We consider evolution variational inequalities with λ 0-pseudomonotone maps. The main properties of these maps are investigated. By using the finite-difference method, we prove the property of strong solvability for the class of evolution variational inequalities with λ 0-pseudomonotone maps. Using the penalty method for multivalued maps, we show the existence of weak solutions of evolution variational inequalities on closed convex sets. The class of multivalued penalty operators is constructed. We also consider a model example to illustrate this theory.
Multivalued penalty method for evolution variational inequalities with λ0-pseudomonotone multivalued maps / P. O., Kasyanov; V. S., Melnik; Toscano, Luisa. - In: NONLINEAR OSCILLATIONS. - ISSN 1536-0059. - ELETTRONICO. - 10:4(2007), pp. 481-509. [10.1007/s11072-008-0006-8]
Multivalued penalty method for evolution variational inequalities with λ0-pseudomonotone multivalued maps
TOSCANO, LUISA
2007
Abstract
We consider evolution variational inequalities with λ 0-pseudomonotone maps. The main properties of these maps are investigated. By using the finite-difference method, we prove the property of strong solvability for the class of evolution variational inequalities with λ 0-pseudomonotone maps. Using the penalty method for multivalued maps, we show the existence of weak solutions of evolution variational inequalities on closed convex sets. The class of multivalued penalty operators is constructed. We also consider a model example to illustrate this theory.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
