Inversion of adjunction for F-signature
Abstract
Let (R,+D) be a log Q-Gorenstein pair where R is a Noetherian, F-finite, normal, local domain of characteristic p > 0, is an effective Q-divisor and D is an integral Q-Cartier divisor. We show that the left derivative of the F-signature function s(R, + tD) at t = 1 is equal to -s(OD, DiffD()). This equality is interpreted as a quantitative form of inversion of adjunction for strong F-regularity. As an immediate corollary, we obtain the inequality s(R,) ≥ s(OD, DiffD()). We also discuss the implications of our result for the conjectured connection between the F-signature and the normalized volume.
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