Integrable functions within the theory of schemic motivic integration

Andrew R. Stout

arXiv:1309.1537·math.AG·September 24, 2013·1 cites

Integrable functions within the theory of schemic motivic integration

Andrew R. Stout

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TL;DR

This paper introduces a framework for defining and working with integrable functions in the context of schemic motivic integration, advancing the mathematical tools available for this area.

Contribution

It develops the foundational notions of integrable functions specifically tailored for schemic motivic integration, filling a gap in the existing theory.

Findings

01

Established a formal definition of integrable functions in schemic motivic integration

02

Extended the theoretical framework of motivic integration to include integrable functions

03

Provided groundwork for future applications in algebraic geometry and related fields

Abstract

We develop notions of integrable functions within the theory of schemic motivic integration.

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Taxonomy

TopicsAdvanced Theoretical and Applied Studies in Material Sciences and Geometry