Non-autonomous Parabolic Bifurcation

Abstract

Let f(z) = z+z2+O(z3) and fε(z) = f(z) + ε2. A classical result in parabolic bifurcation in one complex variable is the following: if N-πε 0 we obtain (fε)N Lf, where Lf is the Lavaurs map of f. In this paper we study a non-autonomous parabolic bifurcation. We focus on the case of f0(z)=z1-z. Given a sequence \εi\1≤ i≤ N, we denote fn(z) = f0(z) + εn2. We give sufficient and necessary conditions on the sequence \εi\ that imply that fN… f1 Id (the Lavaurs map of f0). We apply our results to prove parabolic bifurcation phenomenon in two dimensions for some class of maps.