Cocentral Split Abelian Hopf Algebra Extensions from Crossed Cocycles
Abstract
We study cocentral split abelian Hopf algebra extensions over an algebraically closed field of characteristic zero.
The kernel is $k^V$ and the quotient is $k\Gamma$, where $V$ is finite abelian and $\Gamma$ acts on $V$.
For a fixed action, we describe these extensions by crossed families of normalized group 2-cocycles on $V$, modulo changes of homogeneous section.
We give the obstruction to lifting cohomology classes to such cocycle data.
Using the Schur multiplier of $V$, we rewrite this obstruction as a bicharacter lifting problem; it vanishes when $V$ has odd exponent.
We then apply the theory to permutation modules and to arithmetic reductions of Coxeter modules, including explicit dihedral and rank-one affine examples.
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