Constrained dilation and $\Gamma$-contractions

Sourav Pal; Nitin Tomar

arXiv:2510.23788·math.FA·October 29, 2025

Constrained dilation and $\Gamma$-contractions

Sourav Pal, Nitin Tomar

PDF

TL;DR

This paper investigates when minimal $ extGamma$-isometric dilations of $ extGamma$-contractions are $ extGamma$-distinguished, linking this property to the fundamental operator’s numerical radius and providing dilation and decomposition results.

Contribution

It characterizes $ extGamma$-distinguished $ extGamma$-isometries via the fundamental operator and establishes dilation conditions for $ extGamma$-contractions with finite-dimensional Hilbert spaces.

Findings

01

Pure $ extGamma$-isometries with finite defect space are $ extGamma$-distinguished iff their fundamental operator has numerical radius less than 1.

02

Finite-dimensional $ extGamma$-contractions with fundamental operator radius less than 1 dilate to $ extGamma$-distinguished $ extGamma$-isometries.

03

Decomposition results for $ extGamma$-distinguished $ extGamma$-unitaries and pure $ extGamma$-isometries.

Abstract

A commuting pair of Hilbert space operators having the closed symmetrized bidisc \[ \Gamma=\{(z_1+z_2, z_1z_2) \in \mathbb C^2 \ : \ |z_1| \leq 1, |z_2| \leq 1\} \] as a spectral set is called a \textit{ $Γ$ -contraction}. A $Γ$ -contraction $(S, P)$ is called \textit{ $Γ$ -distinguished} if $(S, P)$ is annihilated by a polynomial $q \in C [z_{1}, z_{2}]$ whose zero set $Z (q)$ defines a distinguished variety in the symmetrized bidisc $G$ . There is Schaffer-type minimal $Γ$ -isometric dilation of a $Γ$ -contraction $(S, P)$ in the literature. In this article, we study when such a minimal $Γ$ -isometric dilation is $Γ$ -distinguished provided that $(S, P)$ is a $Γ$ -distinguished $Γ$ -contraction. We show that a pure $Γ$ -isometry $(T, V)$ with defect space $dim D_{V^{*}} < \infty$ , is $Γ$ -distinguished if and only if the fundamental…

Peer Reviews

No public reviews on file for this paper yet. If you reviewed it on a platform where reviews are public (OpenReview, ICLR, NeurIPS, ICML), you can paste yours below so the community can read it here.

Videos

No videos yet. Explain this paper in a talk, walkthrough, or lecture? Add one.