Cubic perturbations of elliptic Hamiltonian vector fields of degree three

Abstract

The purpose of the present paper is to study the limit cycles of one-parameter perturbed plane Hamiltonian vector field X X : \ arrayllr x=\;\; Hy+ f(x,y)\\ y=-Hx+ g(x,y), array \;\;\;\;\; H~=12 y2~+U(x) . which bifurcate from the period annuli of X0 for sufficiently small . Here U is a univariate polynomial of degree four without symmetry, and f, g are arbitrary cubic polynomials in two variables. We take a period annulus and parameterize the related displacement map d(h,) by the Hamiltonian value h and by the small parameter . Let Mk(h) be the k-th coefficient in its expansion with respect to . We establish the general form of Mk and study its zeroes. We deduce that the period annuli of X0 can produce for sufficiently small , at most 5, 7 or 8 zeroes in the interior eight-loop case, the saddle-loop case, and the exterior eight-loop case respectively. In the interior eight-loop case the bound is exact, while in the saddle-loop case we provide examples of Hamiltonian fields which produce 6 small-amplitude limit cycles. Polynomial perturbations of X0 of higher degrees are also studied.