Liouville distorted Brownian motion
Abstract: The Liouville Brownian motion was introduced in \cite{GRV} as a time changed process $B_{A_t{-1}}$ of a planar Brownian motion $(B_t){t \ge 0}$, where $(A_t){t \ge 0}$ is the positive continuous additive functional of $(B_t){t \ge 0}$ in the strict sense w.r.t. the Liouville measure. We first consider a distorted Brownian motion $(X_t){t\ge0}$ starting from all points in $\R2$ associated to a Dirichlet form $(\E, D(\E))$ (see \cite{ShTr14}). We show that the positive continuous additive functional $(F_t){t \ge 0}$ of $(X_t){t \ge 0}$ in the strict sense w.r.t. the Liouville distorted measure can be constructed.
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