Abstract
In this paper the positive and strictly contractive extension problems for almost periodic matrix functions are treated. We present nece ssary and sufficient conditions for the existence of extensions in terms of Toeplit;z and Hankel operators on Besicovitch spaces and Lebesgue spaces. Furthermore, when a solution exists a special extension (the band extension) is constructed which enjoys a maximum entropy property. A linear fractional parameterization of the set of all extensions is also provided. The techniques used xn the proofs include factorizations of matrix valued almost periodic functions and a general algebraic scheme called the band method.
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