Abstract
It is well known that the solutions of a (relaxed) commutant lifting problem
can be described via a linear fractional representation of the Redheffer type. The
coefficients of such Redheffer representations are analytic operator-valued functions
defined on the unit disc D of the complex plane. In this paper we consider the converse
question. Given a Redheffer representation, necessary and sufficient conditions on the
coefficients are obtained guaranteeing the representation to appear in the description
of the solutions to some relaxed commutant lifting problem. In addition, a result concerning
a form of non-uniqueness appearing in the Redheffer representations under
consideration and an harmonic maximal principle, generalizing a result of A. Biswas,
are proved. The latter two results can be stated both on the relaxed commutant lifting
as well as on the Redheffer representation level.
Original language | English |
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Pages (from-to) | 1051-1072 |
Number of pages | 22 |
Journal | Complex Analysis and Operator Theory |
Volume | 5 |
DOIs | |
Publication status | Published - 2011 |