Construction of universal Thom-Whitney-a stratifications, their functoriality and Sard-type Theorem for singular varieties

Abstract

Construction. For a dominating polynomial mapping F: Kn Kl with an isolated critical value at 0 (K an algebraically closed field of characteristic zero) we construct a closed bundle GF ⊂ T*Kn . We restrict GF over the critical points Sing(F) of F in F-1(0) and partition Sing(F) into 'quasistrata' of points with the fibers of GF of constant dimension. It turns out that T-W-a (Thom and Whitney-a) stratifications 'near' F-1(0) exist iff the fibers of bundle GF are orthogonal to the tangent spaces at the smooth points of the quasistrata (e. g. when l=1). Also, the latter are the orthogonal complements over an irreducible component S of a quasistratum only if S is universal for the class of T-W-a stratifications, meaning that for any \Sj'\j in the class, (F) = j S'j , there is a component S' of an Sj' with S S' being open and dense in both S and S' . Results. We prove that T-W-a stratifications with only universal strata exist iff all fibers of GF are the orthogonal complements to the respective tangent spaces to the quasistrata, and then the partition of (F) by the latter yields the coarsest universal T-W-a stratification. The key ingredient is our version of Sard-type Theorem for singular spaces in which a singular point is considered to be noncritical iff nonsingular points nearby are 'uniformly noncritical' (e. g. for a dominating map F: X Z meaning that the sum of the absolute values of the l× l minors of the Jacobian matrix of F , where l = (Z) , not only does not vanish but, moreover, is separated from zero by a positive constant).