2In this paper we give a complete description of the fixed-point set for regular Möbius transformations of a quaternionic variable; furthermore we apply these results for the proof of a rigidity property for commuting hyperbolic regular Möbius transformations.nonemixedGentili, G; Vlacci, FGentili, Graziano; Vlacci,
In this work, the solution to certain geometric constraint problems are studied. The possible rigid ...
Abstract. In this paper we establish two theorems in rigidity problems. In particular, suppose that ...
In this work we describe transformations of the 3-dimensional and the 4- dimensional Euclidean space...
In this paper we consider quaternionic Möbius transformations preserving the unit ball in the quater...
AbstractIn this paper we present a new characterization of Möbius transformations by use of hyperbol...
The regular fractional transformations of the extended quaternionic space have been recently introdu...
In this paper, we prove an analog of Cartan’s theorem, saying that the chain-preserving transformati...
AbstractWe give some new invariant characteristic properties of Möbius transformations by means of t...
AbstractWe present a new characterization of Möbius transformations by using two classes of hyperbol...
AbstractThe purpose of this paper is to give a new characterization of Möbius transformations from t...
Let F_1(n,m) be the PSp(n, 1)-configuration space of ordered m-tuple of pairwise distinct points in ...
We prove a Milnor–Wood inequality for representations of the fundamental group of a compact complex ...
Dans une première partie de cette thèse, nous donnons des minorations universelles ne dépendant que ...
In this paper, I have provided a brief introduction on Möbius transformation and explored some basic...
A hypersurface without umbilics in the (n + 1)-dimensional Euclidean space f: M-n -> Rn+1 is know...
In this work, the solution to certain geometric constraint problems are studied. The possible rigid ...
Abstract. In this paper we establish two theorems in rigidity problems. In particular, suppose that ...
In this work we describe transformations of the 3-dimensional and the 4- dimensional Euclidean space...
In this paper we consider quaternionic Möbius transformations preserving the unit ball in the quater...
AbstractIn this paper we present a new characterization of Möbius transformations by use of hyperbol...
The regular fractional transformations of the extended quaternionic space have been recently introdu...
In this paper, we prove an analog of Cartan’s theorem, saying that the chain-preserving transformati...
AbstractWe give some new invariant characteristic properties of Möbius transformations by means of t...
AbstractWe present a new characterization of Möbius transformations by using two classes of hyperbol...
AbstractThe purpose of this paper is to give a new characterization of Möbius transformations from t...
Let F_1(n,m) be the PSp(n, 1)-configuration space of ordered m-tuple of pairwise distinct points in ...
We prove a Milnor–Wood inequality for representations of the fundamental group of a compact complex ...
Dans une première partie de cette thèse, nous donnons des minorations universelles ne dépendant que ...
In this paper, I have provided a brief introduction on Möbius transformation and explored some basic...
A hypersurface without umbilics in the (n + 1)-dimensional Euclidean space f: M-n -> Rn+1 is know...
In this work, the solution to certain geometric constraint problems are studied. The possible rigid ...
Abstract. In this paper we establish two theorems in rigidity problems. In particular, suppose that ...
In this work we describe transformations of the 3-dimensional and the 4- dimensional Euclidean space...