Generalized strongly n-polynomial convex functions and related inequalities

被引:0
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作者
Serap Özcan
Mahir Kadakal
İmdat İşcan
Huriye Kadakal
机构
[1] Kırklareli University,Department of Mathematics, Faculty of Arts and Sciences
[2] Bayburt University,Department of Customs Management, Faculty of Applied Sciences
[3] Giresun University,Department of Mathematics, Faculty of Arts and Sciences
[4] Bayburt University,Department of Primary Education, Faculty of Education
来源
Boundary Value Problems | / 2024卷
关键词
Convex function; Generalized strongly ; -polynomial convex function; Hermite–Hadamard inequality; Hölder-İşcan inequality; Integral inequalities; 26D15; 26A51; 26D10;
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摘要
This paper focuses on introducing and examining the class of generalized strongly n-polynomial convex functions. Relationships between these functions and other types of convex functions are explored. The Hermite–Hadamard inequality is established for generalized strongly n-polynomial convex functions. Additionally, new integral inequalities of Hermite–Hadamard type are derived for this class of functions using the Hölder–İşcan integral inequality. The results obtained in this paper are compared with those known in the literature, demonstrating the superiority of the new results. Finally, some applications for special means are provided.
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