Clifford Analysis over Unbounded Domains

## Abstract The main theme of this paper is to construct Clifford analytic‐complete function systems in the generalized Bergman spaces: __B__^__p__^~Cl__n__~(Ω):=ker__D__(Ω)∩__L__^__p__^~Cl__n__~(Ω), and __B__^__p__,2^~Cl__n__~(Ω):=ker▵(Ω)∩__L__^__p__^~Cl__n__~(Ω). These systems are used to approxi

In this paper we study polynomial Dirac equation p(D)f = 0 including (D-k)f = 0 with complex parameter k and D k f = 0(k ≥ 1) as special cases over unbounded subdomains of R n+1 . Using the Clifford calculus, we obtain the integral representation theorems for solutions to the equations satisfying ce

We consider the initial-boundary value problems of the heat equation over unbounded domains in \(\mathbb{R}^{N}\), and study the movement of hot spots of the solution for bounded nonnegative initial data having compact support. 1994 Academic Press, Inc.

In this paper we develop a Cli!ord operator calculus over unbounded domains whose complement contains a non-empty open set by using add-on terms to the Cauchy kernel. Using the knowledge about the Poisson equation allows us to prove a direct decomposition of the space L O ( ), which will be applied