Intersection of the traces of two independent walks in high dimensions
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If you have a question about this talk, please contact Perla Sousi.
We discuss deviations for the number of intersections of two
independent infinite-time ranges in dimensions five and more. This
settles a conjecture of van den Berg, Bolthausen and den Hollander.
Moreover, we obtain the scenario leading to this deviation. (joint work
with B.Schapira).
This talk is part of the Probability series.
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Tuesday 18 May 2021, 14:00-15:00