Mohammad H. M. Rashid* and Feras Bani Ahmad New versions of refinements . . . Mohammad H M Rashid* and Feras Bani-Ahmad New versions of refinements and reverses of Young-type inequalities with the Kantorovich constant https: doi org 10 1515 spma-2022-0180 received October 18, 2022; accepted November 13, 2022 Abstract: Recently, some Young-type inequalities have been promoted The purpose of this article is to give
Further multi-term refinements of Young’s type inequalities and its . . . The constant K(h,2) = (h+1)2 4h, (h > 0) is called the Kantorovich constant and satisfies the fol-lowing properties: (i) K(1,2) = 1 (ii) K(h,2) = K(1 h,2) for h > 0 (iii) K(h,2) is monotone increasing and monotone decreasing on the intervals [1,1] and (0,1], respectively Zuo et al [1] refined the inequality with the Kan-torovich constant in
Enhanced Young-type inequalities utilizing Kantorovich approach for . . . Abstract This article introduces new Young-type inequalities, leveraging the Kantorovich constant, by refining the original inequality In addition, we present a range of norm-based inequalities applicable to positive semidefinite matrices, such as the Hilbert-Schmidt norm and the trace norm
Mohammad Rashid (0000-0002-3816-5287) - ORCID New versions of refinements and reverses of Young-type inequalities with the Kantorovich constant Special Matrices 2023 | Journal article DOI: 10 1515 SPMA-2022-0180 Contributors: Rashid, M H M ; Bani-Ahmad, F Show more detail Source:
Enhanced Young-type inequalities utilizing Kantorovich approach for . . . Abstract: This article introduces new Young-type inequalities, leveraging the Kantorovich constant, by refining the original inequality In addition, we present a range of norm-based inequalities applicable to positive semide nite matrices, such as the Hilbert-Schmidt norm and the trace norm The importance of these
ResearchGate SpecialMatrices2022;1 Research Article Open Access M H M Rashid* and Feras Bani-Ahmad NewVersionsOfRefinementsAnd ReversesOfYoungTypeInequalitiesWith