Refinement of the Cauchy-Schwartz inequality with refinements and generalizations of the numerical radius type inequalities for operators
Vuk Stojiljković, Sever S Dragomir
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