F-pure threshold and height of quasi-homogeneous polynomials

Abstract

We consider a quasi-homogeneous polynomial f ∈ Z[x0, …, xN] of degree w equal to the degree of x0 ·s xN and show that the F-pure threshold of the reduction fp ∈ Fp[x0, …, xN] is equal to the log canonical threshold if and only if the height of the Artin-Mazur formal group associated to HN-1( X, Gm,X ), where X is the hypersurface given by f, is equal to 1. We also prove that a similar result holds for Fermat hypersurfaces of degree >N+1. Furthermore, we give examples of weighted Delsarte surfaces which show that other values of the F-pure threshold of a quasi-homogeneous polynomial of degree w cannot be characterized by the height.