The complement value problem for a class of second order elliptic integro-differential operators

Abstract: We consider the complement value problem for a class of second order elliptic integro-differential operators. Let $D$ be a bounded Lipschitz domain of $\mathbb{R}^d$. Under mild conditions, we show that there exists a unique bounded continuous weak solution to the following equation $$ \left{\begin{array}{l}(\Delta+a^{\alpha}\Delta^{\alpha/2}+b\cdot\nabla+c+{\rm div} \hat{b})u+f=0\ \ {\rm in}\ D,\ u=g\ \ {\rm on}\ D^c. \end{array}\right.$$ Moreover, we give an explicit probabilistic representation of the solution. The recently developed stochastic calculus for Markov processes associated with semi-Dirichlet forms and heat kernel estimates play important roles in our approach.