Cosets of Bershadsky-Polyakov algebras and rational W-algebras of type A

Abstract

The Bershadsky-Polyakov algebra is the W-algebra associated to sl3 with its minimal nilpotent element fθ. For notational convenience we define W = W - 3/2 (sl3, fθ). The simple quotient of W is denoted by W, and for a positive integer, W is known to be C2-cofinite and rational. We prove that for all positive integers , W contains a rank one lattice vertex algebra VL, and that the coset C = Com(VL, W) is isomorphic to the principal, rational W(sl2)-algebra at level (2 +3)/(2 +1) -2. This was conjectured in the physics literature over 20 years ago. As a byproduct, we construct a new family of rational, C2-cofinite vertex superalgebras from W_