On the periodic solutions of discontinuous piecewise differential systems

Abstract

Motivated by problems coming from different areas of the applied science we study the periodic solutions of the following differential system x'(t)=F0(t,x)+ F1(t,x)+2 R(t,x,), when F0, F1, and R are discontinuous piecewise functions, and is a small parameter. It is assumed that the manifold Z of all periodic solutions of the unperturbed system x'=F0(t,x) has dimension n or smaller then n. The averaging theory is one of the best tools to attack this problem. This theory is completely developed when F0, F1 and R are continuous functions, and also when F0=0 for a class of discontinuous differential systems. Nevertheless does not exist the averaging theory for studying the periodic solutions of discontinuous differential system when F0≠0. In this paper we develop this theory for a big class of discontinuous differential systems.