Affine cellular algebras and asymptotic algebras
Abstract
The theory of affine cellular algebras A is extended to incorporate their asymptotic algebras A, clarifying unexpected differences between classical and affine situations and comparing with Lusztig's asymptotic Hecke algebras. The main new results are about a double centraliser property between A and A, about constructing A from cell modules of A, about existence of an embedding A → A and about a faithful functor from torsionless A-modules to A-modules as well as about the embedding being weakly spectrum preserving (in the sense of Baum and Nistor) and about non-zero endomorphisms of cell modules being injective, while there are no non-zero homomorphisms between non-isomorphic cell modules.
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