Noetherianity and length of Melnikov functions
Abstract
We study foliations in C2 given by polynomial deformations of the form dH+ε η=0, with γ(t)⊂ H-1(t) a family of cycles. The Poincar\'e first return map is of the form P(t)=t+Σj εj Mjγ(t). The functions Mjγ are called Melnikov functions and are given by iterated integrals of orbit length at most j. We show that, for each k∈N, there exists a universal Noetherianity index n H,γ(k), independent of the deformation η, such that, if Mjγ0, for j=1,…,n H,γ(k), then Mjγ is of orbit length j-k, for any Melnikov function Mjγ. We call the smallest index with this property just the Noetherianity index H,γ(k). In order to prove this theorem, we develop a structure theorem for Melnikov functions and use the Ritt-Raudenbush differential algebra theorem. We calculate the universal Noetherianity index nH,γ(k) in various nontrivial examples.
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