Restricted version of the infinitesimal Hilbert 16th problem

Abstract

The paper deals with the infinitesimal Hilbert 16th problem: to find an upper estimate of the number of zeros of an Abelian integral regarded as a function of a parameter. In more details, consider a real polynomial H of degree n+1 in the plane, and a continuous family of ovals γt (compact components of level curves H = t) of this polynomial. Consider a polynomial 1-form ω with coefficients of degree at most n. Let I(t) = ∫γt ω. I The problem is to give an upper estimate of the number of zeros of this integral. We solve a restricted version of this problem. Namely, the form ω is arbitrary,, and the polynomial H, though having an arbitrary degree, is not too close to the hypersurface of degenerate (non ultra-Morse) polynomials. We hope that the solution of the restricted version of the problem is a step to the solution of the complete (nonrestricted) version.

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