It is undeniable that convex and non-convex functions play an important role in optimization.
As a result of its behavior, convexity also plays a significant role in discussing inequalities. It …

Mathematical inequalities supporting interval-valued stochastic processes are rarely
addressed. Recently, Afzal et al. introduced the notion of h-Godunova-Levin stochastic …

The field of stochastic processes is essentially a branch of probability theory, treating
probabilistic models that evolve in time. It is best viewed as a branch of mathematics, starting …

In this paper, we investigate the Hermite–Hadamard type inequality for the class of some h-
convex stochastic processes, which is an extension of the Hermite–Hadamard inequality …

Some estimates on the Hermite-Hadamard inequality through convex and quasi-convex
stochastic processes 1 Introduction Page 1 Mathematica Aeterna, Vol. 5, 2015, no. 5, 745 …

OSTROWSKI-TYPE INEQUALITIES VIA -h CONVEX STOCHASTIC PROCESSES Page 1 JP
Journal of Mathematical Sciences Volume …, Issue …, 2016, Pages … © 2016 Ishaan Publishing …

In this article, we introduce the concept of (η 1, η 2)-convex stochastic processes on
coordinates and establish Hermite-Hadamard-type inequality for these stochastic processes …

In the present research, we introduce the notion of convex stochastic processes namely;
strongly p-convex stochastic processes. We establish a generalized version of Ostrowski …

In numerical analysis, the Simpson's quadrature is a numerical integration method used to
obtain the approximate value of definite integrals. This quadrature is a combination of the …

A NEW HERMITE-HADAMARD INEQUALITY FOR h−CONVEX STOCHASTIC PROCESSES 1.
Introduction The classical Hermite-Hadamard inequality Page 1 A NEW HERMITE-HADAMARD …