Factorisation structures of algebras and coalgebras

Abstract

We consider the factorisation problem for bialgebras: when a bialgebra K factorises as K=HL, where H and L are algebras and coalgebras (but not necessarly bialgebras). Given two maps R: H L L H and W:L H H L, we introduce a product LWR H and give necessary and sufficient conditions for LWR H to be a bialgebra. It turns out that K factorises as K=HL if and only if K LWR H for some maps R and W. As examples of this product we recover constructions introduced by Majid and Radford. Also, some of the pointed Hopf algebras that were recently constructed bu Beattie, D asc alescu and Gr\"unenfelder appear as special cases.

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