Embedding of Walsh Brownian Motion
Abstract
Let (Z,) be a Walsh Brownian motion with spinning measure . Suppose μ is a probability measure on Rn. We characterize all the such that μ is a stopping distribution of (Z,). If we further restrict the solution to be integrable, we show that there would be only one choice of . We also generalize Vallois' embedding, and prove that it minimizes the expectation E[(LZτ)] among all the admissible solutions τ, where is a strictly convex function and (LtZ)t ≥ 0 is the local time of the Walsh Brownian motion at the origin.
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