Abelian integrals for polynomials with trivial global monodromy on C2

Abstract

We consider infinitesimal perturbations of Hamiltonian differential equations dH + ω =0 on the complex plane C2, where H is a polynomial of degree m+1 and ω is a non-exact polynomial 1-form of degree n. In order to study these perturbed differential equations, the associated Abelian integrals I(c)=∫γ(c) ω are valuable tools. We assume that the polynomials H are primitive with trivial global monodromy. For these polynomials, W. D. Neumann and P. Norbury provided a classification in three large families, up to algebraic equivalence. The knowledge of these families allows us to prove as first main result, that the respective Abelian integrals I(c) are polynomial functions of the variable c, and to find sharp explicit upper bounds for the number of their zeros. The bounds depend on m, n and the number of the generators of the fundamental group of the generic fibers of H. These upper bounds works for several new families of infinitesimal perturbations of Hamiltonian differential equations. Under trivial global monodromy, there exist canonical global generators BC(H)= \ γ i(c)\ of the fundamental groups for all the generic fibers of H, which are complex cycles of dH=0. As second main result; we compute the number of complex limit cycles of dH+ ω=0 which originate from complex cycles in BC(H). Several accurate examples are provided.