On Euler polynomials for projective hypersurfaces
Abstract
For every positive integer n∈ Z+ we define an `Euler polynomial' En(t)∈ Z[t], and observe that for a fixed n all Chern numbers (as well as other numerical invariants) of all smooth hypersurfaces in Pn may be recovered from the single polynomial En(t). More generally, we show that all Chern classes of hypersurfaces in a smooth variety may be recovered from its top Chern class.
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