$((m,p)\)-isometric and $(m,\infty)$-isometric operator tuples on normed spaces$

((m,p)\)-isometric and $(m,\infty)$-isometric operator tuples on normed spaces

We generalize the notion of $m$-isometric operator tuples on Hilbert spaces in a natural way to normed spaces. This is done by defining a tuple analogue of $(m,p)$-isometric operators, so-called $(m,p)$-isometric operator tuples. We then extend this definition further by introducing \((m,\inft...

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Veröffentlicht in:	arXiv.org 2015-05
Hauptverfasser:	Hoffmann, Philipp H W, Mackey, Michael
Format:	Artikel
Sprache:	eng
Schlagworte:	Hilbert space Mathematics - Functional Analysis Mathematics - Operator Algebras
Online-Zugang:	Volltext
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Zusammenfassung:	We generalize the notion of $m$-isometric operator tuples on Hilbert spaces in a natural way to normed spaces. This is done by defining a tuple analogue of $(m,p)$-isometric operators, so-called $(m,p)$-isometric operator tuples. We then extend this definition further by introducing $(m,\infty)$-isometric operator tuples and study properties of and relations between these objects.
ISSN:	2331-8422
DOI:	10.48550/arxiv.1212.5616

Zusammenfassung:	We generalize the notion of \(m\)-isometric operator tuples on Hilbert spaces in a natural way to normed spaces. This is done by defining a tuple analogue of \((m,p)\)-isometric operators, so-called \((m,p)\)-isometric operator tuples. We then extend this definition further by introducing \((m,\infty)\)-isometric operator tuples and study properties of and relations between these objects.
ISSN:	2331-8422
DOI:	10.48550/arxiv.1212.5616

((m,p)\)-isometric and \((m,\infty)\)-isometric operator tuples on normed spaces