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Quantum Locally Compact Metric Spaces
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We introduce the notion of a quantum locally compact metric space, which is the noncommutative analogue of a locally compact metric space, and generalize to the nonunital setting the notion of quantum metric spaces introduced by Rieffel. We then provide several examples of such structures, including the Moyal plane, as well as compact quantum metric spaces and locally compact metric spaces. This paper provides an answer to the question raised in the literature about the proper notion of a quantum metric space in the nonunital setup and offers important insights into noncommutative geometry for non compact quantum spaces.
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The Bures metric and the quantum metric on the density space of a C*-algebra: the non-unital case
Extends Bures and quantum metrics to non-unital C*-algebras with faithful traces, proves density space non-compact iff algebra infinite-dimensional, and shows topology comparisons via quantum Lipschitz triples and mat...
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