Some Parameterized Quantum Simpson's and Quantum Newton's Integral Inequalities via Quantum Differentiable Convex Mappings

Xue Xiao You; Muhammad Aamir Ali; Hüseyin Budak; Miguel Vivas-Cortez; Shahid Qaisar

doi:10.1155/2021/5526726

Some Parameterized Quantum Simpson's and Quantum Newton's Integral Inequalities via Quantum Differentiable Convex Mappings

Xue Xiao You
, Muhammad Aamir Ali
, Hüseyin Budak
, Miguel Vivas-Cortez^*
, Shahid Qaisar

^*Corresponding author for this work

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

4 Scopus citations

Abstract

In this work, two generalized quantum integral identities are proved by using some parameters. By utilizing these equalities, we present several parameterized quantum inequalities for convex mappings. These quantum inequalities generalize many of the important inequalities that exist in the literature, such as quantum trapezoid inequalities, quantum Simpson's inequalities, and quantum Newton's inequalities. We also give some new midpoint-type inequalities as special cases. The results in this work naturally generalize the results for the Riemann integral.

Original language	English
Article number	5526726
Journal	Mathematical Problems in Engineering
Volume	2021
DOIs	https://doi.org/10.1155/2021/5526726
State	Published - 26 Dec 2021

Bibliographical note

Publisher Copyright:
© 2021 Xue Xiao You et al.

Access to Document

10.1155/2021/5526726

Cite this

@article{e8082d29ff644e4db41428545a5985a9,

title = "Some Parameterized Quantum Simpson's and Quantum Newton's Integral Inequalities via Quantum Differentiable Convex Mappings",

abstract = "In this work, two generalized quantum integral identities are proved by using some parameters. By utilizing these equalities, we present several parameterized quantum inequalities for convex mappings. These quantum inequalities generalize many of the important inequalities that exist in the literature, such as quantum trapezoid inequalities, quantum Simpson's inequalities, and quantum Newton's inequalities. We also give some new midpoint-type inequalities as special cases. The results in this work naturally generalize the results for the Riemann integral.",

author = "You, \{Xue Xiao\} and Ali, \{Muhammad Aamir\} and H{\"u}seyin Budak and Miguel Vivas-Cortez and Shahid Qaisar",

note = "Publisher Copyright: {\textcopyright} 2021 Xue Xiao You et al.",

year = "2021",

month = dec,

day = "26",

doi = "10.1155/2021/5526726",

language = "English",

volume = "2021",

journal = "Mathematical Problems in Engineering",

issn = "1024-123X",

publisher = "John Wiley and Sons Ltd",

}

TY - JOUR

T1 - Some Parameterized Quantum Simpson's and Quantum Newton's Integral Inequalities via Quantum Differentiable Convex Mappings

AU - You, Xue Xiao

AU - Ali, Muhammad Aamir

AU - Budak, Hüseyin

AU - Vivas-Cortez, Miguel

AU - Qaisar, Shahid

PY - 2021/12/26

Y1 - 2021/12/26

N2 - In this work, two generalized quantum integral identities are proved by using some parameters. By utilizing these equalities, we present several parameterized quantum inequalities for convex mappings. These quantum inequalities generalize many of the important inequalities that exist in the literature, such as quantum trapezoid inequalities, quantum Simpson's inequalities, and quantum Newton's inequalities. We also give some new midpoint-type inequalities as special cases. The results in this work naturally generalize the results for the Riemann integral.

AB - In this work, two generalized quantum integral identities are proved by using some parameters. By utilizing these equalities, we present several parameterized quantum inequalities for convex mappings. These quantum inequalities generalize many of the important inequalities that exist in the literature, such as quantum trapezoid inequalities, quantum Simpson's inequalities, and quantum Newton's inequalities. We also give some new midpoint-type inequalities as special cases. The results in this work naturally generalize the results for the Riemann integral.

UR - https://www.scopus.com/pages/publications/85122760494

U2 - 10.1155/2021/5526726

DO - 10.1155/2021/5526726

M3 - Article

AN - SCOPUS:85122760494

SN - 1024-123X

VL - 2021

JO - Mathematical Problems in Engineering

JF - Mathematical Problems in Engineering

M1 - 5526726

ER -

Some Parameterized Quantum Simpson's and Quantum Newton's Integral Inequalities via Quantum Differentiable Convex Mappings

Abstract

Bibliographical note

Access to Document

Other files and links

Cite this