above into a single formula:

\begin{matrix} (1.2) & \frac{\partial u}{\partial v} - γ u = ψ \end{matrix}

Or

γ ⩾ 0

, while the measurement of the points for which

γ

is strictly positive is more g: a ade than zero. Due to the symmetry of the thermal field with respect to

φ

The boundary value problem (1.1)-(1.2) is in fact just a problem in the plane. Below we denote by

Ω

the planar domain given by the inequalities:

r_{0} < r < r_{0} + s; - L < z < + L

and by

I

the boundary of the domain

Ω

It
should be noted that the boundary value problem (1.1)-(1.2) has been studied in several articles [2], [3], [4]. The solution to the boundary value problem is sought by pursuing two approaches: applying the Fourier method and using the theory of functions of complex variables. However, the results obtained have not met the requirements of the technique. This is because the first method yielded an infinite system of linear equations that still needs to be studied. As for the second method, it only provides a solution when the tube thickness is very small, which does not correspond to the technical conditions.
2. We now proceed to the study of the boundary value problem (1.1)-(1.2) using the variational method.

Let's introduce Hilbert space

W_{2}^{(1)} (Ω)

defined as follows: any function

v (r, z)

belongs to space

W_{2}^{(1)} (Ω)

if it has all first-order partial derivatives generalized and square-summable (see [5] or [6]). Let us define the norm in this space using the equality

\begin{matrix} (2.1) & ‖ v ‖_{W_{2}^{(1)}}^{2} = \iint_{0} [{(\frac{\partial v}{\partial r})}^{2} + (\frac{\partial v}{\partial z})] r d Ω + \int_{Γ} γ v^{2} r d σ \end{matrix}

Or

d Ω

is the element of the surface and

d σ

is the element of the arc. The space

W_{2}^{(1)} (Ω)

is complete and separable [5]. We will study the functional

\begin{matrix} (2.2) & F (v) = \iint_{Ω} [{(\frac{\partial v}{\partial r})}^{2} + {(\frac{\partial v}{\partial z})}^{2}] r d Ω + \int_{Γ} γ v^{2} r d σ - 2 \int_{Γ} ψ \cdot v \cdot r d σ \end{matrix}

defined on the elements of space

W_{2}^{(1)} (Ω)

The existence of line integrals is guaranteed by SL Sobolev's immersion theorems

Lemma (2.1). The functional (2.2) is bounded internally on the set

W_{2}^{(1)} (Ω)

.

Indeed, according to the Cauchy-Buniakovsky inequalities and SL Sobolev's immersion theorems, we can write

\int_{Γ} ψ \cdot v \cdot r d σ ⩽ ‖ ψ ‖_{L_{2} (Γ)} \cdot ‖ v ‖_{L_{2} (Γ)} ⩽ ‖ ψ ‖_{L_{2} (Γ)} \cdot ‖ v ‖_{W_{2}^{(1)}} K_{1} = K \cdot ‖ v ‖_{W_{2}^{(1)}}

for each

v \in W_{2}^{(1)} (Ω)

The constant

K > 0

does not depend on the function

v (r, z)

and the standards of space

L_{2} (Γ)

are calculated using the weighting function

r

Using this inequality, we obtain

\begin{matrix} F (v) = ‖ v ‖_{W_{2}^{(1)}}^{2} - 2 \int_{Γ} ψ \cdot v \cdot r d σ ⩾ ‖ v ‖_{W_{2}^{(1)}}^{2} - 2 K ‖ v ‖_{W_{2}^{(1)}} = \\ = {(‖ v ‖_{W_{2}^{(1)}} - K)}^{2} - K^{2} ⩾ - K^{2} \end{matrix}

which means that lemma (2.1) is proven.
Let inf

F (v) = - d

By applying the ideas used by S.L. Sobolev

ν \in W_{2}^{' 1} (Ω)

For the solution to Neumann's problem [5], I will prove the following lemma:

Lemma (2.2). In Hilbert space

W_{2}^{(1)} (Ω)

there is a function

u (r, z)

for which

inf_{v \in W_{2}^{(1)} (Ω)} F (v) = F (u) = - d

and for which we have

\begin{matrix} (2.3) & \iint_{Ω} [\frac{\partial u}{\partial r} \frac{\partial v}{\partial r} + \frac{\partial u}{\partial z} \frac{\partial v}{\partial z}] r d Ω + \int_{Γ} γ u v r d σ - \int_{Γ} ψ v r d σ = 0 \end{matrix}

regardless of

v \in W_{2}^{(1)} (Ω)

Let us prove lemma (2.2). Let

{u_{n}}

a sequence of functions of space

W_{2}^{(1)} (Ω)

for which

\begin{matrix} (2.4) & \underset{n \to \infty}{limit} F (u_{n}) = - d \end{matrix}

We can immediately verify that

\begin{matrix} \frac{1}{2} F (u_{n}) + \frac{1}{2} F (u_{m}) - \dot{F} (\frac{u_{n} + u_{m}}{2}) = \frac{1}{2} {‖ u_{n} ‖}_{W_{2}^{(1)}}^{2} + \frac{1}{2} {‖ u_{m} ‖}_{W_{2}^{(1)}}^{2} - \\ - {‖ \frac{{\dot{u}}_{n} + u_{m}}{2} ‖}_{W_{2}^{(1)}}^{2} = {‖ \frac{{\dot{u}}_{n} - u_{m}}{2} ‖}_{W_{2}^{(1)}}^{2} \end{matrix}

Therefore, it follows from (2.4) that

{‖ u_{n} - u_{m} ‖}_{W_{2}^{(1)}} \to 0

But space

W_{2}^{(1)} (Ω)

being complete, it follows that the following

{u_{n}}

tends towards a function of space. Let us denote this function by

u (r, z)

In light of the above, it is evident that

inf_{v \in W_{2}^{(1)} (Ω)} F (v) = F (u) = - d

Let's return to equation (2.3). We have

\begin{matrix} F (u + λ v) = F (u) + 2 λ {\iint_{0} [\frac{\partial u}{\partial r} \frac{\partial v}{\partial r} + \frac{\partial u}{\partial z} \frac{\partial v}{\partial z}] r d Ω + \int_{Γ} γ u v r d σ - \int_{Γ} ψ v r d σ} + \\ + λ^{2} ‖ v ‖_{W_{2}^{(1)}}^{2} \end{matrix}

for any real value of the parameter

λ

and for any function

v

space

W_{2}^{(1)} (Ω)

By virtue of the fact that this expression must reach its minimum for

λ = 0

We obtain the necessary relation.
Theorem (2.1) The function

u (r, z)

which achieves the minimum of the functional (2.2) admits partial derivatives of almost any order at nearly every interior point of the domain

Ω

At the same time, it satisfies equation (1.1) almost everywhere in

Ω

.

Demonstration. Let

Ω^{'}

an arbitrary domain, internal to the domain

Ω, δ

the distance between

Ω^{'}

And

Γ, Q

any point of

Ω^{'}

Let's choose a function

g (ρ)

which meets the following conditions

g (ρ) = {\begin{cases} 1 pour ρ ⩽ \frac{1}{2} \\ 0 pour ρ ⩾ 1 \end{cases}

and which is infinitely differentiable.

ρ

denotes the distance between the points

P

And

Q, P

being an arbitrary point of the plane

r, z

We refer to

L (P, Q)

the fundamental solution (in the sense of EE Levi [8]) of equation (1.1).

Let's introduce the function

ξ (p)

determined as follows

\begin{matrix} (2.5) & ξ (p) = [g (\frac{ϱ}{h_{1}}) - g (\frac{ϱ}{h_{2}})] L (P, Q) \end{matrix}

Or

h_{1}

And

h_{2}

are two constants that satisfy the condition

0 < h_{1} < h_{2} < δ

We will demonstrate that the set of functions

{ω_{h} (ρ)}

Or

\begin{matrix} (2.6) & ω_{h} (ρ) = h^{2} A [g (\frac{ϱ}{h}) L (P, Q)] \end{matrix}

h

varying between

δ

and 0, forms a set of regular kernels according to Sobolev's theorem [7]. That is to say, it must be shown that

{ω_{h} (ρ)}

meets the following conditions:

${ω_{h} (ρ)}$ are uniformly limited with respect to $h$ and to $Q \in Ω^{'}$ ,
each function $ω_{h} (ρ)$ is summable with respect to each coordinate of the points $P$ And $Q$ ,
there are positive numbers $γ$ And $ε$ such that for each point $Q \in Ω^{'}$ we have

\iint_{ϱ < h} ω_{h} (ρ) d Ω_{p} > γ h^{2}

if

h < ε

and
4. outside the circle having the center

Q

and the radius

h

the function

ω_{h} (ρ)

is considered identically zero.

Let's check condition 1. For

ρ ⩽ \frac{h}{2}

We have

ω_{h} (ρ) = 0

by virtue of the definition of the fundamental solution

L (P, Q)

Therefore, condition 1 must be checked for

ρ > \frac{h}{2}

It is easy to notice that for

ρ > \frac{h}{2}

the absolute values of the first-order partial derivatives of the function

g (\frac{ϱ}{h})

are bounded above by

\frac{C_{1}}{h}

, while the absolute values of the second-order partial derivatives are bounded by

\frac{C_{2}}{h}

.

C_{1}

And

C_{2}

being positive constants. The function

L (P, Q)

can be written in the form

L (P, Q) = \frac{1}{2 π} \ln \frac{1}{ϱ} + W (P, Q)

Or

W (P, Q)

and all its partial derivatives possess a singularity smaller than the function

\frac{1}{2 π} \ln \frac{1}{ϱ}

and its derivatives, when

ρ \to 0

It follows that the absolute values of the first-order partial derivatives, as well as those of the second order, are bounded above by

\frac{C_{3}}{h}

respectively by

\frac{C_{4}}{h}

, when

ρ > \frac{h}{2} . C_{3}

And

C_{4}

are also positive constants. Having in mind the form of equation (1.1), it follows from the above.

| ω_{h} (ρ) | < C

whatever

h

And

Q

.

C

is a positive constant. Conditions 2 and 4 are easy to verify since the function

L (P, Q)

is infinitely differentiable with respect to the coordinates of the points

P

And

Q

; and the function

g (\frac{ϱ}{h}) = 0

When

ρ ⩾ h

Let's calculate the integral of condition 3.

But

\begin{matrix} \iint_{ϱ < h} ω_{h} (ρ) d Ω_{P} p = h^{2} \iint_{ϱ < h} A [g (\frac{ϱ}{h}) L (P, Q)] d Ω_{P} \\ \iint_{ϱ < h} A [g (\frac{ϱ}{h}) L (P, Q)] d Ω_{P} = \iint_{\frac{h}{2} < ϱ < h} A [g (\frac{ϱ}{h}) L (P, Q)] d Ω_{P} = \int_{C_{\frac{h}{2}}} [\frac{\partial L}{\partial v} + \\ + \frac{L}{r} \cos (v, r)] d σ_{P} = - \int_{C_{\frac{h}{2}}} (\frac{\partial L}{\partial ϱ} + \frac{L}{r}) d σ_{P} \to 1 \end{matrix}

when the radius of the circle

C_{\frac{h}{2}}

having the center in

Q

tends towards zero uniformly for each

Q \in Ω^{'}

. Either

γ

an arbitrary number in the interval

(0, 1)

We deduce from the above that we can determine a number

ε > 0

so that we have

\iint_{ϱ < h} ω_{h} (ρ) d Ω_{P} > γ h^{2}

if

h < ε

The
whole

{ω_{h} (ρ)}

being a regular set of kernels, as proved above, it follows that the functions

\begin{matrix} (2.7) & u_{h} (Q) = \frac{\iint_{o < h} ω_{h} (ρ) u (P) d Ω_{P}}{\iint_{o < h} ω_{h} (ρ) d Ω_{P}} \end{matrix}

almost in every

Q \in Ω^{'}

tend towards

u (Q)

When

h \to 0

Now
we can move on to the proof of theorem (2.1). It is obvious that the function

ξ (P)

belongs to space

W_{2}^{(1)} (Ω)

It is also easy to see that the same function

ξ (P)

is zero in a band adjacent to the boundary

Γ

Therefore, from (2.3) we deduce

\begin{matrix} (2.8) & \int_{Ω} \int [\frac{\partial u}{\partial r} \frac{\partial ξ}{\partial r} + \frac{\partial u}{\partial z} \frac{\partial ξ}{\partial z}] r d Ω = 0 \end{matrix}

where by

r

And

z

the coordinates of the point are designated

P

Applying Green's formula to (2.8), we obtain

\begin{matrix} (2.9) & \iint_{Ω} u A [ξ (P)] r d Ω = 0 \end{matrix}

hence, according to (2.6) it follows

\begin{matrix} (2.10) & \frac{1}{h_{1}^{2}} \iint ω_{h_{1}} (ρ) u (P) r d Ω_{P} = \frac{1}{h_{2}^{2}} \iint ω_{h_{2}} (ρ) u (P) r d Ω_{P} \end{matrix}

We can immediately see that the two sides of the last equality converge at each point

Q \in Ω^{'}

where the function (2.7) also converges. But according to equality (2.10) we write

u (Q) = \frac{1}{h^{2}} \iint_{Q} ω_{h} (ρ) u (P) r d Ω_{P}

which shows that the function

u (Q)

is infinitely differentiable, the second member of the last equality also being infinitely differentiable.

We will demonstrate that the function

u

satisfies equation (1.1) almost everywhere in

Ω

. Either

v \in W_{2}^{(1)} (Ω)

an arbitrary function equal to zero in a strip neighboring the boundary

Γ

We deduce from (2.3)

\int_{Ω} \int [\frac{\partial u}{\partial r} \frac{\partial v}{\partial r} + \frac{\partial u}{\partial z} \frac{\partial v}{\partial z}] r d Ω = 0

Applying Green's formula, we obtain

\iint_{Q} v A (u) r d Ω = 0

It follows that

A (u) = 0

is satisfied almost everywhere in

Ω

Therefore, theorem (2.1) is proven.

We now have to consider in which direction the boundary condition (1.2) is satisfied and to examine whether the solution of the boundary problem (1.1)-(1.2) is unique.

As expected, condition (1.2) is satisfied in a weak sense. We will denote by

{Ω_{m}}

a series of domains that tend towards

Ω

, When

m \to \infty

Suppose that the following

{Ω_{m}}

is monotonous, that is to say

Ω_{m} \subseteq Ω_{m + 1} \subset Ω

. Either

Γ_{m}

the border of

Ω_{m}

, which we assume continues on the segment. For a

v \in W_{2}^{(1)} (Ω)

arbitrary we obviously have

\iint_{Q} [\frac{\partial u}{\partial r} \frac{i v}{\partial r} + \frac{\partial u}{\partial z} \frac{\partial v}{\partial z}] r d Ω = lim_{m \to \infty} \int_{Q_{m}} \int_{m} [\frac{\partial u}{\partial r} \frac{\partial v}{\partial r} + \frac{\partial u}{\partial z} \frac{\partial v}{\partial z}] r d Ω = lim_{m \to \infty} \int_{Γ_{m}} v \frac{\partial u}{\partial v} r d σ

From (2.3) we obtain the following formula which shows in which direction condition (1.2) is satisfied. Namely:

\begin{matrix} (2.11) & lim_{m \to \infty} \int_{Γ_{m}} v \frac{\partial n}{\partial v} r d σ = - \int_{Γ} γ u v r d σ + \int_{Γ} ψ v r d σ \end{matrix}

As for the uniqueness of the solution to the boundary value problem, it can be proven in the following way. Suppose there are two solutions

u_{1}

And

u_{2}

of the problem to the boundaries that are part of the space

W_{2}^{(1)} (Ω)

The function

u = u_{1} - u_{2}

satisfies the condition

lim_{m \to \infty} \int_{Γ_{m}} v \frac{\partial u}{\partial v} r d σ = - \int_{Γ} γ u v r d σ

By replacing

v

by

u

we have

lim_{m \to \infty} \int_{Γ m} \int_{m} [{(\frac{\partial u}{\partial r})}^{2} + {(\frac{\partial u}{\partial z})}^{2}] r d Ω + \int_{Γ} γ u^{2} r d σ = 0

But bearing in mind the condition imposed on

γ

In p. 1, it follows from the preceding equality that

u \equiv 0

in

Ω

3.
For the approximate calculation of the solution to the boundary value problem (1.1)-(1.2), we will use the generalized Ritz method. We will seek the approximation of the order

n

of the solution

u (r, z)

in the following form:

\begin{matrix} (3.1) & u_{n} (r, z) = \sum_{p, q = 0}^{n} a_{p q} r^{p} z^{q} \end{matrix}

Let's determine the coefficients

a_{p q}

so that the function

F (u_{n}) = F (a_{p q}) (p, q = 0, \dots, n)

takes the minimum. We therefore obtain the approximations

u_{n} (r, z)

by solving the linear system of equations

\begin{matrix} (3.2) & \frac{\partial F}{\partial a_{p q}} = 0 (p, q = 0, \dots, n) \end{matrix}

It is obvious that the approximate solutions

u_{n}

tend towards the exact solution of the boundary value problem in the metric of space

W_{2}^{(1)} (Ω)

and according to SL Sobolev's immersion theorems, we can affirm that the functions

u_{n}

tend towards

u

also in the middle square.

BIBLIOGRAPHY

Németi L., Tensiuni termice în tuburi cu pereți subtiri în cazul unui cîmp termic simetric faţă de axă. Studii și Cercetări ştiințifice, Cluj. t. IV (1953) 64-72.
Călugăreanu G., Asupra unei probleme de propagarea căldurii. Studii şi cercetări științifice, Cluj t. IV (1953) 10-17.
Ionescu DV şi Né meti L., Integrarea uni ecuatii cu derivate partiale care ivtervine in problema calculului tensiunilor termice în tuburile fierbătoare ale cazanelor cu trecere forfată şi ale cazanelor cu radiație. Studii şi Cercetări Ştiințifice Cluj, t. IV (1953) 73-78.
Călugăreanu G. şi Rado F., Asupra uni problem de propagare a căldurii. Bulletin Ştiințific Secțiunea de Ştiințe Matematice şi Fizice t. VI (1954), 17-30.
Соболев С. Л., Unprecedented functional analysis in mathematics физике. Leningrad 1950.
Соболев С. Le. Matt. Инст. им. Стеклова, т. IX. (1935, 39-105.
Schwartz L., Theory of distributions I. Paris 1950.
Levi EE, Sulle equazioni lineari totally ellitiche alle terivate parziali. Returns. of the Circoio Matematico di Palermo. t. 24 (1907) 275-317.
Received March 5, 1958

ON SIMPLIFYING EXACT PROGRAMS FOR DISCRETE AUTOMATIC MECHANISMS

Abstract

by

Gr. C. MOIST.

in Bucharest

I

An exact program is a set formed by three arrays:

\begin{matrix} (III) & \begin{array}{lc} F (K_{0}, Z_{0}) = Z_{0} & Φ (K_{0}, Z_{0}) = W_{0} \\ F (K_{1}, Z_{0}) = Z_{1} & Φ (K_{1}, Z_{0}) = W_{1} \\ F (K_{2}, Z_{1}) = Z_{2} & Φ (K_{2}, Z_{1}) = W_{2} \\ \dots \dots \dots & \dots \cdot \dots \dots \\ F (K_{i}, Z_{i - 1}) = Z_{i} & (II) \\ \dots & Φ (K_{i}, Z_{i - 1}) = W_{i} \\ F (K_{n}, Z_{n - 1}) = Z_{n} & \dots \\ F (K_{0}, Z_{n}) = Z_{0} & Φ (K_{n}, Z_{n - 1}) = W_{n} \\ Z_{h} = Z_{j} \\ \dots \end{array} \end{matrix}

K_{0}, \dots, K_{n}, W_{0}, \dots, W_{n + 1}

are given elements;

Z_{0}, \dots, Z_{n}

are variables in an unknown domain

D; F (K, Z)

And

Φ (K, Z)

are unknown functions having the arguments

K \in (K_{0}, \dots, K_{n}), Z \in D, F (K, Z) \in D

,

Φ (K, Z) \in (W_{0}, \dots, W_{n + 1})

.

As an example, we will consider the following exact program:

D_{1}

, which is encountered when one wants to build a signaling device at a level crossing

1959

On a boundary problem that occurs in a steam boiler project

Abstract

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ON A LIMITATION PROBLEM THAT ARISES IN A STEAM BOILER PROJECT

BIBLIOGRAPHY

ON SIMPLIFYING EXACT PROGRAMS FOR DISCRETE AUTOMATIC MECHANISMS

Abstract

I

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