Open AccessHermite–Hadamard-Type Inequalities for Product of Functions by Using Convex Functions
Author(s) -
Tariq Nawaz,
M. Asif Memon,
J. Kavikumar
Publication year - 2021
Publication title -
journal of mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.252
H-Index - 13
eISSN - 2314-4785
pISSN - 2314-4629
DOI - 10.1155/2021/6630411
Subject(s) - mathematics , hermite polynomials , convex function , product (mathematics) , convex analysis , hadamard transform , pure mathematics , proper convex function , type (biology) , function (biology) , convex combination , convex conjugate , hadamard product , regular polygon , convex optimization , mathematical analysis , algebra over a field , geometry , ecology , evolutionary biology , biology
One of the many techniques to obtain a new convex function from the given functions is to calculate the product of these functions by imposing certain conditions on the functions. In general, the product of two or finite number of convex function needs not to be convex and, therefore, leads us to the study of product of these functions. In this paper, we reframe the idea of product of functions in the setting of generalized convex function to establish Hermite–Hadamard-type inequalities for these functions. We have analyzed different cases of double and triple integrals to derive some new results. The presented results can be viewed as the refinement and improvement of previously known results.
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