ANALYSIS OF MACLAURIN’S INEQUALITY WITH APPLICATIONS IN NUMERICAL ANALYSIS

Miguel Vivas-Cortez; Usama Asif; Muhammad Zakria Javed; Muhammad Uzair Awan; Badreddine Meftah; Silvestru Sever Dragomir; Muhammad Aslam Noor

doi:10.7153/jmi-2025-19-86

ANALYSIS OF MACLAURIN’S INEQUALITY WITH APPLICATIONS IN NUMERICAL ANALYSIS

Miguel Vivas-Cortez
, Usama Asif
, Muhammad Zakria Javed
, Muhammad Uzair Awan
, Badreddine Meftah
, Silvestru Sever Dragomir
, Muhammad Aslam Noor

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

Abstract

Maclaurin’s inequality estimates the error bounds of a three-point open method named as Maclaurin’s procedure. The current study aims to explore the error boundaries of Maclaurin’s rule by utilizing the convexity of the mappings. We derive a new twice-differentiable Maclaurin’s identity. Based on newly developed identity, the convexity of mappings, and the elementary properties of inequalities, we derive some new Maclaurin’s type inequalities. Also, we apply the obtained bounds to formulate the relation between means, composite quadrature bounds, and a novel two-step iterative method with a cubic order of convergence. Lastly, we explore our major findings and the iterative method through illustrative examples and visuals.

Original language	English
Pages (from-to)	1349-1374
Number of pages	26
Journal	Journal of Mathematical Inequalities
Volume	19
Issue number	4
DOIs	https://doi.org/10.7153/jmi-2025-19-86
State	Published - Dec 2025

Keywords

26A51
26D15
32F99
41A17
Convex functions
Euler-Maclaurin’s inequality
Hölder’s inequality
Simspon’s rule
iterative scheme

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10.7153/jmi-2025-19-86

Cite this

@article{49d684561b9f4406abf9b4a36ef5be8b,

title = "ANALYSIS OF MACLAURIN{\textquoteright}S INEQUALITY WITH APPLICATIONS IN NUMERICAL ANALYSIS",

abstract = "Maclaurin{\textquoteright}s inequality estimates the error bounds of a three-point open method named as Maclaurin{\textquoteright}s procedure. The current study aims to explore the error boundaries of Maclaurin{\textquoteright}s rule by utilizing the convexity of the mappings. We derive a new twice-differentiable Maclaurin{\textquoteright}s identity. Based on newly developed identity, the convexity of mappings, and the elementary properties of inequalities, we derive some new Maclaurin{\textquoteright}s type inequalities. Also, we apply the obtained bounds to formulate the relation between means, composite quadrature bounds, and a novel two-step iterative method with a cubic order of convergence. Lastly, we explore our major findings and the iterative method through illustrative examples and visuals.",

keywords = "26A51, 26D15, 32F99, 41A17, Convex functions, Euler-Maclaurin{\textquoteright}s inequality, H{\"o}lder{\textquoteright}s inequality, Simspon{\textquoteright}s rule, iterative scheme",

author = "Miguel Vivas-Cortez and Usama Asif and Javed, \{Muhammad Zakria\} and Awan, \{Muhammad Uzair\} and Badreddine Meftah and Dragomir, \{Silvestru Sever\} and Noor, \{Muhammad Aslam\}",

year = "2025",

month = dec,

doi = "10.7153/jmi-2025-19-86",

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

volume = "19",

pages = "1349--1374",

journal = "Journal of Mathematical Inequalities",

issn = "1846-579X",

publisher = "Element d.o.o.",

number = "4",

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T1 - ANALYSIS OF MACLAURIN’S INEQUALITY WITH APPLICATIONS IN NUMERICAL ANALYSIS

AU - Vivas-Cortez, Miguel

AU - Asif, Usama

AU - Javed, Muhammad Zakria

AU - Awan, Muhammad Uzair

AU - Meftah, Badreddine

AU - Dragomir, Silvestru Sever

AU - Noor, Muhammad Aslam

PY - 2025/12

Y1 - 2025/12

N2 - Maclaurin’s inequality estimates the error bounds of a three-point open method named as Maclaurin’s procedure. The current study aims to explore the error boundaries of Maclaurin’s rule by utilizing the convexity of the mappings. We derive a new twice-differentiable Maclaurin’s identity. Based on newly developed identity, the convexity of mappings, and the elementary properties of inequalities, we derive some new Maclaurin’s type inequalities. Also, we apply the obtained bounds to formulate the relation between means, composite quadrature bounds, and a novel two-step iterative method with a cubic order of convergence. Lastly, we explore our major findings and the iterative method through illustrative examples and visuals.

AB - Maclaurin’s inequality estimates the error bounds of a three-point open method named as Maclaurin’s procedure. The current study aims to explore the error boundaries of Maclaurin’s rule by utilizing the convexity of the mappings. We derive a new twice-differentiable Maclaurin’s identity. Based on newly developed identity, the convexity of mappings, and the elementary properties of inequalities, we derive some new Maclaurin’s type inequalities. Also, we apply the obtained bounds to formulate the relation between means, composite quadrature bounds, and a novel two-step iterative method with a cubic order of convergence. Lastly, we explore our major findings and the iterative method through illustrative examples and visuals.

KW - 26A51

KW - 26D15

KW - 32F99

KW - 41A17

KW - Convex functions

KW - Euler-Maclaurin’s inequality

KW - Hölder’s inequality

KW - Simspon’s rule

KW - iterative scheme

UR - https://www.scopus.com/pages/publications/105026984511

U2 - 10.7153/jmi-2025-19-86

DO - 10.7153/jmi-2025-19-86

M3 - Artículo

AN - SCOPUS:105026984511

SN - 1846-579X

VL - 19

SP - 1349

EP - 1374

JO - Journal of Mathematical Inequalities

JF - Journal of Mathematical Inequalities

IS - 4

ER -

ANALYSIS OF MACLAURIN’S INEQUALITY WITH APPLICATIONS IN NUMERICAL ANALYSIS

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Keywords

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