The String Geometry Behind Topological Amplitudes

Carlo Angelantonj; Ignatios Antoniadis

arXiv:1910.03347·hep-th·January 29, 2020

The String Geometry Behind Topological Amplitudes

Carlo Angelantonj, Ignatios Antoniadis

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TL;DR

This paper links the generating function of $ =2$ topological strings to a six-dimensional Melvin background, providing a string theory realization of Nekrasov's $ ext{ extOmega}$-background and connecting topological string theory with gauge theory partition functions.

Contribution

It identifies the generating function of $ =2$ topological strings with a string theory realization of Nekrasov's $ ext{ extOmega}$-background in a six-dimensional Melvin background.

Findings

01

The partition function matches Nekrasov's $ ext{ extOmega}$-background in the field theory limit.

02

The analysis applies to both heterotic and type I string theories.

03

The work covers ordinary $ =2$ and $ =2^*$ theories.

Abstract

It is shown that the generating function of $N = 2$ topological strings, in the heterotic weak coupling limit, is identified with the partition function of a six-dimensional Melvin background. This background, which corresponds to an exact CFT, realises in string theory the six-dimensional $Ω$ -background of Nekrasov, in the case of opposite deformation parameters $ϵ_{1} = - ϵ_{2}$ , thus providing the known perturbative part of the Nekrasov partition function in the field theory limit. The analysis is performed on both heterotic and type I strings and for the cases of ordinary $N = 2$ and $N = 2^{*}$ theories.

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