Surfaces with central configuration and Dulac's problem for a three dimensional isolated Hopf singularity

Abstract

Let be a real analytic vector field with an elementary isolated singularity at 0∈ R3 and eigenvalues bi,c with b,c∈ R and b≠ 0. We prove that all cycles of in a sufficiently small neighborhood of 0, if they exist, are contained in a finite number of subanalytic invariant surfaces entirely composed by a continuum of cycles. In particular, we solve Dulac's problem, i.e. finiteness of limit cycles, for such vector fields.