On the Representation Theory of Non-Admissible W-Algebras: Part I

Abstract

Motivated by the mirror symmetry for circle compactified 4d N=2 theories, we propose a geometric framework for studying the representation theory of non-admissible W-algebras Wk( g,f) at levels k=-h+1nmu, using the geometry of generalized affine Springer fibers Spν(g,f) with slope ν=u/m. The central proposal is that each non-empty C*-fixed locus, labeled by a double coset w∈ WνW/Wf, gives rise to simple modules whose highest weight is determined by the map w w(kΛ0+ρ)-ρ, while the dimension of the fixed variety encodes additional non-semisimple structure (logarithmic modules). We verify this correspondence in numerous examples, including D4, E6, E8, and twisted theories of type 3D4 and 2A3, where our geometric counting reproduces known results for both admissible and non-admissible W-algebras.