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On estimates for solutions of systems of convex inequalities inequalities described by convex functions is estimated. As consequences, estimates for the distance from a
On (h, g; m)-Convexity and the Hermite-Hadamard InequalityA new class of (h, g; m)-convex functions is presented, together with its properties, thus
On Zipf-Mandelbrot entropy and 3-convex functions and the 3-convexity of the function. Further, we define linear functionals as the nonnegative differences
Generalized fractional integral inequalities for exponentially (s, m) -convex functions) -convex functions. These inequalities provide upper bounds, boundedness, continuity, and Hadamard type
More accurate classes of jensen–type inequalities for convex and operator convex functions-adjoint operators. The first class refers to a usual convexity, while the second one deals with the operator
The punishing factors for convex pairs are 2n-1 with curvature and λ = -4 of Ω at z and of w, respectively. Then for any pair (Ω, ∏) of convex domains, f ∈ A
FURTHER IMPROVEMENT OF AN EXTENSION OF HOLDER-TYPE INEQUALITY their result in a measure theoretic sense and further improve it using log-convexity of related linear
Lah–Ribarič type inequalities for (h, g; m)-convex functionsRecently introduced new class of (h, g; m)-convex functions unifies a certain range of convexity
On Rabier's result and nonbounded montgomery's identity of result from [9] for the class of n-convex functions. © 2019 Element D.O.O. All Rights Reserved.
Refinements of some fractional integral inequalities for refined (α, h− m) -convex function via the refined (α, h− m) -convex function. The established results give refinements of fractional
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