Add to ORKGWe extend the technique of using the trapezoidal rule for e±cient evaluation of the special functions of mathematical physics given by integral representations. This technique was re-cently used for Bessel functions, and here we treat incomplete gamma functions and the general con°uent hypergeometric function
AbstractRecently, Chaudhry and Zubair have introduced a generalized incomplete gamma function Γ(v,x;...
AbstractIn a recent paper in this journal, Gautschi et al. [W. Gautschi, F.E. Harris, N.M. Temme, Ex...
This paper is concerned with applications of the arbitrary order derivintegrals of generalized hyper...
Special functions, natural generalizations of the elementary functions, have been studied for centur...
The incomplete gamma function is rewritten as a finite sum of Macdonald functions (modified Bessel f...
Some of the best methods for computing the gamma function are based on numerical evaluation of Hanke...
textabstractThe usual tools for computing special functions are power series, asymptotic expansions,...
AbstractIn this paper, we introduce new functions as generalizations of the incomplete gamma functio...
The subject of special functions is rich and expanding continuously with the emergence of new proble...
AbstractRecently, Chaudhry and Zubair have introduced a generalized incomplete gamma function Γ(v,x;...
Motivated mainly by a variety of applications of Euler's Beta, hypergeometric, and confluent hyperge...
In this paper, we describe numerical methods for special functions, especially Bessel function Jn(x)...
AbstractWe represent the Generalized Incomplete Gamma Function Γ(α,x;b)=∫x∞tα−1exp(−t−bt)dt,α∈R,x≥0,...
AbstractAn extension of the generalized inverse Gaussian density function is proposed. Analogous to ...
The subjects treated in this book have been especially chosen to represent a bridge connecting the c...
AbstractRecently, Chaudhry and Zubair have introduced a generalized incomplete gamma function Γ(v,x;...
AbstractIn a recent paper in this journal, Gautschi et al. [W. Gautschi, F.E. Harris, N.M. Temme, Ex...
This paper is concerned with applications of the arbitrary order derivintegrals of generalized hyper...
Special functions, natural generalizations of the elementary functions, have been studied for centur...
The incomplete gamma function is rewritten as a finite sum of Macdonald functions (modified Bessel f...
Some of the best methods for computing the gamma function are based on numerical evaluation of Hanke...
textabstractThe usual tools for computing special functions are power series, asymptotic expansions,...
AbstractIn this paper, we introduce new functions as generalizations of the incomplete gamma functio...
The subject of special functions is rich and expanding continuously with the emergence of new proble...
AbstractRecently, Chaudhry and Zubair have introduced a generalized incomplete gamma function Γ(v,x;...
Motivated mainly by a variety of applications of Euler's Beta, hypergeometric, and confluent hyperge...
In this paper, we describe numerical methods for special functions, especially Bessel function Jn(x)...
AbstractWe represent the Generalized Incomplete Gamma Function Γ(α,x;b)=∫x∞tα−1exp(−t−bt)dt,α∈R,x≥0,...
AbstractAn extension of the generalized inverse Gaussian density function is proposed. Analogous to ...
The subjects treated in this book have been especially chosen to represent a bridge connecting the c...
AbstractRecently, Chaudhry and Zubair have introduced a generalized incomplete gamma function Γ(v,x;...
AbstractIn a recent paper in this journal, Gautschi et al. [W. Gautschi, F.E. Harris, N.M. Temme, Ex...
This paper is concerned with applications of the arbitrary order derivintegrals of generalized hyper...