Kernels of block Hankel operators and independency of vector-valued functions modulo Nevanlinna class

Abstract

For a matrix-valued function ∈ L2Mn× m, it is well-known that the kernel of a block Hankel operator H is an invariant subspace for the shift operator. Thus, if the kernel is nontrivial, then H= H2 Cr for a natural number r and an m× r matrix inner function by Beurling-Lax-Halmos Theorem. It will be shown that the size of the matrix inner function associated with the kernel of a block Hankel operator H is closely related with a certain independency of the columns of , which is defined in this paper. As an important application of this result, the shape of shift invariant, or, backward shift invariant subspaces of H2 Cn generated by finite elements will be studied.