Cuntz algebra
In mathematics, the Cuntz algebra , named after Joachim Cuntz, is the universal C*-algebra generated by isometries of an infinite-dimensional Hilbert space 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, is isometric to the sequence space
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 as quotient.
Definitions
[edit]Let n ≥ 2 and be a separable Hilbert space. Consider the C*-algebra generated by a set
of isometries (i.e. ) acting on satisfying
This universal C*-algebra is called the Cuntz algebra, denoted by .
A simple C*-algebra is said to be purely infinite if every hereditary C*-subalgebra of it is infinite. is a separable, simple, purely infinite C*-algebra. Any simple infinite C*-algebra contains a subalgebra that has as a quotient.
Properties
[edit]Classification
[edit]The Cuntz algebras are pairwise non-isomorphic, i.e. and are non-isomorphic for n ≠ m. The K0 group of is , the cyclic group of order n − 1. Since K0 is a functor, and are non-isomorphic.
Relation between concrete C*-algebras and the universal C*-algebra
[edit]Theorem. The concrete C*-algebra is isomorphic to the universal C*-algebra generated by n generators s1... sn subject to relations si*si = 1 for all i and ∑ sisi* = 1.
The proof of the theorem hinges on the following fact: any C*-algebra generated by n isometries s1... sn with orthogonal ranges contains a copy of the UHF algebra type n∞. Namely is spanned by words of the form
The *-subalgebra , being approximately finite-dimensional, has a unique C*-norm. The subalgebra plays role of the space of Fourier coefficients for elements of the algebra. A key technical lemma, due to Cuntz, is that an element in the algebra is zero if and only if all its Fourier coefficients vanish. Using this, one can show that the quotient map from to is injective, which proves the theorem.
The UHF algebra has a non-unital subalgebra that is canonically isomorphic to itself: In the Mn stage of the direct system defining , consider the rank-1 projection e11, the matrix that is 1 in the upper left corner and zero elsewhere. Propagate this projection through the direct system. At the Mnk stage of the direct system, one has a rank nk − 1 projection. In the direct limit, this gives a projection P in . The corner
is isomorphic to . The *-endomorphism Φ that maps onto is implemented by the isometry s1, i.e. Φ(·) = s1(·)s1*. is in fact the crossed product of with the endomorphism Φ.
Cuntz algebras to represent direct sums
[edit]The relations defining the Cuntz algebras align with the definition of the biproduct for preadditive categories. This similarity is made precise in the C*-category of unital *-endomorphisms over C*-algebras. The objects of this category are unital *-endomorphisms, and morphisms are the elements , where if for every . A unital *-endomorphism is the direct sum of endomorphisms if there are isometries satisfying the relations and
In this direct sum, the inclusion morphisms are , and the projection morphisms are .
Generalisations
[edit]Cuntz algebras have been generalised in many ways. Notable amongst which are the Cuntz–Krieger algebras, graph C*-algebras and k-graph C*-algebras.
Applied mathematics
[edit]In signal processing, a subband filter with exact reconstruction give rise to representations of a Cuntz algebra. The same filter also comes from the multiresolution analysis construction in wavelet theory.[2]
See also
[edit]References
[edit]- ^ Cuntz, Joachim (1977). "Simple $C^*$-algebras generated by isometries". Communications in Mathematical Physics. 57 (2): 173–185. ISSN 0010-3616.
- ^ Jørgensen, Palle E. T.; Treadway, Brian. Analysis and Probability: Wavelets, Signals, Fractals. Graduate Texts in Mathematics. Vol. 234. Springer-Verlag. ISBN 0-387-29519-4.