A+ CATEGORY SCIENTIFIC UNIT

A review of selected topics in majorization theory

Volume 99 / 2013

Marek Niezgoda Banach Center Publications 99 (2013), 123-154 MSC: Primary 06F20, 15A42, 15A30, 15A21; Secondary 26A51, 26D10, 26D15, 39B62. DOI: 10.4064/bc99-0-9

Abstract

In this expository paper, some recent developments in majorization theory are reviewed. Selected topics on group majorizations, group-induced cone orderings, Eaton triples, normal decomposition systems and similarly separable vectors are discussed. Special attention is devoted to majorization inequalities. A unified approach is presented for proving majorization relations for eigenvalues and singular values of matrices. Some methods based on the Chebyshev functional and similarly separable vectors are described. Generalizations of Hardy–Littlewood–Pólya Theorem and Schur–Ostrowski Theorem are presented. Generalized Schur-convex functions are investigated. Extensions of Ky Fan inequalities are provided. Applications to Grüss and Ostrowski type inequalities are given.

Authors

  • Marek NiezgodaDepartment of Applied Mathematics and Computer Science
    University of Life Sciences in Lublin
    Akademicka 13
    20-950 Lublin, Poland
    e-mail

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