Jacobi Matrices with Power-like Weights-Grouping in Blocks Approach

摘要

The paper deals with Jacobi matrices with weights #lambda#_k given by #lambda#_k=k~(#alpha#)(1+triangle open_k), where #alpha# implied by (1/2, 1) and lim_k triangle open_k=0. The main question studied here concerns when the spectrum of the operator J defined by the Jacobi matrix has absolutely continuous component covering the real line. A sufficient condition is given for a positive answer to the above question. The method used in the paper is based on a detailed analysis of generalized eigenvectors of J. In turn this analysis relies on the so-called grouping in blocks approach to a large product of the transfer matrices associated to J.