Generic 2-parameter perturbations of parabolic singular points of vector fields in C

Abstract

We describe the equivalence classes of germs of generic 2-parameter families of complex vector fields z = ωε(z) on C unfolding a singular parabolic point of multiplicity k+1: ω0= zk+1 +o(zk+1). The equivalence is under conjugacy by holomorphic change of coordinate and parameter. As a preparatory step, we present the bifurcation diagram of the family of vector fields z = zk+1 + ε1 z + ε0 over CP1. This presentation is done using the new tools of periodgon and star domain. We then provide a description of the modulus space and (almost) unique normal forms for the equivalence classes of germs.