Abstract
In this paper, self-intersection properties of the Westwater process are investigated. As a result, we obtain that the Westwater process has an intersection local time\(\bar \alpha \)(x, [0,s] × [t, 1]) which is Holder continuous with respect tox, s, t)∈R3×[0,1/2]×[1/2,1], and the Hausdorff dimension of the double time set is 1/2, as for Brownian motion inR3.
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