Integrability of pushforward measures by analytic maps
Abstract
Given a map between -analytic manifolds over a local field of characteristic , we introduce an invariant which quantifies the integrability of pushforwards of smooth compactly supported measures by . We further define a local version near . These invariants have a strong connection to the singularities of . When is one-dimensional, we give an explicit formula for , and show it is asymptotically equivalent to other known singularity invariants such as the -log-canonical threshold at . In the general case, we show that is bounded from below by the -log-canonical threshold of the Jacobian ideal near . If , equality is attained. If , the inequality can be strict; however, for , we establish the upper bound , whenever . Finally, we specialize to polynomial maps between smooth algebraic -varieties and . We geometrically characterize the condition that over a large family of local fields, by showing it is equivalent to being flat with fibers of semi-log-canonical singularities.
Cite
@article{arxiv.2202.12446,
title = {Integrability of pushforward measures by analytic maps},
author = {Itay Glazer and Yotam I. Hendel and Sasha Sodin},
journal= {arXiv preprint arXiv:2202.12446},
year = {2024}
}
Comments
36 pages, second version after revision. To appear in Algebraic Geometry