New approaches for studying conformal embeddings and collapsing levels for W--algebras

Abstract

In this paper we prove a general result saying that under certain hypothesis an embedding of an affine vertex algebra into an affine W--algebra is conformal if and only if their central charges coincide. This result extends our previous result obtained in the case of minimal affine W-algebras. We also find a sufficient condition showing that certain conformal levels are collapsing. This new condition enables us to find some levels k where Wk(sl(N), x, f ) collapses to its affine part when f is of hook or rectangular type. Our methods can be applied to non-admissible levels. In particular, we prove Creutzig's conjecture on the conformal embedding in the hook type W-algebra Wk(sl(n+m), x, fm,n) of its affine vertex subalgebra. Quite surprisingly, the problem of showing that certain conformal levels are not collapsing turns out to be very difficult. In the cases when k is admissible and conformal, we prove that Wk(sl(n+m), x, fm,n) is not collapsing. Then, by generalizing the results on semi-simplicity of conformal embeddings from our previous papers, we find many cases in which Wk(sl(n+m), x, fm,n) is semi-simple as a module for its affine subalgebra at conformal level and we provide explicit decompositions.