Conditional positive definiteness as a bridge between \(k\)-hyponormality and \(n\)-contractivity
DOI10.1016/J.LAA.2021.05.004OpenAlexW3116962023MaRDI QIDQ2032250
George R. Exner, Chafiq Benhida, Raúl E. Curto
Publication date: 11 June 2021
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2012.10962
completely monotonesubnormalweighted shiftconditionally positive definitemoment infinitely divisible
Subnormal operators, hyponormal operators, etc. (47B20) Linear operators on special spaces (weighted shifts, operators on sequence spaces, etc.) (47B37) Moment problems (44A60)
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- Berger measure for some transformations of subnormal weighted shifts
- Subnormality of Bergman-like weighted shifts
- Quadratically hyponormal weighted shifts
- On \(n\)-contractive and \(n\)-hypercontractive operators. II
- Recursively generated weighted shifts and the subnormal completion problem
- Moment infinitely divisible weighted shifts
- On p-hyponormal operators for \(0<p<1\)
- Subnormal operators
- On completely hyperexpansive operators
- $k$-hyponormality and $n$-contractivity for Agler-type shifts
- Infinitely Divisible Matrices
- Subnormal weighted shifts and the Halmos-Bram criterion
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