An $\mathcal{N}=1$ 3d-3d Correspondence

TL;DR

This paper proposes a novel 3d-3d correspondence for $ =1$ supersymmetric theories derived from M5-branes on $G_2$-holonomy manifolds, linking physical observables to topological field theories and invariants of three-manifolds.

Contribution

It introduces an $ =1$ 3d-3d correspondence connecting supersymmetric gauge theories to topological field theories and invariants, extending previous work to new geometric and physical contexts.

Findings

Witten index computed via super-BF-model on $M_3$

Partition function related to Chern-Simons-Dirac theory

Conjecture linking $S^3$-partition function to Witten-Reshetikhin-Turaev invariant

Abstract

M5-branes on an associative three-cycle $M_3$ in a $G_2$-holonomy manifold give rise to a 3d $\mathcal{N}=1$ supersymmetric gauge theory, $T_{\mathcal{N}=1} [M_3]$. We propose an $\mathcal{N}=1$ 3d-3d correspondence, based on two observables of these theories: the Witten index and the $S^3$-partition function. The Witten index of a 3d $\mathcal{N}=1$ theory $T_{\mathcal{N}=1} [M_3]$ is shown to be computed in terms of the partition function of a topological field theory, a super-BF-model coupled to a spinorial hypermultiplet (BFH), on $M_3$. The BFH-model localizes on solutions to a generalized set of 3d Seiberg-Witten equations on $M_3$. Evidence to support this correspondence is provided in the abelian case, as well as in terms of a direct derivation of the topological field theory by twisted dimensional reduction of the 6d $(2,0)$ theory. We also consider a correspondence for the $S^3$-partition function of the $T_{\mathcal{N}=1} [M_3]$ theories, by determining the dimensional reduction of the M5-brane theory on $S^3$. The resulting topological theory is Chern-Simons-Dirac theory, for a gauge field and a twisted harmonic spinor on $M_3$, whose equations of motion are the generalized 3d Seiberg-Witten equations. For generic $G_2$-manifolds the theory reduces to real Chern-Simons theory, in which case we conjecture that the $S^3$-partition function of $T_{\mathcal{N}=1}[M_3]$ is given by the Witten-Reshetikhin-Turaev invariant of $M_3$.