We solve the second-order linear differential equation called thek-hypergeometric differential equation by using Frobenius method around all its regular singularities. At each singularity, we find 8 solutions corresponding to the different cases for parameters and modified our solutions accordingly.
In the paper, the authors present some inequalities involving the extended gamma function and the Kummer confluent hypergeometric k-function via some classical inequalities such as Chebychev’s inequality for synchronous (or asynchronous, respectively) mappings, give a new proof of the log-convexity of the extended gamma function by using the Hölder inequality, and introduce a Turán type mean inequality for the Kummer confluent k-hypergeometric function.
In the research paper, the authors exploit the definition of a new class of fractional integral operators, recently proposed by Jarad et al. (Adv. Differ. Equ. 2017:247, 2017), to define a new class of generalized k-fractional integral operators and develop a generalization of the reverse Minkowski inequality involving the newly introduced fractional integral operators. The two new theorems correlating with this inequality, including statements and verifications of other inequalities via the suggested k-fractional conformable integral operators, are presented.
In this paper, we introduce the (k, s)-fractional integral and differential operators involving k-Mittag-Leffler function E δ k,ρ,β (z) as its kernel. Also, we establish various properties of these operators. Further, we consider a number of certain consequences of the main results.
The main objective of this paper is to derive contiguous function relations or recurrence relations and obtainan integral representation Appell -series , where .Keywords: Pochhammer -symbol, -gamma function, -beta function, Contiguous functions, Appell -series.
Contribution/ OriginalityThis study originates a new formula for Appell's series in the form of a new symbol and contributes for deriving contiguous function relations, obtaining an integral representation of the Appell's series in terms of said symbol .
The principle aim of this research article is to investigate the properties of k-fractional integration introduced and defined by Mubeen and Habibullah [1], and secondly to solve the integral equation of the form
scite is a Brooklyn-based organization that helps researchers better discover and understand research articles through Smart Citations–citations that display the context of the citation and describe whether the article provides supporting or contrasting evidence. scite is used by students and researchers from around the world and is funded in part by the National Science Foundation and the National Institute on Drug Abuse of the National Institutes of Health.