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Super-Brownian motion with reflecting historical paths
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Super-Brownian motion with reflecting historical paths
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We consider super-Brownian motion whose historical paths reflect from each other, unlike those of the usual historical super-Brownian motion. We prove tightness for the family of distributions corresponding to a sequence of discrete approximations but we leave the problem of uniqueness of the limit open. We prove a few results about path behavior for processes under any limit distribution. In particular, we show that for any $\gamma>0$, a "typical" increment of a reflecting historical path over a small time interval $\Delta t$ is not greater than $(\Delta t)^{3/4 - \gamma}$.
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