Hermite-Hadamart Integral Inequality for Differentiable m- Convex Functions

Authors

  • Pitambar Tiwari Bhairahawa Multiple Campus, Siddharthanagar, Rupandehi
  • Chet Raj Bhatta Central Department of Mathematics, Tribhuvan University, Kathmandu, Nepal

DOI:

https://doi.org/10.3126/nmsr.v41i1.67463

Keywords:

Convexity, m-convexity, integral inequality.

Abstract

Convexity in connection with integral inequalities is an interesting research domain in recent years. The convexity theory plays a fundamental role in the development of various branches of applied sciences since it includes the theory of convex functions that possesses two important attributes viz. a boundary point is where the maximum value is reached and any local minimum value is a global one. Convexities and inequalities are connected which has a basic character in many branches of pure and applied disciplines. The most important inequality related to convex function is the Hermite-Hadamard integral inequality. The extensions, enhancements and generalizations of this inequality has motivated the researchers in recent years. This paper is an extension of some inequalities connected with difference of the left-hand part as well as the right-hand part from the integral mean in Hermite- Hadamard’s inequality for the case of m- convex functions.

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Published

2024-07-02

How to Cite

Tiwari, P., & Bhatta, C. R. (2024). Hermite-Hadamart Integral Inequality for Differentiable m- Convex Functions. The Nepali Mathematical Sciences Report, 41(1), 68–78. https://doi.org/10.3126/nmsr.v41i1.67463

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