On characteristic classes of singular hypersurfaces and involutive symmetries of the Chow group
Abstract
For any algebraic scheme X and every (n,L)∈ Z× Pic(X) we define an associated involution of its Chow group A*X, and show that certain characteristic classes of (possibly singular) hypersurfaces in a smooth variety are interchanged via these involutions. For X=PN we show that such involutions are induced by involutive correspondences.
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