Cohomological Maschke's Theorem for Generalized Digroups
Abstract
We study Maschke-type phenomena in the representation theory of generalized digroups. For a generalized digroup D, we construct an associative enveloping algebra AD and prove that Rep(D) is equivalent to the category of left AD-modules. Under a Maschke-type condition on the group component, we show that short exact sequences split on the -side, while the obstruction to full splitting is described by cocycles and identified with Ext1Rep(D)(Q,W). We also derive a spectral sequence with consequences for splitting and non-semisimplicity.
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