Criteria for the Absolutely Continuous Spectral Components of matrix-valued Jacobi operators

Abstract

We extend in this work the Jitomirskaya-Last inequality and Last-Simoncriterion for the absolutely continuous spectral component of a half-line Schr\"odinger operator to the special class of matrix-valued Jacobi operators H:l2(Z,C)→ l2(Z,C) given by the law [H u]n := Dn - 1 un - 1 + Dn un + 1 + Vn un, where (Dn)n and (Vn)n are bilateral sequences of l× l self-adjoint matrices such that 0<∈fn∈Zsl[Dn]n∈Zs1[Dn]<∞ (here, sk[A] stands for the k-th singular value of A). Moreover, we also show that the absolutely continuous components of even multiplicity of minimal dynamically defined matrix-valued Jacobi operators are constant, extending another result from Last-Simon originally proven for scalar Schr\"odinger operators.