Winding and intersection of Brownian motions
Abstract
We study the set of points Dn,m around which two independent Brownian motions wind at least n (resp. m) times. We prove that its area is asymptotically equivalent, in Lp and almost surely, to (R2)4π2 n m, where is the intersection measure of the two trajectories. We also prove that the properly scaled Lebesgue measure carried by Dn,m converges almost surely weakly toward .
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