Hilbert-Kunz Multiplicity of Fibers and Bertini Theorems

Abstract

Let k be an algebraically closed field of characteristic p > 0. We show that if X⊂eqPnk is an equidimensional subscheme with Hilbert--Kunz multiplicity less than λ at all points x∈ X, then for a general hyperplane H⊂eqPnk, the Hilbert--Kunz multiplicity of X H is less than λ at all points x∈ X H. This answers a conjecture and generalizes a result of Carvajal-Rojas, Schwede and Tucker, whose conclusion is the same as ours when X⊂eqPnk is normal. In the process, we substantially generalize certain uniform estimates on Hilbert--Kunz multiplicities of fibers of maps obtained by the aforementioned authors that should be of independent interest.