Bifurcations from families of periodic solutions in piecewise differential systems

Abstract

Consider a differential system of the form x'=F0(t,x)+Σi=1k i Fi(t,x)+k+1 R(t,x,), where Fi:S1 × D Rm and R:S1 × D × (-0,0) Rm are piecewise Ck+1 functions and T-periodic in the variable t. Assuming that the unperturbed system x'=F0(t,x) has a d-dimensional submanifold of periodic solutions with d<m, we use the Lyapunov-Schmidt reduction and the averaging theory to study the existence of isolated T-periodic solutions of the above differential system.