On homogeneous polynomial solutions of generalized Moisil-Théodoresco systems in Euclidean space

Richard Delanghe Richard.Delanghe@UGent.be

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https://doi.org/10.4067/S0719-06462010000200010

Abstract

Let for s âˆˆ {0, 1, ..., m + 1} (m â‰¥ 2), be the space of s-vectors in the Clifford algebra IR_0,m+1 constructed over the quadratic vector space IR^0,m+1 and let r, p, q, âˆˆ IN be such that 0 â‰¤ r â‰¤ m + 1, p < q and r + 2q â‰¤ m + 1. The associated linear system of first order partial differential equations derived from the equation âˆ‚_xW = 0 where W is -valued and âˆ‚_x is the Dirac operator in IR^m+1, is called a generalized Moisil-Théodoresco system of type (r, p, q) in IR^m+1. For k âˆˆ N, k â‰¥ 1, , denotes the space of -valued homogeneous polynomials W_k of degree k in IR^m+1 satisfying âˆ‚_xW_k = 0. A characterization of W_k âˆˆ is given in terms of a harmonic potential H_k₊₁ belonging to a subclass of -valued solid harmonics of degree (k + 1) in IR^m+1. Furthermore, it is proved that each W_k âˆˆ admits a primitive W_k+1 âˆˆ . Special attention is paid to the lower dimensional cases IR³ and IR⁴. In particular, a method is developed for constructing bases for the spaces , r being even.

Keywords

Clifford analysis , Moisil-Théodoresco systems , conjugate harmonic funtions , harmonic potentials , polynomial bases

Richard Delanghe Department of Mathematical Analysis, Clifford Research Group, Ghent University, Galglaan 2, B-9000 Ghent, Belgium.

Pages: 145–167
Date Published: 2010-06-01
Vol. 12 No. 2 (2010): CUBO, A Mathematical Journal

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Published

2010-06-01

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R. Delanghe, “On homogeneous polynomial solutions of generalized Moisil-Théodoresco systems in Euclidean space”, CUBO, vol. 12, no. 2, pp. 145–167, Jun. 2010.

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