Identities and derived lengths of finitary incidence algebras and their group of units
Abstract
Let FI(X,K) be the finitary incidence algebra of a poset X over a field K. In this short note we establish when FI(X,K) satisfies a polynomial identity and when its group of units U(FI(X,K)) satisfies a group identity. The Lie derived length of FI(X,K) and the derived length of U(FI(X,K)) are also determined.
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