On \'Etale Algebras and Bosonic Fusion 2-Categories

Abstract

We classify all connected and Lagrangian \'etale algebras in the Drinfeld center Z1(2VectπG), where G is a finite group and π is a 4-cocycle on G. By D\'ecoppet's result every bosonic fusion 2-category C has its Drinfeld center equivalent to Z1(2VectπG) for some G and π. Combining this fact with classification of Lagrangian algebras in Z1(2VectπG), we obtain a classification of bosonic fusion 2-categories.

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