Essential perturbations of polynomial vector fields with a period annulus

Abstract

In this paper we first give the explicit definition of essential perturbation. Secondly, given a perturbation of a particular family of centers of polynomial differential systems of arbitrary degree for which we explicitly know its Poincar\'e--Liapunov constants, we give the structure of its k-th Melnikov function. This result generalizes the result obtained by Chicone and Jacobs for perturbations of degree at most two of any center of a quadratic polynomial system. Moreover we study the essential perturbations for all the centers of the differential systems \[ x \, = \, -y + P d(x,y), y \, = \, x + Q d(x,y), \] where P d and Q d are homogeneous polynomials of degree d, for d=2 and d=3.