Bipartite Field Theories: from D-Brane Probes to Scattering Amplitudes

TL;DR

This paper introduces Bipartite Field Theories (BFTs), a broad class of 4d N=1 quiver gauge theories defined by bipartite graphs on Riemann surfaces, linking geometry, graph transformations, and scattering amplitudes.

Contribution

It develops a general framework for BFTs, connecting graph modifications, Calabi-Yau geometries, and dualities, with new techniques for analyzing non-planar cases and their relation to scattering amplitudes.

Findings

BFTs encompass D-brane probes and scattering amplitude singularities.

A new method using generalized Kasteleyn matrices for Calabi-Yau determination.

Insights into non-planar graphs and their associated geometries.

Abstract

We introduce and initiate the investigation of a general class of 4d, N=1 quiver gauge theories whose Lagrangian is defined by a bipartite graph on a Riemann surface, with or without boundaries. We refer to such class of theories as Bipartite Field Theories (BFTs). BFTs underlie a wide spectrum of interesting physical systems, including: D3-branes probing toric Calabi-Yau 3-folds, their mirror configurations of D6-branes, cluster integrable systems in (0+1) dimensions and leading singularities in scattering amplitudes for N=4 SYM. While our discussion is fully general, we focus on models that are relevant for scattering amplitudes. We investigate the BFT perspective on graph modifications, the emergence of Calabi-Yau manifolds (which arise as the master and moduli spaces of BFTs), the translation between square moves in the graph and Seiberg duality and the identification of dual theories by means of the underlying Calabi-Yaus, the phenomenon of loop reduction and the interpretation of the boundary operator for cells in the positive Grassmannian as higgsing in the BFT. We develop a technique based on generalized Kasteleyn matrices that permits an efficient determination of the Calabi-Yau geometries associated to arbitrary graphs. Our techniques allow us to go beyond the planar limit by both increasing the number of boundaries of the graphs and the genus of the underlying Riemann surface. Our investigation suggests a central role for Calabi-Yau manifolds in the context of leading singularities, whose full scope is yet to be uncovered.