联合数值范围：V.Müller和Yu的微型课程的最新进展和应用。托米洛夫

IF 0.3 Q4 MATHEMATICS Concrete Operators Pub Date : 2020-01-01 DOI:10.1515/conop-2020-0102

V. Müller, Y. Tomilov

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引用次数: 6

摘要

摘要本文综述了最近关于Hilbert空间算子n元组联合数值范围的一些结果，并给出了一些新的观察和注释。此后，数值范围技术将应用于算子理论的各种问题。特别地，我们讨论了算子的轨道问题，算子的对角线及其元组问题，以及捏紧问题。最后，根据关于单个算子数值半径的已知结果，我们检验了在Hilbert空间H上，给定有界线性算子T1，…，Tn，是否存在一个单位向量x∈H，使得| < Tjx, x > |对于所有j = 1，…都是“大”的。, n。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Joint numerical ranges: recent advances and applications minicourse by V. Müller and Yu. Tomilov

Abstract We present a survey of some recent results concerning joint numerical ranges of n-tuples of Hilbert space operators, accompanied with several new observations and remarks. Thereafter, numerical ranges techniques will be applied to various problems of operator theory. In particular, we discuss problems concerning orbits of operators, diagonals of operators and their tuples, and pinching problems. Lastly, motivated by known results on the numerical radius of a single operator, we examine whether, given bounded linear operators T1, . . ., Tn on a Hilbert space H, there exists a unit vector x ∈ H such that |〈Tjx, x〉| is “large” for all j = 1, . . . , n.

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