Global F-regularity for weak del Pezzo surfaces

Abstract

Let k be an algebraically closed field of characteristic p>0. Let X be a normal projective surface over k with canonical singularities whose anti-canonical divisor is nef and big. We prove that X is globally F-regular except for the following cases: (1) KX2=4 and p=2, (2) KX2=3 and p ∈ \2, 3\, (3) KX2=2 and p ∈ \2, 3\, (4) KX2=1 and p ∈ \2, 3, 5\. For each degree KX2, the assumption of p is optimal.

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