Universal 2-parameter N=2 supersymmetric W∞-algebra

Abstract

The universal 2-parameter vertex algebra W∞ of type W(2,3,…) is a classifying object for vertex algebras of type W(2,3,…,N) for some N; under mild hypotheses, all such vertex algebras arise as quotients of W∞. In 2017, Gaiotto and Rapc\'ak introduced a family of such vertex algebras called Y-algebras, and conjectured that they fall into groups of three that are mutually isomorphic. This is a common generalization of both Feigin-Frenkel duality and the coset realization of principal W-algebras in type A, and was proven in 2021 for the simple Y-algebras (i.e., one label is zero) by the first and third authors. In this paper, we extend this entire story to the N=2 superconformal setting. First, we prove the 2013 conjecture of Gaberdiel and Candu that there exists a universal 2-parameter vertex algebra WN=2∞ which is an extension of the N=2 superconformal algebra, and has four additional generators in weights i, i + 12, i + 12, i+1, for each integer i > 1. This admits many 1-parameter quotients which we call N=2 supersymmetric Y-algebras, and we prove the dualities among these algebras which were conjectured in 2018 by Prochazka and Rapc\'ak. A special case is the coset realization of the principal W-algebra Wk(sln+1|n) which was conjectured in 1992 by Ito. As a corollary, we obtain the strong rationality of Wk(sln+1|n) for k = -1 + 1n+a+1 for all positive integers n,a, and we describe its module category. This generalizes Adamovi\'c's 1999 result on N=2 minimal models, which is the case n=1.