Some new Ostrowski’s inequalities for functions whose nth derivatives are logarithmically convex
Journal Title: Annales Mathematicae Silesianae - Year 2018, Vol 32, Issue
Abstract
Some new Ostrowski’s inequalities for functions whose n-th derivative are logarithmically convex are established.
Authors and Affiliations
Badreddine Meftah
Keywords
Related Articles
- EP ID EP524955
- DOI 10.1515/amsil-2017-0011
- Views 115
- Downloads 0
Report of Meeting. The Fifteenth Katowice-Debrecen Winter Seminar, Będlewo (Poland), January 28–31, 2015
Report of Meeting. The Fifteenth Katowice-Debrecen Winter Seminar, Będlewo (Poland), January 28–31, 2015
On orthogonally additive functions with big graphs
Let $E$ be a separable real inner product space of dimension at least 2 and $V$ be a metrizable and separable linear topological space. We show that the set of all orthogonally additive functions mapping $E$ into $V$ and...
Report of Meeting. The Seventeenth Katowice–Debrecen Winter Seminar Zakopane (Poland) , February 1–4, 2017
Report of Meeting. The Seventeenth Katowice–Debrecen Winter Seminar Zakopane (Poland) , February 1–4, 2017
Random dynamical systems with jumps and with a function type intensity
In paper [4] there are considered random dynamical systems with randomly chosen jumps acting on Polish spaces. The intensity of this process is a constant $\lambda$. In this paper we formulate criteria for the existence...
Fixed point theorems for two pairs of mappings satisfying a new type of common limit range property in G_p metric spaces
The purpose of this paper is to prove a general fixed point theorem for mappings involving almost altering distances and satisfying a new type of common limit range property in $G_p$ metric spaces. In the last part of th...