Conformal embeddings of affine vertex algebras in minimal W-algebras II: decompositions

Abstract

We present methods for computing the explicit decomposition of the minimal simple affine W-algebra Wk( g, θ) at a conformal level k as a module for its maximal affine subalgebra Vk( g). A particular emphasis is given on the application of affine fusion rules to the determination of branching rules. In almost all cases when g is a semisimple Lie algebra, we show that, for a suitable conformal level k, Wk( g, θ) is isomorphic to an extension of Vk( g) by its simple module. We are able to prove that in certain cases Wk( g, θ) is a simple current extension of Vk( g). In order to analyze more complicated non simple current extensions at conformal levels, we present an explicit realization of the simple W-algebra Wk(sl(4), θ) at k=-8/3. We prove, as conjectured in arXiv:1407.1527, that Wk(sl(4), θ) is isomorphic to the vertex algebra R(3), and construct infinitely many singular vectors using screening operators. We also construct a new family of simple current modules for the vertex algebra Vk (sl(n)) at certain admissible levels and for Vk (sl(m | n)), m n, m,n≥ 1 at arbitrary levels.