Even-carry polynomials and cohomology of line bundles on the incidence correspondence in positive characteristic
Abstract
We consider the cohomology groups of line bundles L on the incidence correspondence, that is, a general hypersurface X ⊂ Pn-1 × Pn-1 of degrees (1,1). Whereas the characteristic 0 situation is completely understood, the cohomology in characteristic p depends in a mysterious way on the base-p digits of the degrees (d, e) of L. Gao and Raicu (following Linyuan Liu) prove a recursive description of the cohomology for n = 3, which relates to Nim polynomials when p = 2. In this paper, we devise a suitable generalization of Nim polynomials, which we call even-carry polynomials, by which we can solve the recurrence of Liu--Gao--Raicu to yield an explicit formula for the cohomology for n = 3 and general p. We also make some conjectures on the general form of the cohomology for general n and p, for which a recurrence relation was recently derived by Kyomuhangi--Marangone--Raicu--Reed.
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