AbstractThe aim of this paper is to characterize the dual and bidual of complex Clifford modules of holomorphic functions which are defined over domains in Cn + 1 and satisfy generalized Cauchy-Riemann equations. In one instance the generalized Cauchy-Riemann equation reduces to a holomorphic extension of Maxwell's equations in vacuo
The Clifford-Cauchy integral formula has proven to be a corner stone of the monogenic function theor...
This paper provides differential operators in dual quaternions and represents the regularity of dual...
Fundamentals of a function theory in co-dimension one for Clifford algebra valued functions over R^(...
AbstractThe aim of this paper is to characterize the dual and bidual of complex Clifford modules of ...
AbstractLet A be the Clifford algebra constructed over a quadratic n-dimensional real vector space w...
In the classical theory of several complex variables, holomorphic mappings are just n-tuples of holo...
In classical function theory, a function is holomorphic if and only if it is complex analytic. For h...
Fundamentals of a function theory in co-dimension one for Clifford algebra valued functions over R^n...
In this chapter an introduction is given to Clifford analysis and the underlying Clifford algebras. ...
AbstractA number of Runge approximation theorems are proved for complex Clifford algebra valued holo...
Fundamentals of a function theory in co-dimension one for Clifford algebra valued functions over ℝn+...
In this paper, using the algebraic structure of the space of circulant (2 × 2) matrix, we characteri...
Abstract. In classical function theory, a function is holomorphic if and only if it is complex analy...
In this paper a new holomorphic extension theorem is presented using Clifford analysis
The structure of a complex Clifford algebra is studied by direct sum decompositions into eigenspaces...
The Clifford-Cauchy integral formula has proven to be a corner stone of the monogenic function theor...
This paper provides differential operators in dual quaternions and represents the regularity of dual...
Fundamentals of a function theory in co-dimension one for Clifford algebra valued functions over R^(...
AbstractThe aim of this paper is to characterize the dual and bidual of complex Clifford modules of ...
AbstractLet A be the Clifford algebra constructed over a quadratic n-dimensional real vector space w...
In the classical theory of several complex variables, holomorphic mappings are just n-tuples of holo...
In classical function theory, a function is holomorphic if and only if it is complex analytic. For h...
Fundamentals of a function theory in co-dimension one for Clifford algebra valued functions over R^n...
In this chapter an introduction is given to Clifford analysis and the underlying Clifford algebras. ...
AbstractA number of Runge approximation theorems are proved for complex Clifford algebra valued holo...
Fundamentals of a function theory in co-dimension one for Clifford algebra valued functions over ℝn+...
In this paper, using the algebraic structure of the space of circulant (2 × 2) matrix, we characteri...
Abstract. In classical function theory, a function is holomorphic if and only if it is complex analy...
In this paper a new holomorphic extension theorem is presented using Clifford analysis
The structure of a complex Clifford algebra is studied by direct sum decompositions into eigenspaces...
The Clifford-Cauchy integral formula has proven to be a corner stone of the monogenic function theor...
This paper provides differential operators in dual quaternions and represents the regularity of dual...
Fundamentals of a function theory in co-dimension one for Clifford algebra valued functions over R^(...
DOI
Add to ORKG