Barrier nonsubordinacy and absolutely continuous spectrum of block Jacobi matrices

We explore to what extent the relation between the absolute continuous spectrum and non-existence of subordinate generalized eigenvectors, known for scalar Jacobi operators, can be formulated also for block Jacobi operators with $d$-dimensional blocks. The main object here which allows us to make some progress in the above direction is the new notion of the barrier nonsubordinacy. We prove that the barrier nonsubordinacy implies the absolute continuity for block Jacobi operators, thus it can be treated as a partial generalization of the non-existence of subordinate solutions. We also present an example showing that the reverse implication in general does not hold. Finally, we extend to $d \geq 1$ some well-known $d=1$ conditions guaranteeing the absolute continuity and we give applications of our results to some concrete classes of block Jacobi matrices.