Contiguous function relations for \(k\)-hypergeometric functions
From MaRDI portal
Publication:2016490
DOI10.1155/2014/410801zbMath1301.33021OpenAlexW2092389177WikidataQ59048130 ScholiaQ59048130MaRDI QIDQ2016490
Gauhar Rahman, Shahid Mubeen, Mammona Naz, Abdur Rehman
Publication date: 20 June 2014
Published in: ISRN Mathematical Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2014/410801
Related Items
Inequalities with applications to some \(k\)-analog random variables, On \(k\)-gamma and \(k\)-beta distributions and moment generating functions, New generalizations of exponential distribution with applications, Further study on the conformable fractional Gauss hypergeometric function, Composition formulae for the \(k\)-fractional calculus operators associated with \(k\)-Wright function, \(k\)-hypergeometric series solutions to one type of non-homogeneous \(k\)-hypergeometric equations, Unnamed Item, ON SEVERAL NEW CONTIGUOUS FUNCTION RELATIONS FOR k-HYPERGEOMETRIC FUNCTION WITH TWO PARAMETERS, Some inequalities involving \(k\)-gamma and \(k\)-beta functions with applications. II
Cites Work
- On the \(k\)-gamma \(q\)-distribution
- A generalization of Kummer's identity.
- Contiguous relations, basic hypergeometric functions, and orthogonal polynomials. I
- Contiguous relations of hypergeometric series
- Contiguous relations, basic hypergeometric functions, and orthogonal polynomials. III: Associated continuous dual \(q\)-Hahn polynomials
- Generalizations of Whipple's theorem on the sum of a \({}_ 3 F_ 2\)
- Contiguous relations and their computations for \(_2F_1\) hypergeometric series
- On the contiguous relations of hypergeometric series
- Use of the Gauss Contiguous Relations in Computing the Hypergeometric Functions F(n+1/2, n+1/2; m;z).
- Contiguous relations, continued fractions and orthogonality
- q,k-Generalized Gamma and Beta Functions
- The contiguous function relations for _{๐}๐น_{๐} with application to Batemeanโs ๐ฝ_{๐}^{๐ข,๐} and Riceโs ๐ป_{๐}(๐,๐,๐)
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
