A lower bound on the analytic log-canonical threshold over local fields of positive characteristic

Abstract

Given a local field F of positive characteristic, an F-analytic manifold X and an analytic function f:X→ F, the F-analytic log-canonical threshold lctF(f;x0) is the supremum over the values s≥0 such that |f|F-s is integrable near x0∈ X. We show that lctF(f;x0)>0. Moreover, if f is a regular function on a smooth algebraic F-variety, we obtain an effective lower bound lctF(f;x0)>C, where C>0 is explicit and depends only on the complexity class of X and f.

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