Bi-center conditions and bifurcation of limit cycles in a class of Z2-equivariant cubic switching systems with two nilpotent points

Abstract

In this paper, we generalize the Poincar\'e-Lyapunov method for systems with linear type centers to study nilpotent centers in switching polynomial systems and use it to investigate the bi-center problem of planar Z2-equivariant cubic switching systems associated with two symmetric nilpotent singular points. With a properly designed perturbation, 6 explicit bi-center conditions for such polynomial systems are derived. Then, based on the 6 center conditions, by using Bogdanov-Takens bifurcation theory with general perturbations, we prove that there exist at least 20 small-amplitude limit cycles around the nilpotent bi-center for a class of Z2-equivariant cubic switching systems. This is a new lower bound of cyclicity for such cubic polynomial systems, increased from 12 to 20.