Quadratic Segre indices
Abstract
We prove that the local Euler class of a line on a degree 2n-1 hypersurface in projective n+1 space is given by a product of indices of Segre involutions. Segre involutions and their associated indices were first defined by Finashin and Kharlamov over the reals. Our result is valid over any perfect field of characteristic not 2 and gives an infinite family of problems in enriched enumerative geometry with a shared geometric interpretation for the local type.
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