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Families of domains with best possible hardy constantWe geometrically describe families of non-convex plane and spatial domains in which the basic Hardy
Solution method for monotone mixed variational inequalities regularization and a descent technique over a gap (merit) function. The same uniformly convex auxiliary function
Refinements of some integral inequalities for unified integral operatorsIn this paper we are presenting the refinements of integral inequalities established for convex
GENERALIZED STEFFENSEN-TYPE INEQUALITIES BY ABEL-GONTSCHAROFF POLYNOMIAL, we present mean value theorems and n-exponential convexity for these functionals. We also give
Generalized Jensen's functional on time scales via extended Montgomery identityIn the paper, we use Jensen's inequality for diamond integrals and generalize it for n-convex
NOTE ON GENERALIZATION OF THE JENSEN-MERCER INEQUALITY BY TAYLOR'S POLYNOMIALWe present generalizations of the Jensen .Mercer inequality for the class of n -convex functions
INTEGRAL ERROR REPRESENTATION OF HERMITS INTERPOLATING POLYNOMIALS AND RELATED GENERALIZATIONS OF STEFFENSEN'S INEQUALITY for n-convex functions and to give some bounds for integrals in these representations.
On Calculation of the Norm of a Monotone Operator in Ideal Spaces operators acting from one ideal space to another under matching convexity and concavity properties
Concerning the Inequality of Hermite-Hadamard Generalized for convex functions, within the framework of a generalized operator integral. Results are general in nature
On the boundedness and compactness of a certain integral operator for the boundedness and compactness of the integral operator of the form [mathematical equation] from Lp → Lq
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