Toric Fano varieties and Chern-Simons quivers

TL;DR

This paper develops a method to derive Chern-Simons quiver theories for M2-branes at toric Calabi-Yau fourfold singularities, linking geometric data to gauge theories using string theory insights.

Contribution

It provides a systematic way to construct CS quiver theories from toric data of CY_4 geometries, advancing the inverse problem in gauge/gravity duality.

Findings

Derived CS quivers for cones over Ypq(B_4) geometries.

Connected CS quivers to string theory via type IIA analysis.

Confirmed conjectured CS quivers for specific geometries.

Abstract

In favourable cases the low energy dynamics of a stack of M2-branes at a toric Calabi-Yau fourfold singularity can be described by an N=2 supersymmetric Chern-Simons quiver theory, but there still does not exists an "inverse algorithm" going from the toric data of the CY_4 to the CS quiver. We make progress in that direction by deriving CS quiver theories for M2-branes probing cones over a large class of geometries Ypq(B_4), which are S^3/Z_p bundles over toric Fano varieties B_4. We rely on the type IIA understanding of CS quivers, giving a firm string theory footing to our CS theories. In particular we give a derivation of some previously conjectured CS quivers in the case B_4= CP^1*CP^1, as field theories dual to M-theory backgrounds with nontrivial torsion G_4 fluxes.