Local superconformal algebras
Abstract
Given a supermanifold equipped with an odd distribution of maximal dimension and constant symbol, we construct the formal moduli problem of deformations of the distribution. This moduli problem is described by a local super dg Lie algebra that provides both a resolution of the structure-preserving vector fields on superspace and a derived enhancement of superconformal symmetry. Applying our construction in standard physical examples returns the conformal supergravity multiplet in every known example, in any dimension and with any amount of supersymmetrywhether or not a superconformal algebra exists. We discuss new examples related to twisted supergravity, higher Virasoro algebras, and exceptional super Lie algebras. The compatibility of our techniques with twisting also leads to a computation of every twist of the stress tensor multiplet of a superconformal theory, including universal operator product expansions. Our approach uses a derived model for the space of functions constant along the distribution, which is applicable even when the distribution is non-involutive; we construct other natural multiplets, such as K\"ahler differentials, that appear naturally through this lens on superspace geometry.
Cite
@article{arxiv.2410.08176,
title = {Local superconformal algebras},
author = {Fabian Hahner and Surya Raghavendran and Ingmar Saberi and Brian R. Williams},
journal= {arXiv preprint arXiv:2410.08176},
year = {2024}
}
Comments
68 pages, 7 tables. Comments welcome! v2: updated funding information