The Spherical π-Operator
Abstract
In this article, we define the spherical π-operator over domains in the (n-1)-D unit sphere Sn of Rn and develop new and analogous results on the operator it self and its mapping properties. We introduce the spherical Dirac operator α as an α- shift of of omega, where omega is the negative of the wedge (or Grassmann) product of ω with that of the Dirac operator Dω. A gegenbauer polynomial is used as a Cauchy kernel for the spherical Dirac operator alpha.
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