Diagonals of normal operators with finite spectrum
From MaRDI portal
Publication:5385911
DOI10.1073/pnas.0605367104zbMath1191.47027arXivmath/0606321OpenAlexW2059556079WikidataQ35611575 ScholiaQ35611575MaRDI QIDQ5385911
Publication date: 7 May 2008
Published in: Proceedings of the National Academy of Sciences (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0606321
Hermitian and normal operators (spectral measures, functional calculus, etc.) (47B15) Spectrum, resolvent (47A10)
Related Items
Analysis of fractals, image compression, entropy encoding, Karhunen-Loève transforms, Kadison's Pythagorean theorem and essential codimension, The Schur–Horn problem for normal operators, Joint numerical ranges: recent advances and applications minicourse by V. Müller and Yu. Tomilov, Matrix representations of arbitrary bounded operators on Hilbert spaces, The Schur-Horn theorem for operators with three point spectrum, A Measurable Selector in Kadison’s Carpenter’s Theorem, Entropy encoding, Hilbert space, and Karhunen-Loève transforms, On the interplay between operators, bases, and matrices, In search of convexity: diagonals and numerical ranges, Characterization of sequences of frame norms, Admissible sequences of positive operators, An extension of Wiener integration with the use of operator theory, Diagonals of Self-adjoint Operators with Finite Spectrum, Multivariable Schur–Horn theorems, THOMPSON\'S THEOREM FOR COMPACT OPERATORS AND DIAGONALS OF UNITARY OPERATORS, Diagonals of operators and Blaschke’s enigma, Towards the carpenter’s theorem, On restricted diagonalization, The Schur-Horn Theorem for operators with finite spectrum, Majorisation and the carpenter's theorem
Cites Work
- Convexity properties of the moment mapping
- An infinite dimensional version of the Schur-Horn convexity theorem
- Convexity properties of the moment mapping. II
- Convexity and Commuting Hamiltonians
- The Pythagorean Theorem: I. The finite case
- The Pythagorean Theorem: II. The infinite discrete case
- Doubly Stochastic Matrices and the Diagonal of a Rotation Matrix
