Generalized Proximal Normals and Flow Invariance for Differential Inclusions
Abstract
We generalize the concept of proximal normal and employ the generalized proximal aiming condition to prove the existence and flow invariance results for solutions of multivalued differential inclusions. The existence of Euler solutions for initial value problems, under nonlinear growth conditions is also established to exhibit the idea of comparison principle.
Published
2003-02-01
Issue
Section
Articles