Some novel estimates of Hermite-Hadamard type inequality for post-quantum integrals involving coordinated convex functions and application

Tariq Nawaz; Miguel Vivas-Cortez; Artion Kashuri; Muhammad Raees; Azeem Shahzad

doi:10.22436/jmcs.040.01.07

Some novel estimates of Hermite-Hadamard type inequality for post-quantum integrals involving coordinated convex functions and application

Tariq Nawaz, Miguel Vivas-Cortez, Artion Kashuri, Muhammad Raees, Azeem Shahzad

Research output: Contribution to journal › Article › peer-review

Abstract

This study reveals the error analysis of Hermite-Hadamard inequality for coordinated convexity related to post-quantum integrals. At first, we establish a multi-parameter identity pertaining coordinated convexity via post-quantum integrals followed by new integrals to construct our main results. By utilizing this generic identity, we analyze the error estimates of classical Hermite-Hadamard inequality in the post-quantum context. Application of power mean inequality enables the refinement of bounds involved and extends it further. We make use of graphical representation with the help of concrete examples to verify the validity of presented results. In the end, to focus on usability and significance of the results, two applications through polynomial functions are produced.

Original language	English
Pages (from-to)	101-123
Number of pages	23
Journal	Journal of Mathematics and Computer Science
Volume	40
Issue number	1
DOIs	https://doi.org/10.22436/jmcs.040.01.07
State	Published - 2025

Keywords

Hermite-Hadamard inequality
Jackson integrals
coordinated convex functions
post-quantum double integrals
power-mean inequality
special means
twice partially post-quantum derivatives

Access to Document

10.22436/jmcs.040.01.07

Cite this

@article{ecf302299396485fae797d5d27d84655,

title = "Some novel estimates of Hermite-Hadamard type inequality for post-quantum integrals involving coordinated convex functions and application",

abstract = "This study reveals the error analysis of Hermite-Hadamard inequality for coordinated convexity related to post-quantum integrals. At first, we establish a multi-parameter identity pertaining coordinated convexity via post-quantum integrals followed by new integrals to construct our main results. By utilizing this generic identity, we analyze the error estimates of classical Hermite-Hadamard inequality in the post-quantum context. Application of power mean inequality enables the refinement of bounds involved and extends it further. We make use of graphical representation with the help of concrete examples to verify the validity of presented results. In the end, to focus on usability and significance of the results, two applications through polynomial functions are produced.",

keywords = "Hermite-Hadamard inequality, Jackson integrals, coordinated convex functions, post-quantum double integrals, power-mean inequality, special means, twice partially post-quantum derivatives",

author = "Tariq Nawaz and Miguel Vivas-Cortez and Artion Kashuri and Muhammad Raees and Azeem Shahzad",

year = "2025",

doi = "10.22436/jmcs.040.01.07",

language = "Ingl{\'e}s",

volume = "40",

pages = "101--123",

journal = "Journal of Mathematics and Computer Science",

issn = "2008-949X",

publisher = "International Scientific Research Publications",

number = "1",

}

TY - JOUR

T1 - Some novel estimates of Hermite-Hadamard type inequality for post-quantum integrals involving coordinated convex functions and application

AU - Nawaz, Tariq

AU - Vivas-Cortez, Miguel

AU - Kashuri, Artion

AU - Raees, Muhammad

AU - Shahzad, Azeem

PY - 2025

Y1 - 2025

N2 - This study reveals the error analysis of Hermite-Hadamard inequality for coordinated convexity related to post-quantum integrals. At first, we establish a multi-parameter identity pertaining coordinated convexity via post-quantum integrals followed by new integrals to construct our main results. By utilizing this generic identity, we analyze the error estimates of classical Hermite-Hadamard inequality in the post-quantum context. Application of power mean inequality enables the refinement of bounds involved and extends it further. We make use of graphical representation with the help of concrete examples to verify the validity of presented results. In the end, to focus on usability and significance of the results, two applications through polynomial functions are produced.

AB - This study reveals the error analysis of Hermite-Hadamard inequality for coordinated convexity related to post-quantum integrals. At first, we establish a multi-parameter identity pertaining coordinated convexity via post-quantum integrals followed by new integrals to construct our main results. By utilizing this generic identity, we analyze the error estimates of classical Hermite-Hadamard inequality in the post-quantum context. Application of power mean inequality enables the refinement of bounds involved and extends it further. We make use of graphical representation with the help of concrete examples to verify the validity of presented results. In the end, to focus on usability and significance of the results, two applications through polynomial functions are produced.

KW - Hermite-Hadamard inequality

KW - Jackson integrals

KW - coordinated convex functions

KW - post-quantum double integrals

KW - power-mean inequality

KW - special means

KW - twice partially post-quantum derivatives

UR - https://www.scopus.com/pages/publications/105009088732

U2 - 10.22436/jmcs.040.01.07

DO - 10.22436/jmcs.040.01.07

M3 - Artículo

AN - SCOPUS:105009088732

SN - 2008-949X

VL - 40

SP - 101

EP - 123

JO - Journal of Mathematics and Computer Science

JF - Journal of Mathematics and Computer Science

IS - 1

ER -

Some novel estimates of Hermite-Hadamard type inequality for post-quantum integrals involving coordinated convex functions and application

Abstract

Keywords

Access to Document

Other files and links

Fingerprint

Cite this