Guy Boyde (Universiteit Utrecht): Stable isomorphisms for homology of algebras
Wednesday, 10.04.2024 16:30 im Raum M4
Abstract: Homological stability is originally a property of (families of) groups, but recently, there has been a surge of interest in studying it for associative algebras too.
Typically, the known results assert something stronger than stability, namely that
1) a certain family of group algebras includes into our family of algebras, and
2) this inclusion is a homology isomorphism in a range.
Stability then follows from stability for the groups, if known. I'll start with an overview of the area, and discuss how these "stable identifications" of the homology often hold in a range exceeding the stability range. The main examples will be the Partition and Jones annular algebras.
Angelegt am Tuesday, 02.04.2024 07:16 von Claudia Rüdiger
Geändert am Monday, 08.04.2024 06:09 von Claudia Rüdiger
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