On polynomial $n$-tuples of commuting isometries

Timko, Edward J.

doi:10.7900/jot.2016apr24.2122

Cited by 3 publications

(6 citation statements)

References 9 publications

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“…The core of the proof can be found in [3,Thm.1.12] and [17,Prop. 6.3], but we provide details here for completeness.…”

Section: Preliminariesmentioning

confidence: 99%

“…, x n ] are finitely generated, the n-tuple V|H i has a finite cyclic set. By [17,Thm 6.2], each element of V|H i has finite multiplicity.…”

Section: The General Casementioning

confidence: 99%

“…Observe that V|H j is an n-tuple of shifts, and therefore Z(V|H i ) has no 0dimensional components [17,Lemma 3.1]. Because Z(I i ) is an irreducible variety of dimension 1, we have that Z(Ann(V|H j )) = I j , and (4) now follows from (5).…”

Section: The General Casementioning

confidence: 99%

“…For k = 1, the answer to Question A is 'yes', as shown for n = 2 in [2] and n > 2 in [17] Proof. By Lemma 4.9, there is a β ∈ Hom(G, U(C k )) such that V is virtually similar to M η |H 2 β (D, C k ).…”

Section: Virtual Unitary Equivalencementioning

confidence: 99%

“…. , x n ] : p(V) = 0}, It is known from [17,Prop. 6.3] that Ann(V) is a non-trivial ideal and that it determines a variety of pure dimension 1.…”

Section: Introductionmentioning

confidence: 99%

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A Classification of $${\varvec{n}}$$-Tuples of Commuting Shifts of Finite Multiplicity

Timko

2018

Integr. Equ. Oper. Theory

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Let V denote an n-tuple of shifts of finite multiplicity, and denote by Ann(V) the ideal consisting of polynomials p in n complex variables such that p(V) = 0. If W on K is another n-tuple of shifts of finite multiplicity, and there is a W-invariant subspace K ′ of finite codimension in K so that W|K ′ is similar to V, then we write V W. If W V as well, then we write W ≈ V.In the case that Ann(V) is a prime ideal we show that the equivalence class of V is determined by Ann(V) and a positive integer k. More generally, the equivalence class of V is determined by Ann(V) and an m-tuple of positive integers, where m is the number of irreducible components of the zero set of Ann(V).

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“…The core of the proof can be found in [3,Thm.1.12] and [17,Prop. 6.3], but we provide details here for completeness.…”

Section: Preliminariesmentioning

confidence: 99%

“…, x n ] are finitely generated, the n-tuple V|H i has a finite cyclic set. By [17,Thm 6.2], each element of V|H i has finite multiplicity.…”

Section: The General Casementioning

confidence: 99%

Section: The General Casementioning

confidence: 99%

Section: Virtual Unitary Equivalencementioning

confidence: 99%

“…. , x n ] : p(V) = 0}, It is known from [17,Prop. 6.3] that Ann(V) is a non-trivial ideal and that it determines a variety of pure dimension 1.…”

Section: Introductionmentioning

confidence: 99%

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A Classification of $${\varvec{n}}$$-Tuples of Commuting Shifts of Finite Multiplicity

Timko

2018

Integr. Equ. Oper. Theory

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Pure inner functions, distinguished varieties and toral algebraic commutative contractive pairs

Das¹,

Sau²

2023

Proc. Amer. Math. Soc.

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We study the pairs of commuting contractions that are annihilated by polynomials with a geometric condition on its zero set, herein called the toral algebraic pairs. Toral algebraic pairs of commuting isometries are characterized. In particular, a commuting pair of isometries is toral algebraic if and only if so is its minimal unitary extension. This triggers the natural question when a toral algebraic pair of commuting contractions lifts, in the sense of Andô, to a toral algebraic pair of commuting isometries. While this question remains open, a family including all the commuting contractive matrices is obtained for which the answer is affirmative. The study involves understanding of certain matrix-valued analytic functions, which in turn, throws new light on certain algebraic varieties which are studied extensively from operator- and function-theoretic point of view over the last two decades – the so-called distinguished varieties.

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An Investigation in to the Properties of Functions Defining Distinguished Varieties

Wijesooriya

Dharmasiri²,

Wijerathne³

2023

ARJOM

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An inner toral polynomial is a polynomial in $\mathbb{C}$ [z,w] such that its zero set is contained in $\mathbb{D}$2 $\cup$ $\mathbb{T}$2 $\cup$ $\mathbb{E}$2 where $\mathbb{D}$ is the open unit disc, $\mathbb{T}$ is the unit circle and $\mathbb{E}$ is the exterior of the closed unit disc in $\mathbb{C}$. Given such a polynomial p, it's zero set that lies inside $\mathbb{D}$2 , i.e V = Z (p) $\cap$ $\mathbb{D}$2 is called a distinguished variety, and p is called a polynomial defining the distinguished variety V . An inner toral polynomial always gives a distinguished variety and vice versa. Finite Blaschke products generate inner toral polynomials such a way that, given a finite Blaschke product B(z) the numerator of wm - B(z) is an inner toral polynomial. In this paper, we investigate the conditions that make the sum and the composition of inner toral polynomials generated by finite Blaschke products, inner toral.

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On polynomial $n$-tuples of commuting isometries

Cited by 3 publications

References 9 publications

A Classification of $${\varvec{n}}$$-Tuples of Commuting Shifts of Finite Multiplicity

A Classification of $${\varvec{n}}$$-Tuples of Commuting Shifts of Finite Multiplicity

Pure inner functions, distinguished varieties and toral algebraic commutative contractive pairs

An Investigation in to the Properties of Functions Defining Distinguished Varieties

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