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Invariant means and finite representation theory of C*-algebras

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abstract

Various subsets of the tracial state space of a unital C*-algebra are studied. The largest of these subsets has a natural interpretation as the space of invariant means. II_1-factor representations of a class of C*-algebras considered by Sorin Popa are also studied. These algebras are shown to have an unexpected variety of II_1-factor representations. This general theory is related to various other problems as well. Applications include: (1) A characterization of R^{\omega}-embeddable factors in terms of Lance's WEP. (2) A classification theorem for certain simple, nuclear C*-algebras with unique trace. (3) For a self-adjoint operator there always exists a filtration such that the finite section method (from numerical analysis) works as well as could be hoped for. (4) New examples of non-tracially AF algebras which answer negatively questions of Sorin Popa and Huaxin Lin.

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math.OA 1

years

2026 1

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Amenable traces and the joint numerical radius

math.OA · 2026-06-16 · unverdicted · novelty 6.0

The paper characterizes existence of amenable traces on C*-algebras via joint free numerical radius of unitaries/isometries/partial isometries and derives new obstructions to lifting properties.

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  • Amenable traces and the joint numerical radius math.OA · 2026-06-16 · unverdicted · none · ref 5 · internal anchor

    The paper characterizes existence of amenable traces on C*-algebras via joint free numerical radius of unitaries/isometries/partial isometries and derives new obstructions to lifting properties.