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Abstract: In this paper we investigate fast particles in the range and support of super-Brownian motion in the historical setting. In this setting each particle of superBrownian motion alive at time t is represented by a path w : [0; t] ! R and the state of historical super-Brownian motion is a measure on the set of paths. Typical particles have Brownian paths, however in the uncountable collection of particles in the range of a super-Brownian motion there are some which at exceptional times... (Update)
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BibTeX entry: (Update)
@misc{ rters-how,
author = "Peter Mörters",
title = "How fast are the particles of super-Brownian motion?",
url = "citeseer.ist.psu.edu/757313.html" }
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[Article contains additional citations not shown here]
Documents on the same site (http://people.bath.ac.uk/maspm/#publications): More
Tangent Measure Distributions of Fractal Measures - Mörters, Preiss (Correct)
Thick Points of Super-Brownian Motion - Blath, Mörters (Correct)
Fractal Geometry - From Self-Similarity to Brownian Motion - Mörters (Correct)
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