Projecting on Polynomial Dirac Spinors

Description:

In this paper, the authors adapt Axler and Ramey's method of constructing the harmonic part of a homogeneous polynomial to the Fischer decomposition associated to Dirac operators acting on polynomial spinors.

Creator(s): Anghel, Nicolae
Creation Date: June 2006
Partner(s):
UNT College of Arts and Sciences
Collection(s):
UNT Scholarly Works
Usage:
Total Uses: 52
Past 30 days: 1
Yesterday: 0
Creator (Author):
Anghel, Nicolae

University of North Texas

Date(s):
  • Creation: June 2006
Description:

In this paper, the authors adapt Axler and Ramey's method of constructing the harmonic part of a homogeneous polynomial to the Fischer decomposition associated to Dirac operators acting on polynomial spinors.

Degree:
Department: Mathematics
Note:

Abstract: In this note we adapt Axler and Ramey's method of constructing the harmonic part of a homogeneous polynomial to the Fischer decomposition associated to Dirac operators acting on polynomial spinors. The result yields a constructive solution to a Dirichlet-like problem with polynomial boundary data.

Physical Description:

6 p.

Language(s):
Subject(s):
Keyword(s): homogeneous polynomial | Dirac operators | polynomial spinors
Source: Eighth International Conference on Geometry, Integrability and Quantization, 2008, Varna, Bulgaria
Partner:
UNT College of Arts and Sciences
Collection:
UNT Scholarly Works
Identifier:
  • ISBN: 978-954-8495-37-0
  • ARK: ark:/67531/metadc161699
Resource Type: Paper
Format: Text
Rights:
Access: Public