The Spherical $\pi$-Operator

Dejenie A. Lakew

The Spherical $\pi$-Operator

Classical Analysis and ODEs 2008-11-21 v1

Authors: Dejenie A. Lakew

Abstract

In this article, we define the spherical $\pi$ -operator over domains in the $(n-1)$ -D unit sphere $S^n$ of $R^n$ and develop new and analogous results on the operator it self and its mapping properties. We introduce the spherical Dirac operator $\Gamma_\alpha$ as an $\alpha$ - shift of of $\Gamma_omega$ , where $\Gamma_omega$ is the negative of the wedge (or Grassmann) product of $\omega$ with that of the Dirac operator $D_\omega$ . A gegenbauer polynomial is used as a Cauchy kernel for the spherical Dirac operator $\Gamma_alpha$ .

Keywords

dirac operators numerical range

Cite

@article{arxiv.0811.3257,
  title  = {The Spherical $\pi$-Operator},
  author = {Dejenie A. Lakew},
  journal= {arXiv preprint arXiv:0811.3257},
  year   = {2008}
}

Comments

This is a 21 page manuscript on the spherical $\pi$-operator defined over domains in the standard $(n-1)$-D unit sphere $S^(n-1)$ of $R^n$

The Spherical $\pi$-Operator

Abstract

Keywords

Cite

Comments

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