Generalizations of some integral inequalities for fractional integrals
Journal Title: Annales Mathematicae Silesianae - Year 2018, Vol 32, Issue
Abstract
In this paper we give generalizations of the Hadamard-type inequalities for fractional integrals. As special cases we derive several Hadamard type inequalities.
Authors and Affiliations
Ghulam Farid, Atiq ur Rehman
Keywords
Related Articles
- EP ID EP524794
- DOI 10.1515/amsil-2017-0010
- Views 116
- Downloads 0
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...
On the general and measurable solutions of some functional equations
The general solutions of two functional equations, without imposing any regularity condition on any of the functions appearing, have been obtained. From these general solutions, the Lebesgue measurable solutions have bee...
Wild primes of a higher degree self-equivalence of a number field
Let $\mathcal{l} > 2$ be a prime number. Let $K$ be a number field containing a unique $\mathcal{l}$-adic prime and assume that its class is an $\mathcal{l}$th power in the class group $C_K$. The main theorem of the pape...
Multipliers of uniform topological algebras
Let $E$ be a complete uniform topological algebra with Arens-Michael normed factors $(E_α)_{α∈Λ}$. Then $M(E)\cong\lim_{←}M(E_α)$ within an algebra isomorphism $φ$. If each factor $E_α$ is complete, then every multiplier...
Inequalities of Lipschitz type for power series in Banach algebras
Let $f(z) = \sum_{n=0}^{\infty}\alpha_n z^n$ be a function defined by power series with complex coefficients and convergent on the open disk $D(0,R) \subset \mathbb{C}$, $R > 0$. For any $x, y \in \mathcal{B}$, a Banach...