The cauchy transform for the hodge/de rham system and some of its properties


Abstract:

We study the analogue of the Cauchy transform for the theory of solutions of the Hodge/de Rham system in the case of a rectifiable surface of integration which additionally satisfies an Ahlfors/David regularity condition and we prove the Cauchy integral formula, the Plemelj/Privalov theorem and the Sokhotski/Plemelj theorem for it, as well as the necessary and sufficient condition for the possibility to extend a given k-form from such a surface to a harmonic k-form in the domain. A formula for the square of the singular Cauchy transform is given. The proofs of all these facts are based on a close relation between algebra-valued null-solutions of the Dirac operator in the Euclidean space and hyperholomorphic functions of Clifford analysis. © 2007, Heldermann Verlag. All rights reserved.

Año de publicación:

2007

Keywords:

  • Hodge/de Rham system
  • Cauchy transform
  • differential forms
  • Clifford analysis

Fuente:

scopusscopus

Tipo de documento:

Article

Estado:

Acceso restringido

Áreas de conocimiento:

  • Modelo matemático
  • Optimización matemática

Áreas temáticas: