Geometric Equivariant Extension of Sections in GW Theory I

Gang Liu

arXiv:1509.06722·math.SG·September 23, 2015·1 cites

Geometric Equivariant Extension of Sections in GW Theory I

Gang Liu

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TL;DR

This paper clarifies and improves a key construction in the analytic foundation of Gromov-Witten (GW) theory, focusing on geometric equivariance in the extension of sections.

Contribution

It introduces a geometric equivariant extension method for sections in GW theory, enhancing the analytic framework and clarifying previous results.

Findings

01

Provides a rigorous geometric equivariant extension technique

02

Improves the analytic foundation of GW theory

03

Clarifies previous constructions in GW theory

Abstract

This paper is to explain one of the two constructions in our work [L] on analytic foundation of GW theory. We improve and clarify the results there.

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Taxonomy

TopicsGeometric and Algebraic Topology · Homotopy and Cohomology in Algebraic Topology · Advanced Topics in Algebra