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Majorization inequalities via Green functions and Fink’s identity with applications to Shannon entropy. Inequal. Appl. 2017:108, 2017). We give a generalized majorization theorem for the class of n-convex
Refinement of Jensen’s inequality and estimation of f- and Rényi divergence via Montgomery identity generalize the refinement of Jensen’s inequality and new inequalities of Rényi Shannon entropies for an m-convex
Estimation of different entropies via Hermite interpolating polynomial using Jensen type functionals inequalities for m-convex function. © 2020, Forum D'Analystes, Chennai.
Generalizations of Some Hardy-Littlewood-Pólya Type Inequalities and Related Results for real valued functions and r-convex functions respectively. We also obtain generalizations of some Hardy
INEQUALITIES OF THE EDMUNDSON-LAH-RIBARIC TYPE FOR SELFADJOINT OPERATORS IN HILBERT SPACES-Lah-Ribaric inequality for selfadjoint operators in Hilbert space that hold for the class of n -convex functions
ON SOME WEIGHTED HARDY-TYPE INEQUALITIES INVOLVING EXTENDED RIEMANN-LIOUVILLE FRACTIONAL CALCULUS OPERATORS of extended Riemann-Liouville fractional derivative operators, using convex and increasing functions
Generalizations of Steffensen's inequality via two-point Abel-Gontscharoff polynomial's inequality for n-convex functions are obtained and some Ostrowski-type inequalities related to obtained
Weighted Hardy Type Inequalities and Parametric Lamb Equation-dimensional inequalities to n-dimensional convex domains with finite inner radius. Constants in those inequalities depend
Methods of projecting a point in normed spaces and their application: abstract of a candidate physical and mathematical sciences dissertation: speciality 01.01.07 - computational mathematics
Target redirected regression with dynamic neighborhood structure optimization problems with non-convex constraints, we adopt the variable-splitting and penalty techniques
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