Deficiency indices and discreteness property of block Jacobi matrices and Dirac operators with point interactions

Abstract

The paper concerns with infinite symmetric block Jacobi matrices J with p× p-matrix entries. We present new conditions for general block Jacobi matrices to be selfadjoint and have discrete spectrum. In our previous papers there was established a close relation between a class of such matrices and symmetric 2p× 2p Dirac operators DX,α with point interactions in L2( R; C2p). In particular, their deficiency indices are related by n( DX,α)= n( JX,α). For block Jacobi matrices of this class we present several conditions ensuring equality n( JX,α)=k with any k p. Applications to matrix Schrodinger and Dirac operators with point interactions are given. It is worth mentioning that a connection between Dirac and Jacobi operators is employed here in both directions for the first time. In particular, to prove the equality n( JX,α)=p for JX,α we first establish it for Dirac operator DX,α.