A pre-order and an equivalence relation on Schur class functions and their invariance under linear fractional transformations
Abstract
Motivated by work of Yu.L. Shmul’yan a pre-order and an equivalence
relation on the set of operator-valued Schur class functions are introduced
and the behavior of Redheffer linear fractional transformations (LFTs) with
respect to these relations is studied. In particular, it is shown that Redheffer
LFTs preserve the equivalence relation, but not necessarily the pre-order. The
latter does occur under some additional assumptions on the coefficients in the
Redheffer LFT