A refinement of sharply F-pure and strongly F-regular pairs
Abstract
We point out that the usual argument used to prove that R is strongly F-regular if and only if RQ is strongly F-regular for every prime ideal Q ∈ R, does not generalize to the case of pairs (R, t). The author's definition of sharp F-purity for pairs (R, t) suffers from the same defect. We therefore propose different definitions of sharply F-pure and strongly F-regular pairs. Our new definitions agree with the old definitions in several common contexts, including the case that R is a local ring.
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