On the Number of Isolated Zeros of Pseudo-Abelian Integrals: Degeneracies of the Cuspidal Type

Abstract

We consider a multivalued function of the form H\=P\α\0Πk\i=1P\iα\i, P\i∈R[x,y], α\i∈R\+, which is a Darboux first integral of polynomial one-form ω=M\dH\H\=0, M\=P\Πk\i=1P\i. We assume, for =0, that the polycyle \H\0=H=0\ has only cuspidal singularity which we assume at the origin and other singularities are saddles. We consider families of Darboux first integrals unfolding H\ (and its cuspidal point) and pseudo-Abelian integrals associated to these unfolding. Under some conditions we show the existence of uniform local bound for the number of zeros of these pseudo-Abelian integrals.