Two field-theoretic viewpoints on the Fukaya-Morse $A_\infty$ category

Olga Chekeres; Andrey Losev; Pavel Mnev; Donald R. Youmans

arXiv:2112.12756·hep-th·January 4, 2023

Two field-theoretic viewpoints on the Fukaya-Morse $A_\infty$ category

Olga Chekeres, Andrey Losev, Pavel Mnev, Donald R. Youmans

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TL;DR

This paper explores two different field-theoretic perspectives on an enhanced Morse version of the Fukaya $A_ abla$ category, focusing on higher compositions via gradient flow trees and their algebraic relations.

Contribution

It introduces a novel enhancement allowing morphisms to be chains on the manifold and provides two distinct field-theoretic frameworks to understand the $A_ abla$ relations.

Findings

01

Two viewpoints: effective $BF$ theory and higher topological quantum mechanics.

02

Verification of $A_ abla$ relations through both frameworks.

03

Enhanced Morse category with chain-based morphisms.

Abstract

We study an enhanced version of the Morse degeneration of Fukaya $A_{\infty}$ category with higher compositions given by counts of gradient flow trees. The enhancement consists in allowing morphisms from an object to itself to be chains on the manifold. Higher compositions correspond to counting Morse trees passing through a given set of chains. We provide two viewpoints on the construction and on the proof of the $A_{\infty}$ relations for the composition maps. One viewpoint is via an effective action for the $B F$ theory computed in a special gauge. The other is via higher topological quantum mechanics.

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Taxonomy

TopicsTopological and Geometric Data Analysis · Black Holes and Theoretical Physics · Homotopy and Cohomology in Algebraic Topology