Dirichlet problem associated with Dunkl Laplacian on W-invariant open sets
Abstract
Combining probabilistic and analytic tools from potential theory, we investigate Dirichlet problems associated with the Dunkl Laplacian k. We establish, under some conditions on the open set D⊂d, the existence of a unique continuous function h in the closure of D, twice differentiable in D, such that kh=0 in\;Dand h=fon\; ∂ D. We also give a probabilistic formula characterizing the solution h. The function f is assumed to be continuous on the Euclidean boundary ∂ D of D.
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