Further generalized refinement of Young’s inequalities for τ -mesurable operators

Mohamed Amine Ighachane; Mohamed Akkouchi

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Further generalized refinement of Young’s inequalities for τ -mesurable operators

Mohamed Amine Ighachane

and

Mohamed Akkouchi

| Dec 28, 2020

Moroccan Journal of Pure and Applied Analysis

Volume 7 (2021): Issue 2 (May 2021)

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Page range: 214 - 226

Received: Sep 16, 2020

Accepted: Dec 02, 2020

DOI: https://doi.org/10.2478/mjpaa-2021-0015

Keywords
AM-GM inequality, Young’s inequality, Determinants, Trace, -norms, τ-mesurable operators

This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.

In this paper, we prove that if a, b > 0 and 0 ≤ v ≤ 1. Then for all positive integer m

(1) - For v ∈ $v \in [0, \frac{1}{2^{n}}]$ v \in \left[ {0,{1 \over {{2^n}}}} \right] , we have ${(a^{v} b^{1 - v})}^{m} + \sum_{k = 1}^{n} 2^{k - 1} v^{m} {(\sqrt{b^{m}} - \sqrt[2^{k}]{(a b^{2 k - 1} - 1) m})}^{2} \leq {(v a + (1 - v) b)}^{m} .$ {\left( {{a^v}{b^{1 - v}}} \right)^m} + \sum\limits_{k = 1}^n {{2^{k - 1}}{v^m}{{\left( {\sqrt {{b^m}} - \root {{2^k}} \of {\left( {a{b^{2k - 1}} - 1} \right)m} } \right)}^2} \le {{\left( {va + \left( {1 - v} \right)b} \right)}^m}.}

(2) - For v ∈ $v \in [\frac{2^{n} - 1}{2^{n}}, 1]$ v \in \left[ {{{{2^n} - 1} \over {{2^n}}},1} \right] , we have ${(a^{v} b^{1 - v})}^{m} + \sum_{k = 1}^{n} 2^{k - 1} {(1 - v)}^{m} {(\sqrt{a^{m}} - \sqrt[2^{k}]{(b a^{2 k - 1} - 1) m})}^{2} \leq {(v a + (1 - v) b)}^{m},$ {\left( {{a^v}{b^{1 - v}}} \right)^m} + \sum\limits_{k = 1}^n {{2^{k - 1}}{{\left( {1 - v} \right)}^m}{{\left( {\sqrt {{a^m}} - \root {{2^k}} \of {\left( {b{a^{2k - 1}} - 1} \right)m} } \right)}^2} \le {{\left( {va + \left( {1 - v} \right)b} \right)}^m},} we also prove two similar inequalities for the cases v ∈ $v \in [\frac{2^{n} - 1}{2^{n}}, \frac{1}{2}]$ v \in \left[ {{{{2^n} - 1} \over {{2^n}}},{1 \over 2}} \right] and v ∈ $v \in [\frac{1}{2}, \frac{2^{n} + 1}{2^{n}}]$ v \in \left[ {{1 \over 2},{{{2^n} + 1} \over {{2^n}}}} \right] . These inequalities provides a generalization of an important refinements of the Young inequality obtained in 2017 by S. Furuichi. As applications we shall give some refined Young type inequalities for the traces, determinants, and p-norms of positive τ-measurable operators.

eISSN:: 2351-8227
Language:: English

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Journal Subjects:: Mathematics, Analysis, Differential Equations and Dynamical Systems, Probability and Statistics, Numerical and Computational Mathematics

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Further generalized refinement of Young’s inequalities for τ -mesurable operators

Published Online: Dec 28, 2020

Page range: 214 - 226

Received: Sep 16, 2020

Accepted: Dec 02, 2020

DOI: https://doi.org/10.2478/mjpaa-2021-0015

Keywords
AM-GM inequality, Young’s inequality, Determinants, Trace, -norms, τ-mesurable operators

© 2020 Mohamed Amine Ighachane et al., published by Sciendo

This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.

Further generalized refinement of Young’s inequalities for τ -mesurable operators

Published Online: Dec 28, 2020

Page range: 214 - 226

Received: Sep 16, 2020

Accepted: Dec 02, 2020

DOI: https://doi.org/10.2478/mjpaa-2021-0015

KeywordsAM-GM inequality, Young’s inequality, Determinants, Trace, -norms, τ-mesurable operators

© 2020 Mohamed Amine Ighachane et al., published by Sciendo

This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.

Keywords
AM-GM inequality, Young’s inequality, Determinants, Trace, -norms, τ-mesurable operators