Zeroes of polynomials on definable hypersurfaces: pathologies exist, but they are rare

Abstract

Given a sequence \Zd\d∈ N of smooth and compact hypersurfaces in Rn-1, we prove that (up to extracting subsequences) there exists a regular definable hypersurface ⊂ RPn such that each manifold Zd appears as a component of the zero set on of some polynomial of degree d. (This is in sharp contrast with the case when is algebraic, where for example the homological complexity of the zero set of a polynomial p on is bounded by a polynomial in deg(p).) We call these "pathological examples". In particular, we show that for every 0 ≤ k ≤ n-2 and every sequence of natural numbers a=\ad\d∈ N there is a regular, compact and definable hypersurface ⊂ RPn, a subsequence \adm\m∈ N and homogeneous polynomials \pm\m∈ N of degree deg(pm)=dm such that: equation eq:pathintro bk( Z(pm))≥ adm.equation (Here bk denotes the k-th Betti number.) This generalizes a result of Gwo\'zdziewicz, Kurdyka and Parusi\'nski. On the other hand, for a given definable we show that the Fubini-Study measure, in the gaussian space of polynomials of degree d, of the set dm,a, of polynomials verifying bk( Z(pm))≥ adm is positive, but there exists a contant c such that this measure can be bounded by: equation 0<P(dm, a, )≤ c dmn-12adm. equation This shows that the set of "pathological examples" has "small" measure.