Normal Hopf subalgebras in cocycle deformations of finite groups
Abstract
Let G be a finite group and let π: G G' be a surjective group homomorphism. Consider the cocycle deformation L = Hσ of the Hopf algebra H = kG of k-valued linear functions on G, with respect to some convolution invertible 2-cocycle σ. The (normal) Hopf subalgebra kG' ⊂eq kG corresponds to a Hopf subalgebra L' ⊂eq L. Our main result is an explicit necessary and sufficient condition for the normality of L' in L.
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