On one condition of absolutely continuous spectrum for self-adjoint operators and its applications

Abstract

In this work the method of analyzing of the absolutely continuous spectrum for self-adjoint operators is considered. For the analysis it is used an approximation of self-adjoint operator A by a sequence of operators An with absolutely continuous spectrum on a given interval [a,b\,] which converges to A in a strong sense on a dense set. The notion of equi-absolute continuity is also used. It was found a sufficient condition of absolute continuity of the operator A spectrum on the finite interval [a,b\,] and the condition for that the corresponding spectral density belongs to the class Lp[a,b\,] (p 1). The application of this method to Jacobi matrices is considered. As a one of the results we obtain the following assertion: Under some mild assumptions (see details in Theorem (2.4)), suppose that there exist a constant C>0 and a positive function g(x)∈ Lp[a,b\,] (p1) such that for all n sufficiently large and almost all x∈[a,b\,] the estimate 1 g(x) bn(Pn+12(x)+Pn2(x)) C holds, where Pn(x) are 1st type polynomials associated with Jacobi matrix (in the sense of Akhiezer) and bn is a second diagonal sequence of Jacobi matrix. Then the spectrum of Jacobi matrix operator is purely absolutely continuous on [a,b\,] and for the corresponding spectral density f(x) we have f(x)∈ Lp[a,b\,].