Some (p, q)-Integral Inequalities of Hermite–Hadamard Inequalities for (p, q)-Differentiable Convex Functions

Abstract: In this paper, we establish a new (p,q)b-integral identity involving the first-order (p,q)b-derivative. Then, we use this result to prove some new (p,q)b-integral inequalities related to Hermite–Hadamard inequalities for (p,q)b-differentiable convex functions. Furthermore, our main results are used to study some special cases of various integral inequalities. The newly presented results are proven to be generalizations of some integral inequalities of already published results. Finally, some examples are given… Show more

“…For any convex function defined on an interval, this inequality gives a lower and upper estimate for the integral average. Several researchers have used a variety of methodologies to investigate novel generalizations and adaptations for the Hermite-Hadamard inequality [25][26][27][28][29]. A tangible geometric representation of a convex function is the Hermite-Hadamard inequality shown below.…”

Error estimates of Hermite‐Hadamard type inequalities with respect to a monotonically increasing function

“…For any convex function defined on an interval, this inequality gives a lower and upper estimate for the integral average. Several researchers have used a variety of methodologies to investigate novel generalizations and adaptations for the Hermite-Hadamard inequality [25][26][27][28][29]. A tangible geometric representation of a convex function is the Hermite-Hadamard inequality shown below.…”

Error estimates of Hermite‐Hadamard type inequalities with respect to a monotonically increasing function

“…As we all know, there is a close connection between convex functions and inequalities, so inspired by the literature, Jensen type inequality and Hermite-Hadamard type inequalities for convex interval-valued functions have been studied in recent years. However, it is worth noting that at present, interval-valued inequalities are obtained by using inclusion relations or LU-orders [14][15][16][17][18], and these relations are partial orders. In 2014, Bhunia and Samanta [19] defined the crorder by using the midpoint and radius of the interval, which is a total order relation.…”

The Properties of Harmonically cr-h-Convex Function and Its Applications

“…Convex interval-valued functions have recently been the subject of research on J sen type inequality and Hermite-Hadamard type inequalities since, as we all know, c vex functions and inequalities go hand in hand. It is important to keep in mind that inc sion relations or LU-orders [37][38][39][40][41][42][43][44][45][46][47][48][49][50][51][52], which are partial orders, are currently used to gen ate interval-valued inequalities. The midpoint and radius of the interval were used in 2 by Bhunia and Samanta [53] to define the cr-order, which is a complete order relat Rahman [54] developed the cr-convex function and investigated its nonlinearity in 20 For more information related to interval-valued functions, see [55][56][57][58][59][60][61][62][63][64][65][66][67][68].…”

Generalized Preinvex Interval-Valued Functions and Related Hermite–Hadamard Type Inequalities