Posts by Radu Precup

Abstract

We use topological methods to develop an existence theory for nonlinear operator equations of Hammerstein type in Banach spaces. In particular our theory yields existence results to initial and boundary value problems for functional-differential equations in abstract spaces.

Authors

Donal O’Regan
Department of Mathematics National University of Ireland Galway, Ireland

Radu Precup
Department of Mathematics Babes-Bolyai University, Cluj-Napoca, Romania

Keywords

Abstract Hammerstein equation; Nonlinear integral equation; Integro-differential equation; Evolution equation.

Paper coordinates

D. O’Regan, R. Precup, Existence theory for nonlinear operator equations of Hammerstein type in Banach spaces, Dynamic Systems Appl. 14 (2005), 121-134.

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About this paper

Journal

Dynamic Systems and Applications

Publisher Name

1056-2176

Print ISSN
Online ISSN

1056-2176

MR2128316, Zbl 1086.47034. journal website: https://www.acadsol.eu/dsa/

google scholar link

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[5] Couchouron, J-F. and Precup, R., Existence principles for inclusions of Hammerstein type involving noncompact acyclic multivalued maps, Electron. J. Differential Equations 2002 (2002), No. 04, 1-21.
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[11] O’Regan, D., Volterra and Urysohn integral equations in Banach spaces, J. Appl. Math. Stochastic Anal. 11 (1998), 449-464.
[12] O’Regan, D. and Meehan, M., Existence Theory for Nonlinear Integral and Integrodifferential Equations, Kluwer Academic Publishers, Dordrecht–Boston–London, 1998.
[13] O’Regan, D. and Precup, R., Existence criteria for integral equations in Banach spaces, J. Inequal. Appl. 6 (2001), 77-97.
[14] O’Regan, D. and Precup, R., Theorems of Leray-Schauder Type and Applications, Gordon and Breach Science Publishers, Amsterdam, 2001.
[15] O’Regan, D. and Precup, R., Integrable solutions of Hammerstein integral inclusions in Banach spaces, Dynamics Cont., Discrete Impulsive Systems 9 (2002), 165-176.
[16] Precup, R., Methods in Nonlinear Integral Equations, Kluwer Academic Publishers, Dordrecht–Boston–London, 2002.

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