Existence theorems for nonlinear evolution inclusions

In this paper we examine evolution inclusions of the subdifferential type with the set-valued perturbation being nonconvex valued and dissipative. Under certain generally mild hypotheses on the data, we prove the existence of a strong global ŝolution, extending earlier analogous results by M. Otani

In this paper we consider a nonlinear two-point boundary value problem for second order differential inclusions. Using the Leray Schauder principle and its multivalued analog due to Dugundji Granas, we prove existence theorems for convex and nonconvex problems. Our results are quite general and inco

In this paper we address the question of solvability of the differential inclusions (1.1). Our approach to these problems is based on the idea of constructing a sequence of approximate solutions which converges strongly and makes use of Gromov's idea (following earlier work of Nash and Kuiper) to co

We use fixed-point theory for multivalued maps to obtain general existence principles for nonlinear operator inclusions. Our maps are either of upper semicontinuous or lower semicontinuous type. (~) 1999 Elsevier Science Ltd. All rights reserved.