Convergence Radii for Eigenvalues of Tri--diagonal Matrices

Abstract

Consider a family of infinite tri--diagonal matrices of the form L+ zB, where the matrix L is diagonal with entries Lkk= k2, and the matrix B is off--diagonal, with nonzero entries Bk,k+1=Bk+1,k= kα, 0 ≤ α < 2. The spectrum of L+ zB is discrete. For small |z| the n-th eigenvalue En (z), En (0) = n2, is a well--defined analytic function. Let Rn be the convergence radius of its Taylor's series about z= 0. It is proved that Rn ≤ C(α) n2-α if 0 ≤ α <11/6.