We derive integrals of combination of Gauss and Bessel functions, by the use of umbral techniques. We show that the method allows the possibility of pursuing new and apparently fruitful avenues in the theory of special functions, displaying interesting links with the theory and the formalism of integral transforms
AbstractIn this paper we study the q-analogue of the jα Bessel function (see (1)) which results afte...
AbstractIn this paper, the product of a Jacobi polynomial and function is shown to generate the Jaco...
Here we discuss the calculation of an integral containing the Bessel function J_0(r) and the modifie...
AbstractWe derive integrals of combination of Gauss and Bessel functions, by the use of umbral techn...
A common environment in which to place Bessel and circular functions is envisaged. We show, by the u...
In this note we review the theory of Gaussian functions by exploiting a point of view based on symbo...
Special polynomials, ascribed to the family of Gegenbauer, Legen- dre, and Jacobi and of their asso...
The use of non-standard calculus means have been proven to be extremely powerful for studying old an...
A common environment in which to place Bessel and circular functions is envisaged. We show, by the u...
The theory of harmonic-based functions is discussed here within the framework of umbral operational ...
This paper is a deep exploration of the project Bessel Functions by Martin Kreh of Pennsylvania Stat...
AbstractIn this note our aim is to deduce some sufficient conditions for integral operators involvin...
Many indefinite integrals are derived for Bessel functions and associated Legendre functions from pa...
In this paper, we show that the use of methods of an operational nature, such as umbral calculus, al...
AbstractA standard method for computing values of Bessel functions has been to use the well-known as...
AbstractIn this paper we study the q-analogue of the jα Bessel function (see (1)) which results afte...
AbstractIn this paper, the product of a Jacobi polynomial and function is shown to generate the Jaco...
Here we discuss the calculation of an integral containing the Bessel function J_0(r) and the modifie...
AbstractWe derive integrals of combination of Gauss and Bessel functions, by the use of umbral techn...
A common environment in which to place Bessel and circular functions is envisaged. We show, by the u...
In this note we review the theory of Gaussian functions by exploiting a point of view based on symbo...
Special polynomials, ascribed to the family of Gegenbauer, Legen- dre, and Jacobi and of their asso...
The use of non-standard calculus means have been proven to be extremely powerful for studying old an...
A common environment in which to place Bessel and circular functions is envisaged. We show, by the u...
The theory of harmonic-based functions is discussed here within the framework of umbral operational ...
This paper is a deep exploration of the project Bessel Functions by Martin Kreh of Pennsylvania Stat...
AbstractIn this note our aim is to deduce some sufficient conditions for integral operators involvin...
Many indefinite integrals are derived for Bessel functions and associated Legendre functions from pa...
In this paper, we show that the use of methods of an operational nature, such as umbral calculus, al...
AbstractA standard method for computing values of Bessel functions has been to use the well-known as...
AbstractIn this paper we study the q-analogue of the jα Bessel function (see (1)) which results afte...
AbstractIn this paper, the product of a Jacobi polynomial and function is shown to generate the Jaco...
Here we discuss the calculation of an integral containing the Bessel function J_0(r) and the modifie...
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