Dilation Theory: A Guided Tour

Orr Moshe Shalit

Research output: Chapter in Book/Report/Conference proceedingChapterpeer-review

13 Scopus citations

Abstract

Dilation theory is a paradigm for studying operators by way of exhibiting an operator as a compression of another operator which is in some sense well behaved. For example, every contraction can be dilated to (i.e., is a compression of) a unitary operator, and on this simple fact a penetrating theory of non-normal operators has been developed. In the first part of this survey, I will leisurely review key classical results on dilation theory for a single operator or for several commuting operators, and sample applications of dilation theory in operator theory and in function theory. Then, in the second part, I will give a rapid account of a plethora of variants of dilation theory and their applications. In particular, I will discuss dilation theory of completely positive maps and semigroups, as well as the operator algebraic approach to dilation theory. In the last part, I will present relatively new dilation problems in the noncommutative setting which are related to the study of matrix convex sets and operator systems, and are motivated by applications in control theory. These problems include dilating tuples of noncommuting operators to tuples of commuting normal operators with a specified joint spectrum. I will also describe the recently studied problem of determining the optimal constant c= cθ,θ, such that every pair of unitaries U, V satisfying V U = eUV can be dilated to a pair of cU′, cV ′, where U′, V ′ are unitaries that satisfy the commutation relation V′U′= eiθU′V′. The solution of this problem gives rise to a new and surprising application of dilation theory to the continuity of the spectrum of the almost Mathieu operator from mathematical physics.

Original languageEnglish
Title of host publicationOperator Theory
Subtitle of host publicationAdvances and Applications
PublisherSpringer Science and Business Media Deutschland GmbH
Pages551-623
Number of pages73
DOIs
StatePublished - 1 Jan 2021
Externally publishedYes

Publication series

NameOperator Theory: Advances and Applications
Volume282
ISSN (Print)0255-0156
ISSN (Electronic)2296-4878

Keywords

  • CP-semigroups
  • Completely positive maps
  • Dilations
  • Isometric dilation
  • Matrix convex sets
  • Unitary dilation
  • q-commuting unitaries

ASJC Scopus subject areas

  • Analysis

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