Badly approximable matrix functions and canonical factorizations

Abstract

We continue studying the problem of analytic approximation of matrix functions. We introduce the notion of a partial canonical factorization of a badly approximable matrix function and the notion of a canonical factorization of a very badly approximable matrix function . Such factorizations are defined in terms of so-called balanced unitary-valued functions which have many remarkable properties. Unlike the case of thematic factorizations studied earlier in [PY1], [PY2], [PT], [AP1], the factors in canonical factorizations (as well as partial canonical factorizations) are uniquely determined by the matrix function up to constant unitary factors. We study many properties of canonical factorizations. In particular we show that under certain natural assumptions on a function space X the condition ∈ X implies that all factors in a canonical factorization of belong to the same space X. In the last section we characterize the very badly approximable unitary-valued functions U that satisfy the condition \|HU\| e<1.

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