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Refinement of the Cauchy-Schwartz inequality with refinements and generalizations of the numerical radius type inequalities for operators

Vuk Stojiljković, Sever S Dragomir

2024Annals of Mathematics and Computer Science13 citationsDOIOpen Access PDF

Abstract

Motivated by the results previously reported, the current work aims at developing new numerical radius upper bounds of Hilbert space opera- tors by offering new improvements to the well-known Cauchy-Schwarz inequal- ity. In particular, a novel Lemma (3.1) is given, which is utilized to further generalize several vector and numerical radius type inequalities, as well as pre- viously given extensions of the Cauchy-Schwartz inequality. Specifically, (2.5) (2.8) (1.6) have been generalized by (4.3) (4.1) (4.2)

Topics & Concepts

InequalityMathematicsRADIUSCauchy distributionType (biology)Cauchy–Schwarz inequalityPure mathematicsMathematical analysisCalculus (dental)Applied mathematicsComputer scienceGeologyPaleontologyComputer securityDentistryMedicineMathematical Inequalities and ApplicationsApproximation Theory and Sequence SpacesNumerical methods in inverse problems
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