English

Constrained dilation and $\Gamma$-contractions

Functional Analysis 2025-10-29 v1 Complex Variables

Abstract

A commuting pair of Hilbert space operators having the closed symmetrized bidisc Γ={(z1+z2,z1z2)C2 : z11,z21} \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\Gamma-contraction}. A Γ\Gamma-contraction (S,P)(S,P) is called \textit{Γ\Gamma-distinguished} if (S,P)(S,P) is annihilated by a polynomial qC[z1,z2]q \in \mathbb C[z_1,z_2] whose zero set Z(q)Z(q) defines a distinguished variety in the symmetrized bidisc G\mathbb G. There is Schaffer-type minimal Γ\Gamma-isometric dilation of a Γ\Gamma-contraction (S,P)(S,P) in the literature. In this article, we study when such a minimal Γ\Gamma-isometric dilation is Γ\Gamma-distinguished provided that (S,P)(S,P) is a Γ\Gamma-distinguished Γ\Gamma-contraction. We show that a pure Γ\Gamma-isometry (T,V)(T,V) with defect space dimDV<\dim \mathcal D_{V^*}< \infty, is Γ\Gamma-distinguished if and only if the fundamental operator of (T,V)(T^*,V^*) has numerical radius less than 11. Further, it is proved that a Γ\Gamma-contraction acting on a finite-dimensional Hilbert space dilates to a Γ\Gamma-distinguished Γ\Gamma-isometry if its fundamental operator has numerical radius less than 11. We also provide sufficient conditions for a pure Γ\Gamma-contraction to be Γ\Gamma-distinguished. Wold decomposition splits an isometry into two orthogonal parts of which one is a unitary and the other is a completely non-unitary contraction. In this direction, we find a few decomposition results for the Γ\Gamma-distinguished Γ\Gamma-unitaries and Γ\Gamma-distinguished pure Γ\Gamma-isometries.

Cite

@article{arxiv.2510.23788,
  title  = {Constrained dilation and $\Gamma$-contractions},
  author = {Sourav Pal and Nitin Tomar},
  journal= {arXiv preprint arXiv:2510.23788},
  year   = {2025}
}

Comments

23 pages, Submitted to Journal

R2 v1 2026-07-01T07:08:28.203Z