C.N.U. $$\Gamma _n$$ -协约的纳吉-福阿斯程序

Pub Date : 2024-06-27 DOI:10.1007/s11785-024-01568-4
Bappa Bisai, Sourav Pal
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引用次数: 0

摘要

具有封闭对称多圆盘 $\begin{aligned} 的换元希尔伯特空间算子元组 ((S_1, \ldots , S_{n-1}, P)具有封闭对称多圆盘$\begin{aligned}。\Gamma _n = leaveft\{ left( \sum _{i=1}^{n}z_i, \sum \limits _{1\le i<j\le n} z_iz_j, \ldots , \prod _{i=1}^{n}z_i\right) :|z_i|le 1, \; \; \; 1\le i \le n-1 \right\}\end{aligned}$$作为一个谱集被称为一个(\Gamma _n\)-收缩。从文献中我们可以得到,对于某个 \((c_1, \ldots , c_{n-1}) \ in \Gamma _{n-1}\),\((s_1, \ldots , s_{n-1},p))中的点\((s_i=c_i+pc_{n-i}\)可以表示为\(s_i=c_i+pc_{n-i}\)。我们为一类特殊的c.n.u. \(\Gamma _n\)-收缩 \((S_1,\ldots,S_{n-1},P)\)构造了一个最小的\(\Gamma _n\)-等距扩张,并为它们得到了一个函数模型。在这个模型的帮助下,我们把每个 \(S_i\) 表达为 \(S_i=C_i+PC_{n-i}\),这是标量结果的算子理论类似物。通过展示一个反例,我们证明了如果我们放弃\(S_i^*P=PS_i^*\)的假设,这样的抽象模型可能并不存在。我们应用这个抽象模型来实现这种c.n.u. (\Gamma _n\)-契约的完全单元不变式。此外,我们还提出了扩张的不同必要条件和一个充分条件,在这个条件下,一个交换元组 \((S_1, \ldots , S_{n-1},P)\) 成为一个 \(\Gamma _n\)-收缩。整个程序与 Sz.-Nagy 和 Foias 为 c.n.u. contraction 开发的算子理论程序并行。
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A Nagy–Foias Program for a C.N.U. $$\Gamma _n$$ -Contraction

A tuple of commuting Hilbert space operators \((S_1, \ldots , S_{n-1}, P)\) having the closed symmetrized polydisc

$$\begin{aligned} \Gamma _n = \left\{ \left( \sum _{i=1}^{n}z_i, \sum \limits _{1\le i<j\le n} z_iz_j, \ldots , \prod _{i=1}^{n}z_i\right) : |z_i|\le 1, \; \; \; 1\le i \le n-1 \right\} \end{aligned}$$

as a spectral set is called a \(\Gamma _n\)-contraction. From the literature we have that a point \((s_1, \ldots , s_{n-1},p)\) in \(\Gamma _n\) can be represented as \(s_i=c_i+pc_{n-i}\) for some \((c_1, \ldots , c_{n-1}) \in \Gamma _{n-1}\). We construct a minimal \(\Gamma _n\)-isometric dilation for a particular class of c.n.u. \(\Gamma _n\)-contractions \((S_1, \ldots , S_{n-1},P)\) and obtain a functional model for them. With the help of this model we express each \(S_i\) as \(S_i=C_i+PC_{n-i}\), which is an operator theoretic analogue of the scalar result. We also produce an abstract model for a different class of c.n.u. \(\Gamma _n\)-contractions satisfying \(S_i^*P=PS_i^*\) for each i. By exhibiting a counter example we show that such abstract model may not exist if we drop the hypothesis that \(S_i^*P=PS_i^*\). We apply this abstract model to achieve a complete unitary invariant for such c.n.u. \(\Gamma _n\)-contractions. Additionally, we present different necessary conditions for dilation and a sufficient condition under which a commuting tuple \((S_1, \ldots , S_{n-1},P)\) becomes a \(\Gamma _n\)-contraction. The entire program goes parallel to the operator theoretic program developed by Sz.-Nagy and Foias for a c.n.u. contraction.

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