Fiber-base duality from the algebraic perspective

TL;DR

This paper explores the algebraic realization of fiber-base duality in 5D gauge theories, showing how S-duality corresponds to a twist in the DIM algebra's co-algebraic structure via Miki's automorphism.

Contribution

It demonstrates that S-duality in 5D gauge theories can be understood as a twist of the DIM algebra's co-algebraic structure using Miki's automorphism, linking algebraic and geometric dualities.

Findings

S-duality corresponds to a twist of the DIM algebra's structure.

Fiber-base duality is realized algebraically through Miki's automorphism.

The algebraic perspective unifies different duality descriptions.

Abstract

Quiver 5D $\mathcal{N}=1$ gauge theories describe the low-energy dynamics on webs of $(p,q)$-branes in type IIB string theory. S-duality exchanges NS5 and D5 branes, mapping $(p,q)$-branes to branes of charge $(-q,p)$, and, in this way, induces several dualities between 5D gauge theories. On the other hand, these theories can also be obtained from the compactification of topological strings on a Calabi-Yau manifold, for which the S-duality is realized as a fiber-base duality. Recently, a third point of view has emerged in which 5D gauge theories are engineered using algebraic objects from the Ding-Iohara-Miki (DIM) algebra. Specifically, the instanton partition function is obtained as the vacuum expectation value of an operator $\mathcal{T}$ constructed by gluing the algebra's intertwiners (the equivalent of topological vertices) following the rules of the toric diagram/brane web. Intertwiners and $\mathcal{T}$-operators are deeply connected to the co-algebraic structure of the DIM algebra. We show here that S-duality can be realized as the twist of this structure by Miki's automorphism.