Naimark's problem

Naimark's problem is a question in functional analysis asked by Naimark (1951). It asks whether every C*-algebra that has only one irreducible ${\displaystyle *}$-representation up to unitary equivalence is isomorphic to the ${\displaystyle *}$-algebra of compact operators on some (not necessarily separable) Hilbert space. The problem has been solved in the affirmative for special cases (specifically for separable and Type-I C*-algebras). (Akemann Weaver) used the diamond principle to construct a C*-algebra with ${\displaystyle {\mathrm{\aleph }}_1}$ generators that serves as a counterexample to Naimark's problem. More precisely, they showed that the existence of a counterexample generated by ${\displaystyle {\mathrm{\aleph }}_1}$ elements is independent of the axioms of Zermelo–Fraenkel set theory and the axiom of choice (${\displaystyle \mathsf{Z}\mathsf{F}\mathsf{C}}$).

Whether Naimark's problem itself is independent of ${\displaystyle \mathsf{Z}\mathsf{F}\mathsf{C}}$ remains unknown.

• List of statements undecidable in ${\displaystyle \mathsf{Z}\mathsf{F}\mathsf{C}}$
• Gelfand–Naimark theorem

• Akemann, Charles; Weaver, Nik (2004), "Consistency of a counterexample to Naimark's problem", Proceedings of the National Academy of Sciences of the United States of America 101 (20): 7522–7525, doi:10.1073/pnas.0401489101, PMID 15131270, Bibcode: 2004PNAS..101.7522A 
• Naimark, M. A. (1948), "Rings with involutions", Uspekhi Mat. Nauk 3: 52–145 
• Naimark, M. A. (1951), "On a problem in the theory of rings with involution", Uspekhi Mat. Nauk 6: 160–164 

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