On the bounds for the normalized Jensen functional and Jensen-Steffensen inequality
| Autor: | Josip Pečarić, Josipa Barić, Marko Matić |
|---|---|
| Jazyk: | angličtina |
| Rok vydání: | 2009 |
| Předmět: |
Inequality
Generalization Applied Mathematics General Mathematics media_common.quotation_subject Type (model theory) Jensen-Steffensen’ s inequality convex functions bounds Combinatorics Interval (graph theory) Jensen-Steffensen's inequality Special case Convex function Real line media_common Mathematics |
| Popis: | We consider the inequalities of type MJn(f ,x,qq) Jn(f ,x,pp) mJn(f ,x,qq), where f is a convex function and Jn(f ,xx,pp )= n=1 pif (xi) � f n=1 pixi , recently introduced by S.S. Dragomir. We give an alternative proof of such inequalities and prove another similar result for the case when f is a convex function on an interval in the real line, while p and q satisfy the conditions for Jensen-Steffensen inequality. We show that our result improves the result of Dragomir in this special case. We also prove the integral versions of all our results, including those related to Boas' generalization of Jensen-Steffensen integral inequality. |
| Databáze: | OpenAIRE |
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