Monogenic functions are basic to Clifford analysis. On Euclidean space they are defined as smooth functions with values in the corresponding Clifford algebra satisfying a certain system of first order differential equations, usually referred to as the Di
A basic framework is derived for the development of a higher-dimensional discrete function theory in...
A basic framework is derived for the development of a higher-dimensional discrete function theory in...
. A study is made of a functional calculus for a system of bounded linear operators acting on a Bana...
Monogenic functions are basic to Clifford analysis. On Euclidean space they are defined as smooth fu...
A differential and integral criterion for monogenicity is presented within the framework of Clifford...
A differential and integral criterion for monogenicity is presented within the framework of Clifford...
A differential and integral criterion for monogenicity is presented within the framework of Clifford...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
In this chapter an introduction is given to Clifford analysis and the underlying Clifford algebras. ...
This paper deals with axially and biaxial monogenic functionsthat are derived using two fundamental ...
A basic framework is derived for the development of a higher-dimensional discrete function theory in...
A basic framework is derived for the development of a higher-dimensional discrete function theory in...
A basic framework is derived for the development of a higher-dimensional discrete function theory in...
. A study is made of a functional calculus for a system of bounded linear operators acting on a Bana...
Monogenic functions are basic to Clifford analysis. On Euclidean space they are defined as smooth fu...
A differential and integral criterion for monogenicity is presented within the framework of Clifford...
A differential and integral criterion for monogenicity is presented within the framework of Clifford...
A differential and integral criterion for monogenicity is presented within the framework of Clifford...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
In this chapter an introduction is given to Clifford analysis and the underlying Clifford algebras. ...
This paper deals with axially and biaxial monogenic functionsthat are derived using two fundamental ...
A basic framework is derived for the development of a higher-dimensional discrete function theory in...
A basic framework is derived for the development of a higher-dimensional discrete function theory in...
A basic framework is derived for the development of a higher-dimensional discrete function theory in...
. A study is made of a functional calculus for a system of bounded linear operators acting on a Bana...
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