Cuntz algebra

In mathematics, the Cuntz algebra ${\mathcal {O}}_{n}$ , named after Joachim Cuntz, is the universal C*-algebra generated by $n$ isometries of an infinite-dimensional Hilbert space ${\mathcal {H}}$ satisfying certain relations.^[1] These algebras were introduced as the first concrete examples of a separable infinite simple C*-algebra, meaning as a Hilbert space, ${\mathcal {O}}_{n}$ is isometric to the sequence space

l^{2}(\mathbb {N} )

and it has no nontrivial closed ideals. These algebras are fundamental to the study of simple infinite C*-algebras since any such algebra contains, for any given n, a subalgebra that has ${\mathcal {O}}_{n}$ as quotient.

^ Cuntz, Joachim (1977). "Simple $C^*$-algebras generated by isometries". Communications in Mathematical Physics. 57 (2): 173–185. ISSN 0010-3616.

[1] Cuntz, Joachim (1977). "Simple $C^*$-algebras generated by isometries". Communications in Mathematical Physics. 57 (2): 173–185. ISSN 0010-3616.

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