Add to ORKGAn expansion of a certain class of generalized functions is given in a series of Laguerre polynomials by using a summability method. The result is applied to derive a new inversion formula for the distributional Laplace transform. 1
Lagrange's theorem on the expansion of inverse functions is generalized for functions of two variabl...
This paper presents an application of Laguerre matrix polynomial series to the numerical inversion o...
AbstractSeveral independent proofs are given for certain interesting operational representations for...
This paper concentrates on using generalized Laguerre functions to calculate the inverse Laplace tra...
AbstractA general result involving the generalized hypergeometric function is deduced by the element...
Herein, three important theorems were stated and proved. The first relates the modified generalized ...
A simple structure of the multiple Laguerre polynomial expansions is used to study the Ces`aro summa...
AbstractThis paper presents an application of Laguerre matrix polynomial series to the numerical inv...
Tricomi’s method for computing a set of inverse Laplace transforms in terms of Laguerre polynomials ...
Tricomi’s method for computing a set of inverse Laplace transforms in terms of Laguerre polynomials ...
Tricomi’s method for computing a set of inverse Laplace transforms in terms of Laguerre polynomials ...
Tricomi’s method for computing a set of inverse Laplace transforms in terms of Laguerre polynomials ...
Tricomi’s method for computing a set of inverse Laplace transforms in terms of Laguerre polynomials ...
This paper presents an application of Laguerre matrix polynomial series to the numerical inversion o...
summary:In order to use the well known representation of the Mellin transform as a combination of tw...
Lagrange's theorem on the expansion of inverse functions is generalized for functions of two variabl...
This paper presents an application of Laguerre matrix polynomial series to the numerical inversion o...
AbstractSeveral independent proofs are given for certain interesting operational representations for...
This paper concentrates on using generalized Laguerre functions to calculate the inverse Laplace tra...
AbstractA general result involving the generalized hypergeometric function is deduced by the element...
Herein, three important theorems were stated and proved. The first relates the modified generalized ...
A simple structure of the multiple Laguerre polynomial expansions is used to study the Ces`aro summa...
AbstractThis paper presents an application of Laguerre matrix polynomial series to the numerical inv...
Tricomi’s method for computing a set of inverse Laplace transforms in terms of Laguerre polynomials ...
Tricomi’s method for computing a set of inverse Laplace transforms in terms of Laguerre polynomials ...
Tricomi’s method for computing a set of inverse Laplace transforms in terms of Laguerre polynomials ...
Tricomi’s method for computing a set of inverse Laplace transforms in terms of Laguerre polynomials ...
Tricomi’s method for computing a set of inverse Laplace transforms in terms of Laguerre polynomials ...
This paper presents an application of Laguerre matrix polynomial series to the numerical inversion o...
summary:In order to use the well known representation of the Mellin transform as a combination of tw...
Lagrange's theorem on the expansion of inverse functions is generalized for functions of two variabl...
This paper presents an application of Laguerre matrix polynomial series to the numerical inversion o...
AbstractSeveral independent proofs are given for certain interesting operational representations for...