A Random Evolution Inclusion of Subdifferential Type in Hilbert Spaces

Kravvaritis, D.; Pantelidis, G.

Serdica Mathematical Journal (1996)

  • Volume: 22, Issue: 2, page 117-124
  • ISSN: 1310-6600

Abstract

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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].

How to cite

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Kravvaritis, D., and Pantelidis, G.. "A Random Evolution Inclusion of Subdifferential Type in Hilbert Spaces." Serdica Mathematical Journal 22.2 (1996): 117-124. <http://eudml.org/doc/11635>.

@article{Kravvaritis1996,
abstract = {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].},
author = {Kravvaritis, D., Pantelidis, G.},
journal = {Serdica Mathematical Journal},
keywords = {Subdifferential; Evolution Inclusions; Hausdorff Continuity; Measurable Multifunctions; nonlinear evolution inclusion of subdifferential type},
language = {eng},
number = {2},
pages = {117-124},
publisher = {Institute of Mathematics and Informatics Bulgarian Academy of Sciences},
title = {A Random Evolution Inclusion of Subdifferential Type in Hilbert Spaces},
url = {http://eudml.org/doc/11635},
volume = {22},
year = {1996},
}

TY - JOUR
AU - Kravvaritis, D.
AU - Pantelidis, G.
TI - A Random Evolution Inclusion of Subdifferential Type in Hilbert Spaces
JO - Serdica Mathematical Journal
PY - 1996
PB - Institute of Mathematics and Informatics Bulgarian Academy of Sciences
VL - 22
IS - 2
SP - 117
EP - 124
AB - 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].
LA - eng
KW - Subdifferential; Evolution Inclusions; Hausdorff Continuity; Measurable Multifunctions; nonlinear evolution inclusion of subdifferential type
UR - http://eudml.org/doc/11635
ER -

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