In this paper we present an analogous of the class of two-sided axial monogenic functions to the case of axial $\kappa-$hypermonogenic functions. In order to do that we will solve a Vekua-type system in terms of Bessel functions
AbstractIn this paper we extend our recent work on axial monogenic functions in Rm+1 to functions wh...
Abstract. In relation to the solution of the Vekua system for axial type monogenic functions, genera...
In this paper we prove an integral representation formula for the inverse Fueter mapping theorem for...
In this paper we consider the solutions of the equation , where is the so called modifier Dirac oper...
This paper deals with axially and biaxial monogenic functions that are derived using two fundamental...
Clifford analysis may be regarded as a direct and elegant generalization to higher dimensions of the...
AbstractIn our previous paper (Rend. Circ. Mat. Palermo 6 (1984), 259–269, we proved a general Laure...
Solutions to the Dirac equation are obtained by considering functions of axial type.This indeed give...
In this paper we introduce the modified Dirac operators and , where is differentiable function, and ...
In this paper we introduce the modified Dirac operators $\mathcal{M}_{\m{x}}^\kappa f:= \,\partial_{...
In this paper we consider three different methods for generating monogenic functions. The first one...
In this paper, we study the Bargmann-Radon transform and a class of monogenic functions called axial...
In this paper we consider three different methods for generating monogenic functions. The first on...
In this paper we extend our recent work on axial monogenic functions in R(m+1) to functions which ar...
In this chapter an introduction is given to Clifford analysis and the underlying Clifford algebras. ...
AbstractIn this paper we extend our recent work on axial monogenic functions in Rm+1 to functions wh...
Abstract. In relation to the solution of the Vekua system for axial type monogenic functions, genera...
In this paper we prove an integral representation formula for the inverse Fueter mapping theorem for...
In this paper we consider the solutions of the equation , where is the so called modifier Dirac oper...
This paper deals with axially and biaxial monogenic functions that are derived using two fundamental...
Clifford analysis may be regarded as a direct and elegant generalization to higher dimensions of the...
AbstractIn our previous paper (Rend. Circ. Mat. Palermo 6 (1984), 259–269, we proved a general Laure...
Solutions to the Dirac equation are obtained by considering functions of axial type.This indeed give...
In this paper we introduce the modified Dirac operators and , where is differentiable function, and ...
In this paper we introduce the modified Dirac operators $\mathcal{M}_{\m{x}}^\kappa f:= \,\partial_{...
In this paper we consider three different methods for generating monogenic functions. The first one...
In this paper, we study the Bargmann-Radon transform and a class of monogenic functions called axial...
In this paper we consider three different methods for generating monogenic functions. The first on...
In this paper we extend our recent work on axial monogenic functions in R(m+1) to functions which ar...
In this chapter an introduction is given to Clifford analysis and the underlying Clifford algebras. ...
AbstractIn this paper we extend our recent work on axial monogenic functions in Rm+1 to functions wh...
Abstract. In relation to the solution of the Vekua system for axial type monogenic functions, genera...
In this paper we prove an integral representation formula for the inverse Fueter mapping theorem for...
DOI