Scalar spectral measures associated with an Operator-Fractal

Abstract

We examine the operator U5 defined on L2(μ14) where μ14 is the 1/4 Cantor measure. The operator U5 scales the elements of the canonical exponential spectrum for L2(μ14) by 5 --- that is, Ueγ = e5γ where eγ(t) = e2π i γ t. It is known that U5 has a self-similar structure, which makes its spectrum, which is currently unknown, of particular interest. In order to better understand the spectrum of U5, we demonstrate a decomposition of the projection valued measures and scalar spectral measures associated with U5. We are also able to compute associated Radon-Nikodym derivatives between the scalar measures. Our decomposition utilizes a system of operators which form a representation of the Cuntz algebra O2.