The rank 2 classification problem I: scale invariant geometries
Abstract
In this first of a series of three papers we outline an approach to classifying 4d superconformal field theories at rank 2. The classification of allowed scale invariant Coulomb branch geometries of dimension (or rank) greater than one is a famous open problem whose solution will greatly constrain the space of superconformal field theories. At rank 2 the problem is equivalent to finding all possible genus 2 Seiberg-Witten curves and 1-forms satisfying a special K\"ahler condition. This is tractable because regular genus 2 Riemann surfaces can be uniformly described as binary-sextic plane curves, and the Seiberg-Witten curves are families of such curves varying meromorphically over the two-dimensional base. There are also solutions consisting of families of degenerate genus-2 Riemann surfaces given by a bouquet of two elliptic curves which are described by a different set of curves. In this paper we set up and carry out the analysis of the generic case, i.e., those whose typical fiber is a regular genus-2 Riemann surface with no extended automorphism, and find the complete answer for polynomial coefficients.
Cite
@article{arxiv.2209.09248,
title = {The rank 2 classification problem I: scale invariant geometries},
author = {Philip C. Argyres and Mario Martone},
journal= {arXiv preprint arXiv:2209.09248},
year = {2022}
}
Comments
Tables and references updated