Bifurcation of limit cycles from a switched equilibrium in planar switched systems and its application to power converters

Abstract

We consider a switched system of two subsystems that are activated as the trajectory enters the regions \(x,y):x> x\ and \(x,y):x<- x\ respectively, where x is a positive parameter. We prove that a regular asymptotically stable equilibrium of the associated Filippov equation of sliding motion (corresponding to x=0) yields an orbitally stable limit cycle for all x>0 sufficiently small. The research is motivated by an application to a dc-dc power converter, where x>0 is used in place of x=0 to avoid sliding motions.