An Estimate on the Number of Eigenvalues of a Quasiperiodic Jacobi Matrix of Size n Contained in an Interval of Size n-C

Abstract

We consider infinite quasi-periodic Jacobi self-adjoint matrices for which the three main diagonals are given via values of real analytic functions on the trajectory of the shift x→ x+ω. We assume that the Lyapunov exponent L(E0) of the corresponding Jacobi cocycle satisfies L(E0)γ>0. In this setting we prove that the number of eigenvalues Ej(n)(x) of a submatrix of size n contained in an interval I centered at E0 with |I|=n-C1 does not exceed ( n)C0 for any x. Here n n0, and n0, C0, C1 are constants depending on γ (and the other parameters of the problem).