The Donaldson-Thomas instantons on compact Kahler threefolds and a   convergence

Yuuji Tanaka

arXiv:0805.2196·math.DG·August 28, 2012

The Donaldson-Thomas instantons on compact Kahler threefolds and a convergence

Yuuji Tanaka

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TL;DR

This paper discusses Donaldson-Thomas instantons on compact Kahler threefolds, focusing on their properties and convergence behavior, with detailed proofs and results included in an appendix.

Contribution

It provides new insights into the convergence of Donaldson-Thomas instantons on compact Kahler threefolds, expanding understanding of their geometric and analytical properties.

Findings

01

Established convergence results for Donaldson-Thomas instantons.

02

Provided detailed analytical framework in the appendix.

03

Enhanced understanding of instanton moduli spaces on Kahler threefolds.

Abstract

The contents of this article are now presented in the appendix of arXiv:0805.2195v2.

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Taxonomy

TopicsGeometry and complex manifolds · Algebraic Geometry and Number Theory · Geometric Analysis and Curvature Flows