Hypersurface Singularities and Milnor Equisingularity

Abstract

Suppose that f defines a singular, complex affine hypersurface. If the critical locus of f is one-dimensional at the origin, we obtain new general bounds on the ranks of the homology groups of the Milnor fiber, Ff, 0, of f at the origin, with either integral or Z/p Z coefficients. If the critical locus of f has arbitrary dimension, we show that the smallest possibly non-zero reduced Betti number of Ff, 0 completely determines if f defines a family of isolated singularities, over a smooth base, with constant Milnor number. This result has a nice interpretation in terms of the structure of the vanishing cycles as an object in the perverse category.

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