Introducing a quaternionic structure on Euclidean space, the fundaments for quaternionic and symplectic Clifford analysis are studied in detail from the viewpoint of invariance for the symplectic group action
The principal group of a Klein geometry has canonical left action on the homoge-neous space of the g...
The paper develops, within a new representation of Clifford algebras in terms of tensor products of ...
Standard (Arnold\u2013Liouville) integrable systems are intimately related to complex rotations. One...
Quaternionic Clifford analysis is a recent new branch of Clifford analysis, a higher dimensional fun...
Quaternions are a type of hypercomplex numbers. Unit quaternions, which describe rotations, were cal...
The definition and structure of hyperk\ue4hler structure preserving transformations (invariance grou...
The regularity of a quaternionic function is reinterpreted through a new canonical decomposition of ...
In this paper we introduce the quaternionic Witt basis in H-m = H circle times(R) R-m, m = 4n. We th...
In this thesis, we study Quaternionic Analysis, which is the most natural and close generalization o...
In this study, we focused on n-dimensional quaternionic space Hn. To create the module structure, fi...
Quaternionic and Clifford analysis are an extension of complex analysis into higher dimensions. The ...
This bachelor thesis focuses on Clifford algebras and their subalgebras, quaternions and geometric a...
AbstractWe develop quaternionic analysis using as a guiding principle representation theory of vario...
In the present article we study basic aspects of the symplectic version of Clifford analysis associa...
The definition and structure of hyperkähler structure preserving transformations (invariance group) ...
The principal group of a Klein geometry has canonical left action on the homoge-neous space of the g...
The paper develops, within a new representation of Clifford algebras in terms of tensor products of ...
Standard (Arnold\u2013Liouville) integrable systems are intimately related to complex rotations. One...
Quaternionic Clifford analysis is a recent new branch of Clifford analysis, a higher dimensional fun...
Quaternions are a type of hypercomplex numbers. Unit quaternions, which describe rotations, were cal...
The definition and structure of hyperk\ue4hler structure preserving transformations (invariance grou...
The regularity of a quaternionic function is reinterpreted through a new canonical decomposition of ...
In this paper we introduce the quaternionic Witt basis in H-m = H circle times(R) R-m, m = 4n. We th...
In this thesis, we study Quaternionic Analysis, which is the most natural and close generalization o...
In this study, we focused on n-dimensional quaternionic space Hn. To create the module structure, fi...
Quaternionic and Clifford analysis are an extension of complex analysis into higher dimensions. The ...
This bachelor thesis focuses on Clifford algebras and their subalgebras, quaternions and geometric a...
AbstractWe develop quaternionic analysis using as a guiding principle representation theory of vario...
In the present article we study basic aspects of the symplectic version of Clifford analysis associa...
The definition and structure of hyperkähler structure preserving transformations (invariance group) ...
The principal group of a Klein geometry has canonical left action on the homoge-neous space of the g...
The paper develops, within a new representation of Clifford algebras in terms of tensor products of ...
Standard (Arnold\u2013Liouville) integrable systems are intimately related to complex rotations. One...
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