The complement value problem for non-local operators
Abstract
Let D be a bounded Lipschitz domain of Rd. We consider the complement value problem \arrayl(+aαα/2+b·∇+c)u+f=0\ \ in\ D,\\ u=g\ \ on\ Dc. array. Under mild conditions, we show that there exists a unique bounded continuous weak solution. Moreover, we give an explicit probabilistic representation of the solution. The theory of semi-Dirichlet forms and heat kernel estimates play an important role in our approach.
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