F-signature functions of diagonal hypersurfaces

Abstract

Let f be a diagonal hypersurface in Ap=Fp[[x1,…,xn]]. We study the behavior of the function φf,p(a/pe)=p-neFp(Ap/(x1pe,…,xnpe,fa)) which encodes information about the F-threshold, the Hilbert-Kunz, and the F-signature functions. We prove that when p goes to infinity φf,p converges to a piecewise polynomial function φf and the left and right derivatives of φf,p converge to φ'f. We use this fact to prove the existence of the limit F-signature and limit Hilbert-Kunz multiplicity for diagonal hypersurfaces. When f is a Fermat hypersurface, we investigate the shape of the F-signature function of f and provide an explicit formula for the limit F-signature and, in some cases, also for the F-signature for fixed p. This allows us to answer negatively to a question of Watanabe and Yoshida.