Exact C*-algebra

In mathematics, an exact C*-algebra is a C*-algebra that preserves exact sequences under the minimum tensor product.

Definition

0\;{\xrightarrow {}}\;A\;{\xrightarrow {f}}\;B\;{\xrightarrow {g}}\;C\;{\xrightarrow {}}\;0

the sequence

0\;{\xrightarrow {}}\;A\otimes _{\min }E\;{\xrightarrow {f\otimes \operatorname {id} }}\;B\otimes _{\min }E\;{\xrightarrow {g\otimes \operatorname {id} }}\;C\otimes _{\min }E\;{\xrightarrow {}}\;0,

where ⊗_min denotes the minimum tensor product, is also exact.

Exact C*-algebras have the following equivalent characterizations:

A C*-algebra A is exact if and only if A is nuclearly embeddable into B(H), the C*-algebra of all bounded operators on a Hilbert space H.
A separable C*-algebra A is exact if and only if it is isomorphic to a subalgebra of the Cuntz algebra $\mathcal{O}_2$ .

All nuclear C*-algebras and their C*-subalgebras are exact.

Brown, Nathanial P.; Ozawa, Narutaka (2008). C*-algebras and Finite-Dimensional Approximations. Providence: AMS. ISBN 978-0-8218-4381-9.

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