English

Regularized integrals and manifolds with log corners

Differential Geometry 2026-04-03 v3 Mathematical Physics Algebraic Geometry math.MP Number Theory

Abstract

We introduce a natural geometric framework for the study of logarithmically divergent integrals on manifolds with corners and algebraic varieties, using the techniques of logarithmic geometry. Key to the construction is a new notion of morphism in logarithmic geometry itself, introduced by Howell, which allows us to interpret the ubiquitous rule of thumb ''limϵ0logϵ:=0\lim_{\epsilon\to 0} \log \epsilon := 0'' as the restriction to a submanifold. Via a version of de Rham's theorem with logarithmic divergences, we obtain a functorial characterization of the classical theory of ``regularized integration'': it is the unique way to extend the ordinary integral to the logarithmically divergent context while respecting the basic laws of calculus (change of variables, Fubini's theorem, and Stokes' formula.)

Keywords

Cite

@article{arxiv.2312.17720,
  title  = {Regularized integrals and manifolds with log corners},
  author = {Clément Dupont and Erik Panzer and Brent Pym},
  journal= {arXiv preprint arXiv:2312.17720},
  year   = {2026}
}

Comments

Minor changes. Some explanations added in Section 7

R2 v1 2026-06-28T14:04:46.206Z