W-algebras of the Deligne-Cvitanovi\'c Exceptional series and the minimal 3d N=4 SCFT
Abstract
We propose a three-dimensional field theory construction that realizes the vertex algebras associated with the intermediate Lie algebras and the related C2-cofinite minimal W-algebras of the Deligne-Cvitanovi\'c (DC) series as boundary algebras. The construction is based on the minimal three-dimensional N=4 superconformal field theory coupled to a topological field theory. For a Neumann-type boundary condition compatible with the topological A-twist, the algebra of boundary local operators realizes the minimal W-algebra W-h/6(g,fmin). While this boundary condition is not deformable to the B-twist, we argue that a holomorphic-topological (HTB) twist instead realizes the level-one affine algebras of the intermediate Lie algebras, providing a uniform three-dimensional origin for these vertex algebra structures.
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