Pseudotraces on Almost Unital and Finite-Dimensional Algebras
Abstract
We introduce the notion of almost unital and finite-dimensional (AUF) algebras, which are associative C-algebras that may be non-unital or infinite-dimensional, but have sufficiently many idempotents. We show that the pseudotrace construction, originally introduced by Hattori and Stallings for unital finite-dimensional algebras, can be generalized to AUF algebras. Let A be an AUF algebra. Suppose that G is a projective generator in the category CohL(A) of finitely generated left A-modules that are quotients of free left A-modules, and let B = EndA,-(G)opp. We prove that the pseudotrace construction yields an isomorphism between the spaces of symmetric linear functionals SLF(A) SLF(B), and that the non-degeneracies on the two sides are equivalent.
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