$A note on operator tuples which are $(m,p)$-isometric as well as $(\mu,\infty)$-isometric$

A note on operator tuples which are $(m,p)$-isometric as well as $(\mu,\infty)$-isometric

Operators and Matrices, Vol. 11, No. 3 (2017), 623-633 We show that if a tuple of commuting, bounded linear operators $(T_1,...,T_d) \in B(X)^d$ is both an $(m,p)$-isometry and a $(\mu,\infty)$-isometry, then the tuple $(T_1^m,...,T_d^m)$ is a $(1,p)$-isometry. We further prove some additional prope...

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1. Verfasser:	Hoffmann, Philipp H. W
Format:	Artikel
Sprache:	eng
Schlagworte:	Mathematics - Functional Analysis
Online-Zugang:	Volltext bestellen
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Zusammenfassung:	Operators and Matrices, Vol. 11, No. 3 (2017), 623-633 We show that if a tuple of commuting, bounded linear operators $(T_1,...,T_d) \in B(X)^d$ is both an $(m,p)$-isometry and a $(\mu,\infty)$-isometry, then the tuple $(T_1^m,...,T_d^m)$ is a $(1,p)$-isometry. We further prove some additional properties of the operators $T_1,...,T_d$ and show a stronger result in the case of a commuting pair $(T_1,T_2)$.
DOI:	10.48550/arxiv.1508.00916