Obstructions for Morin and fold maps: Stiefel-Whitney classes and Euler characteristics of singularity loci
Abstract
For a singularity type η, let the η-avoiding number of an n-dimensional manifold M be the lowest k for which there is a map Mn+k without η type singular points. For instance, the case of η=1 is the case of immersions, which has been extensively studied in the case of real projective spaces. In this paper we study the η-avoiding number for other singularity types. Our results come in two levels: first we give an abstract reasoning that a non-zero cohomology class is supported on the singularity locus η(f), proving that η(f) cannot be empty. Second, we interpret this obstruction as a non-zero invariant of the singularity locus η(f) for generic f. The main technique that we employ is Sullivan's Stiefel-Whitney classes, which are mod 2, real analogues of the Chern-Schwartz-MacPherson (CSM) classes. We introduce the Segre-Stiefel-Whitney classes of a singularity s swη whose lowest degree term is the mod 2 Thom polynomial of η. Using these techniques we compute some universal formulas for the Euler characteristic of a singularity locus.
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