ON THE DISCRETENESS AND CONVERGENCE IN n-DIMENSIONAL MÖBIUS GROUPS

FANG AINONG; NAI BING

doi:10.1112/S0024610700008784

Abstract

Throughout this paper, we adopt the same notations as in [1, 6, 8] such as the Möbius group M(ℝn), the Clifford algebra Cn−1, the Clifford matrix group SL(2, Γn), the Clifford norm of

formula here

and the Clifford metric of SL(2, Γn) or of the Möbius group M(ℝn)

formula here

where [mid ]·[mid ] is the norm of a Clifford number and

formula here

represents fi ∈ M(ℝn), i = 1, 2, and so on. In addition, we adopt some notions in [6, 12]: the elementary group, the uniformly bounded torsion, and so on. For example, the definition of the uniformly bounded torsion is as follows.

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Article contents

ON THE DISCRETENESS AND CONVERGENCE IN n-DIMENSIONAL MÖBIUS GROUPS

Abstract

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ON THE DISCRETENESS AND CONVERGENCE IN n-DIMENSIONAL MÖBIUS GROUPS

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