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

Veronika Müller, Yuri Tomilov

2020Concrete Operators13 citationsDOIOpen Access PDF

Abstract

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 T 1 , . . ., Tn on a Hilbert space H , there exists a unit vector x ∈ H such that | 〈 Tjx , x 〉 | is “large” for all j = 1, . . . , n .

Topics & Concepts

Hilbert spaceTupleOperator (biology)MathematicsDiagonalJoint (building)Bounded functionLinear operatorsSpace (punctuation)Pure mathematicsAlgebra over a fieldMathematical analysisDiscrete mathematicsComputer scienceGeometryEngineeringOperating systemChemistryTranscription factorArchitectural engineeringRepressorBiochemistryGeneHolomorphic and Operator TheoryMatrix Theory and AlgorithmsSpectral Theory in Mathematical Physics
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