The Categorical 't Hooft Expansion

TL;DR

This paper explores the categorical structure of the 't Hooft large N expansion, proposing a method to derive the dual string theory's worldsheet description using extended dg-TFT and $A_ abla$-categories, linking D-branes to QFT modifications.

Contribution

It introduces a categorical framework for understanding the string dual of large N QFTs via dg-TFT and $A_ abla$-categories, providing a strategy to identify the worldsheet theory at leading order.

Findings

Proposes a categorical approach to the 't Hooft expansion.

Links D-branes to formal deformations of QFT modifications.

Suggests a method to derive the dual string theory's worldsheet structure.

Abstract

We review categorical aspects of 't Hooft's large $N$ expansion, which is expected to map any Quantum Field Theory of large matrices to a string theory. Our goal is to describe a general strategy to derive the string theory dual to given QFT, at least at the leading order in the 't Hooft expansion. The basic idea is to characterize the underlying worldsheet theory of the dual string theory as an extended two-dimensional differential graded Topological Field Theory (dg-TFT), i.e. present an $A_\infty$-category of boundary conditions ("D-branes"). A basic aspect of the 't Hooft expansion is that D-branes arise from the addition of vector-valued degrees of freedom to the QFT. We propose that formal deformations of such "fundamental modifications" must match the formal deformations of the dual D-branes, which in turn capture the $A_\infty$-category structure and thus the worldsheet dg-TFT. We discuss several systems for which a rigorous analysis along these lines is or should be possible.