A characterization of conformal mappings in by R4 formal differentiability condition

Rolf Sören KRAUSSHAR; Helmuth Robert MALONEK

Bulletin de la Société Royale des Sciences de Liège

0037-9565 1783-5720

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Rolf Sören KRAUSSHAR & Helmuth Robert MALONEK

A characterization of conformal mappings in by R⁴ formal differentiability condition

(Volume 70 - Année 2001 — Numéro 1)

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Mots-clés : conformal mappings, Möbius transformations, quaterionic analysis, differentiability

Abstract

We show that conformal mappings in R⁴ can be characterized by a formal differentiability condition. The notion of differentiability described in this paper generalizes the classical concept of differentiability in the sense of putting the differential of a function into relation with variable differential forms of first order. This approach provides further an application of the use of those arbitrary orthonormal sets which are used in works of V Kravchenko, M. Shapiro and N Vasilevski on quaternionic analysis. However, it is crucial to consider variable orthonormal sets, so-called moving frames.

Om dit artikel te citeren:

Rolf Sören KRAUSSHAR & Helmuth Robert MALONEK, «A characterization of conformal mappings in by R⁴ formal differentiability condition», Bulletin de la Société Royale des Sciences de Liège [En ligne], Volume 70 - Année 2001, Numéro 1, 35 - 49 URL : https://popups.uliege.be/0037-9565/index.php?id=1398.

Over : Rolf Sören KRAUSSHAR

Vakgroep Wiskundige Analyse, Universiteit Gent, Galglaan 2, B-9000 Gent, Belgium, krauss@cage.rug.ac.be

Over : Helmuth Robert MALONEK

Departemento de Matemática, Universidade de Aveiro, Campus Universitário Santiago, P-3810-193 Aveiro, Portugal, hrmalon@mat.ua.pt

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