Title

Wandering Vector Multipliers For Unitary Groups

Keywords

Unitary system; Von neumann algebra; Wandering vector; Wandering vector multiplier; Wavelet system

Abstract

A wandering vector multiplier is a unitary operator which maps the set of wandering vectors for a unitary system into itself. A special case of unitary system is a discrete unitary group. We prove that for many (and perhaps all) discrete unitary groups, the set of wandering vector multipliers is itself a group. We completely characterize the wandering vector multipliers for abelian and ICC unitary groups. Some characterizations of special wandering vector multipliers are obtained for other cases. In particular, there are simple characterizations for diagonal and permutation wandering vector multipliers. Similar results remain valid for irrational rotation unitary systems. We also obtain some results concerning the wandering vector multipliers for those unitary systems which are the ordered products of two unitary groups. There are applications to wavelet systems. © 2001 American Mathematical Society.

Publication Date

1-1-2001

Publication Title

Transactions of the American Mathematical Society

Volume

353

Issue

8

Number of Pages

3347-3370

Document Type

Article

Personal Identifier

scopus

DOI Link

https://doi.org/10.1090/s0002-9947-01-02795-7

Socpus ID

23044527389 (Scopus)

Source API URL

https://api.elsevier.com/content/abstract/scopus_id/23044527389

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