On the F-purity of isolated log canonical singularities

Abstract

A singularity in characteristic zero is said to be of dense F-pure type if its modulo p reduction is locally F-split for infinitely many p. We prove that if x ∈ X is an isolated log canonical singularity with μ(x ∈ X) 2 (see Definition 1.4 for the definition of the invariant μ), then it is of dense F-pure type. As a corollary, we prove the equivalence of log canonicity and being of dense F-pure type in the case of three-dimensional isolated singularities.