Add to ORKGsummary:Since 1970’s B. Fuglede and others have been studying finely holomorhic functions, i.e., ‘holomorphic’ functions defined on the so-called fine domains which are not necessarily open in the usual sense. This note is a survey of finely monogenic functions which were introduced in (Lávička, R., A generalisation of monogenic functions to fine domains, preprint.) like a higher dimensional analogue of finely holomorphic functions
This paper is meant to serve as an exposition on the theorem proved by Richard Aron, V.I. Gurariy an...
AbstractIn this paper is extended the original theorem by Fueter–Sce (assigning an R0,m-valued monog...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
summary:Since 1970’s B. Fuglede and others have been studying finely holomorhic functions, i.e., ‘ho...
Conformal mappings of plane domains are realized by holomorphic functions with non vanishing derivat...
In this paper we consider three different methods for generating monogenic functions. The first one...
Fueter's theorem discloses a remarkable connection existing between holomorphic functions and monoge...
AbstractIn Lávička [A remark on fine differentiability, Adv. Appl. Clifford Algebras 17 (2007) 549–5...
Subject classication 30G35,41A10 Conformal mappings of plane domains are realized by holomorphic fun...
In this paper we consider three different methods for generating monogenic functions. The first on...
Monogenic functions are basic to Clifford analysis. On Euclidean space they are defined as smooth fu...
summary:The paper extends the theory of residues on monogenic forms on domains in $\bbfR^n$ (monogen...
It is shown that certain classes of special monogenic functions cannot be repre-sented by the basic ...
Abstract. A modified Cauchy integral formula is used to show that each monogenic function f defined ...
We show that fine domains in ℂ with the property that they are Euclidean Fs and Gd, are in fact fine...
This paper is meant to serve as an exposition on the theorem proved by Richard Aron, V.I. Gurariy an...
AbstractIn this paper is extended the original theorem by Fueter–Sce (assigning an R0,m-valued monog...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...
summary:Since 1970’s B. Fuglede and others have been studying finely holomorhic functions, i.e., ‘ho...
Conformal mappings of plane domains are realized by holomorphic functions with non vanishing derivat...
In this paper we consider three different methods for generating monogenic functions. The first one...
Fueter's theorem discloses a remarkable connection existing between holomorphic functions and monoge...
AbstractIn Lávička [A remark on fine differentiability, Adv. Appl. Clifford Algebras 17 (2007) 549–5...
Subject classication 30G35,41A10 Conformal mappings of plane domains are realized by holomorphic fun...
In this paper we consider three different methods for generating monogenic functions. The first on...
Monogenic functions are basic to Clifford analysis. On Euclidean space they are defined as smooth fu...
summary:The paper extends the theory of residues on monogenic forms on domains in $\bbfR^n$ (monogen...
It is shown that certain classes of special monogenic functions cannot be repre-sented by the basic ...
Abstract. A modified Cauchy integral formula is used to show that each monogenic function f defined ...
We show that fine domains in ℂ with the property that they are Euclidean Fs and Gd, are in fact fine...
This paper is meant to serve as an exposition on the theorem proved by Richard Aron, V.I. Gurariy an...
AbstractIn this paper is extended the original theorem by Fueter–Sce (assigning an R0,m-valued monog...
Abstract. In this paper we offer a new definition of monogenicity for functions defined on R^{n+1} w...