A random nonlinear multivalued evolution equation in Hilbert space

Dimitrios Kravvaritis; Nikolaos S. Papageorgiou

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A Random Evolution Inclusion of Subdifferential Type in Hilbert Spaces

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In this paper we study a nonlinear evolution inclusion of subdifferential type in Hilbert spaces. The perturbation term is Hausdorff continuous in the state variable and has closed but not necessarily convex values. Our result is a stochastic generalization of an existence theorem proved by Kravvaritis and Papageorgiou in [6].

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Existence and relaxation results for nonlinear second order evolution inclusions

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CONTENTSIntroduction.......................................................................................................... 51. Multifunctions and selections............................................................................... 7 1. Multifunctions and selections.................................................................. 7 2. Continuous multifunctions and selections........................................... 9 3. Measurable multifunctions and selections...............................................

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On a time-dependent subdifferential evolution inclusion with Carathéodory perturbation

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On an infinite-dimensional Hilbert space, we establish the existence of solutions for some evolution problems associated with time-dependent subdifferential operators whose perturbations are Carathéodory single-valued maps.