Iterated function systems and permutation representations of the Cuntz algebra
Abstract
We study a class of representations of the Cuntz algebras ON, N=2,3,..., acting on L2(T) where T=R/2π Z. The representations arise in wavelet theory, but are of independent interest. We find and describe the decomposition into irreducibles, and show how the ON-irreducibles decompose when restricted to the subalgebra UHFN⊂ ON of gauge-invariant elements; and we show that the whole structure is accounted for by arithmetic and combinatorial properties of the integers Z. We have general results on a class of representations of ON on Hilbert space H such that the generators Si as operators permute the elements in some orthonormal basis for H. We then use this to extend our results from L2(T) to L2(Td), d>1 ; even to L2(T) where T is some fractal version of the torus which carries more of the algebraic information encoded in our representations.
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