Localization for Random Unitary Operators
arXiv:math-ph/0504075 · doi:10.1007/s11005-005-0044-4
Abstract
We consider unitary analogs of $1-$dimensional Anderson models on $l^2(\Z)$ defined by the product $U_Ï=D_ÏS$ where $S$ is a deterministic unitary and $D_Ï$ is a diagonal matrix of i.i.d. random phases. The operator $S$ is an absolutely continuous band matrix which depends on a parameter controlling the size of its off-diagonal elements. We prove that the spectrum of $U_Ï$ is pure point almost surely for all values of the parameter of $S$. We provide similar results for unitary operators defined on $l^2(\N)$ together with an application to orthogonal polynomials on the unit circle. We get almost sure localization for polynomials characterized by Verblunski coefficients of constant modulus and correlated random phases.