Nilpotence of Orbits under Monodromy and the Length of Melnikov Functions

Abstract

Let F∈C[x,y] be a polynomial, γ(z)∈ π1(F-1(z)) a non-trivial cycle in a generic fiber of F and let ω be a polynomial 1-form, thus defining a polynomial deformation dF+εω=0 of the integrable foliation given by F. We study different invariants: the orbit depth k, the nilpotence classn, the derivative lengthd associated with the couple (F,γ). These invariants bound the length of the first nonzero Melnikov function of the deformation dF+εω along γ. We study in detail a simple example of a polynomial F given as product of four lines. We show how these invariants vary depending on the relative position of the four lines and relate it also to the length of the corresponding Godbillon-Vey sequence. We formulate a conjecture motivated by the study of this example.