Note on the 3-dimensional log canonical abundance in characteristic >3
Abstract
In this paper, we prove the non-vanishing and some special cases of the abundance for log canonical threefold pairs over an algebraically closed field k of characteristic p > 3. More precisely, we prove that if (X,B) be a projective log canonical threefold pair over k and KX+B is pseudo-effective, then (KX+B)≥ 0, and if KX+B is nef and (KX+B)≥ 1, then KX+B is semi-ample. As applications, we show that the log canonical rings of projective log canonical threefold pairs over k are finitely generated and the abundance holds when the nef dimension n(KX+B)≤ 2 or when the Albanese map aX:X Alb(X) is non-trivial. Moreover, we prove that the abundance for klt threefold pairs over k implies the abundance for log canonical threefold pairs over k.
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