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Is the category of Z^* algebras equivalent to the category of C^* algebras?

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A Z* algebra is a C^* algebra whose all positive elements are zero divisor.

The family of all Z^* algebras with C^* morphisms forms a category.

Is the category of Z^* algebras equivalent to the category of C^* algebras?

If the answer would be positive then the theory of C* algebras can be reduced to study of Z^* algebras

The equivalence of two categories is meant in the following sense:

https://en.wikipedia.org/wiki/Equivalence_of_categories#Definition

asked Mar 29, 2023 in Mathematics by AliTaghaviMath (145 points) [ revision history ]
edited Apr 1, 2023 by AliTaghaviMath

What is the relevance for physics?

commented Apr 1, 2023 by Arnold Neumaier (15,787 points) [ no revision ]

@ArnoldNeumaier Thank you and my +1 for your comment.

May be a more general question would be "What is the relevance of C^* algebras for physics?" so with the same motivations one can consider some possible physical interpretations for Z^* algebras. Any way there are a some pure math tags in Physicsoverflow but there are physical interpretations for those subject

commented Apr 6, 2023 by AliTaghaviMath (145 points) [ no revision ]

@ArnoldNeumaier I think that if we have some topology-dynamical interpretation for this concept, then actualy we have a physical interpretation too.

commented Apr 7, 2023 by AliTaghaviMath (145 points) [ no revision ]

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