Title: Harmonic, Monogenic and Hypermonogenic Functions on Some Conformally Flat Manifolds in $R^n$ arising from Special Arithmetic Groups of the Vahlen Group
Authors: Krausshar, Rolf S├Âren
Qiao, Yuying
Ryan, John
Issue Date: 2005
Publisher: American Mathematical Society
Host Document: Contemporary Mathematics vol:370 pages:159-173
Conference: 3rd Prairie Analysis Seminar location:Manhattan date:17-18 Oct 2003
Abstract: This paper focuses on the development of harmonic and Clifford analysis techniques in the context of some conformally flat manifolds that arise from factoring out a simply-connected domain from $R^n$ by special arithmetic subgroups of the conformal group. Our discussion encompasses in particular the Hopf manifold $S^1 \times S^{n-1}$, conformally flat cylinders and tori and some conformally flat manifolds of genus $g \ge 2$, such as $k$-handled tori and polycylinders. This paper provides a continuation as well as an extension of our previous two papers \cite{KraRyan1,KraRyan2}. In particular, we introduce a Cauchy integral formula for hypermonogenic functions on cylinders, tori and on half of the Hopf manifold. We further develop generalizations of the Mittag-Leffler theorem and the Laurent expansion theorem for cylindrical and toroidal monogenic functions. The study of Hardy space decompositions on the Hopf manifold is also continued. Kerzman-Stein operators are introduced. Explicit formulas for the Szeg\"o kernel, the Bergman kernel and the Poisson kernel of half the Hopf manifold are given.
ISBN: 0-8218-3610-2
ISSN: 0271-4132
Publication status: published
KU Leuven publication type: IC
Appears in Collections:Analysis Section

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