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Harnack and Shmul'yan pre-order relations for Hilbert space contractions

Laurian SuciuCatalin Badea

subject

Pure mathematicsGeneral Mathematics[MATH.MATH-FA]Mathematics [math]/Functional Analysis [math.FA]01 natural sciencesasymptotic limitpartial isometriessymbols.namesakeFOS: MathematicsEquivalence relation0101 mathematicsEquivalence (formal languages)Toeplitz operatorsMathematicsPartial isometry010102 general mathematicsClass functionHilbert spacequasi normal operators16. Peace & justiceHarnack pre-orderFunctional Analysis (math.FA)010101 applied mathematicsMathematics - Functional Analysis47A10 47A45Hilbert space contractionssymbolsShmul'yan pre-orderAnalytic function

description

We study the behavior of some classes of Hilbert space contractions with respect to Harnack and Shmul'yan pre-orders and the corresponding equivalence relations. We give some conditions under which the Harnack equivalence of two given contractions is equivalent to their Shmul'yan equivalence and to the existence of an arc joining the two contractions in the class of operator-valued contractive analytic functions on the unit disc. We apply some of these results to quasi-isometries and quasi-normal contractions, as well as to partial isometries for which we show that their Harnack and Shmul'yan parts coincide. We also discuss an extension, recently considered by S.~ter~Horst [\emph{J. Operator Th. 72(2014), 487--520}], of the Shmul'yan pre-order from contractions to the operator-valued Schur class of functions. In particular, the Shmul'yan-ter Horst part of a given partial isometry, viewed as a constant Schur class function, is explicitly determined.

yearjournalcountryeditionlanguage
2015-11-22
https://dx.doi.org/10.48550/arxiv.1512.01990