Multiplicative tempered fractional Newton-type inequalities for twice *differentiable multiplicatively inverse cosine convex functions with applications

Muhammad Samraiz; Muhammad Abu Bakar Ashraf; Saima Naheed; Miguel Vivas-Cortez

doi:10.1186/s13660-025-03399-z

Multiplicative tempered fractional Newton-type inequalities for twice *differentiable multiplicatively inverse cosine convex functions with applications

Muhammad Samraiz
, Muhammad Abu Bakar Ashraf
, Saima Naheed
, Miguel Vivas-Cortez

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

Abstract

In this paper, an integral identity is developed using the framework of multiplicative tempered Riemann-Liouville fractional integrals. By utilizing the identity several Newton-type inequalities are established for twice *differentiable multiplicatively inverse cosine convex functions. The appeal of generalized convex functions stems from their applicability to a broader function class than ordinary convex functions. This helps in finding the best possible lower and upper bounds more effectively. In addition, we establish some more refined results via Hölder and power-mean inequalities. The obtained results are verified through graphs. Finally, some applications are given in the context of quadrature formulae.

Original language	English
Article number	156
Journal	Journal of Inequalities and Applications
Volume	2025
Issue number	1
DOIs	https://doi.org/10.1186/s13660-025-03399-z
State	Published - Dec 2025

Keywords

Inverse Cosine convex functions
Multiplicative calculus
Newton formula
Newton-type inequalities
Tempered fractional integrals

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10.1186/s13660-025-03399-z

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abstract = "In this paper, an integral identity is developed using the framework of multiplicative tempered Riemann-Liouville fractional integrals. By utilizing the identity several Newton-type inequalities are established for twice *differentiable multiplicatively inverse cosine convex functions. The appeal of generalized convex functions stems from their applicability to a broader function class than ordinary convex functions. This helps in finding the best possible lower and upper bounds more effectively. In addition, we establish some more refined results via H{\"o}lder and power-mean inequalities. The obtained results are verified through graphs. Finally, some applications are given in the context of quadrature formulae.",

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AU - Samraiz, Muhammad

AU - Ashraf, Muhammad Abu Bakar

AU - Naheed, Saima

AU - Vivas-Cortez, Miguel

N1 - Publisher Copyright: © The Author(s) 2025.

PY - 2025/12

Y1 - 2025/12

N2 - In this paper, an integral identity is developed using the framework of multiplicative tempered Riemann-Liouville fractional integrals. By utilizing the identity several Newton-type inequalities are established for twice *differentiable multiplicatively inverse cosine convex functions. The appeal of generalized convex functions stems from their applicability to a broader function class than ordinary convex functions. This helps in finding the best possible lower and upper bounds more effectively. In addition, we establish some more refined results via Hölder and power-mean inequalities. The obtained results are verified through graphs. Finally, some applications are given in the context of quadrature formulae.

AB - In this paper, an integral identity is developed using the framework of multiplicative tempered Riemann-Liouville fractional integrals. By utilizing the identity several Newton-type inequalities are established for twice *differentiable multiplicatively inverse cosine convex functions. The appeal of generalized convex functions stems from their applicability to a broader function class than ordinary convex functions. This helps in finding the best possible lower and upper bounds more effectively. In addition, we establish some more refined results via Hölder and power-mean inequalities. The obtained results are verified through graphs. Finally, some applications are given in the context of quadrature formulae.

KW - Inverse Cosine convex functions

KW - Multiplicative calculus

KW - Newton formula

KW - Newton-type inequalities

KW - Tempered fractional integrals

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VL - 2025

JO - Journal of Inequalities and Applications

JF - Journal of Inequalities and Applications

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ER -

Multiplicative tempered fractional Newton-type inequalities for twice *differentiable multiplicatively inverse cosine convex functions with applications

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