English

An Operator-Fractal

Operator Algebras 2011-12-15 v2 Spectral Theory

Abstract

Certain Bernoulli convolution measures (\mu) are known to be spectral. Recently, much work has concentrated on determining conditions under which orthonormal Fourier bases (i.e. spectral bases) exist. For a fixed measure known to be spectral, the orthonormal basis need not be unique; indeed, there are often families of such spectral bases. Let \lambda = 1/(2n) for a natural number n and consider the Bernoulli measure (\mu) with scale factor \lambda. It is known that L^2(\mu) has a Fourier basis. We first show that there are Cuntz operators acting on this Hilbert space which create an orthogonal decomposition, thereby offering powerful algorithms for computations for Fourier expansions. When L^2(\mu) has more than one Fourier basis, there are natural unitary operators U, indexed by a subset of odd scaling factors p; each U is defined by mapping one ONB to another. We show that the unitary operator U can also be orthogonally decomposed according to the Cuntz relations. Moreover, this operator-fractal U exhibits its own self-similarity.

Keywords

Cite

@article{arxiv.1109.3168,
  title  = {An Operator-Fractal},
  author = {Palle E. T. Jorgensen and Keri A. Kornelson and Karen L. Shuman},
  journal= {arXiv preprint arXiv:1109.3168},
  year   = {2011}
}

Comments

25 pages

R2 v1 2026-06-21T19:04:52.965Z