On F-pure thresholds

Abstract

Using the Frobenius map, we introduce a new invariant for a pair (R,) of a ring R and an ideal ⊂ R, which we call the F-pure threshold c() of , and study its properties. We see that the F-pure threshold characterizes several ring theoretic properties. By virtue of Hara and Yoshida's result, the F-pure threshold c() in characteristic zero corresponds to the log canonical threshold lc() which is an important invariant in birational geometry. Using the F-pure threshold, we prove some ring theoretic properties of three-dimensional terminal singularities of characteristic zero. Also, in fixed prime characteristic, we establish several properties of F-pure threshold similar to those of the log canonical threshold with quite simple proofs.

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