q-bic hypersurfaces and their Fano schemes

Abstract

A q-bic hypersurface is a hypersurface in projective space of degree q+1, where q is a power of the positive ground field characteristic, whose equation consists of monomials which are products of a q-power and a linear power; the Fermat hypersurface is an example. I identify q-bics as moduli spaces of isotropic vectors for an intrinsically defined bilinear form, and use this to study their Fano schemes of linear spaces. Amongst other things, I prove that the scheme of m-planes in a smooth (2m+1)-dimensional q-bic hypersurface is an (m+1)-dimensional smooth projective variety of general type which admits a purely inseparable covering by a complete intersection; I compute its Betti numbers by relating it to Deligne--Lusztig varieties for the finite unitary group; and I prove that its Albanese variety is purely inseparably isogenous via an Abel--Jacobi map to a certain conjectural intermediate Jacobian of the hypersurface. The case m = 1 may be viewed as an analogue of results of Clemens and Griffiths regarding cubic threefolds.