Jensen, Ostrowski and Hermite-Hadamard type inequalities for $ h $-convex stochastic processes by means of center-radius order relation
Mujahid Abbas, Waqar Afzal, Thongchai Botmart, Ahmed M. Galal
Abstract
<abstract><p>In optimization, convex and non-convex functions play an important role. Further, there is no doubt that convexity and stochastic processes are closely related. In this study, we introduce the notion of the $ h- $convex stochastic process for center-radius order in the setting of interval-valued functions ($ \mathcal{IVFS} $) which is novel in literature. By using these notions we establish Jensen, Ostrowski, and Hermite-Hadamard ($ \mathcal{H.H} $) types inequalities for generalized interval-valued $ \mathcal{CR}-h $-convex stochastic processes. Furthermore, the study provides useful examples to support its findings.</p></abstract>
Topics & Concepts
Hadamard transformMathematicsRegular polygonHermite polynomialsConvexityInterval (graph theory)Convex functionLogarithmically convex functionCenter (category theory)Order (exchange)RADIUSCombinatoricsConvex optimizationPure mathematicsDiscrete mathematicsConvex analysisMathematical analysisComputer scienceGeometryComputer securityFinanceCrystallographyEconomicsFinancial economicsChemistryMathematical Inequalities and ApplicationsFuzzy Systems and OptimizationOptimization and Variational Analysis