Quasi-F-splitting versus log canonicity
Abstract
In this paper, we investigate the relationship between quasi-F-splitting and log canonicity. We show that if a numerically Q-Gorenstein normal singularity is quasi-Fe-split for every e≥ 1, then it is numerically log canonical. In dimension two, we prove the converse under the condition that the Gorenstein index is not divisible by the characteristic p. We also classify two-dimensional quasi-F-split normal singularities.
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