Analyticity of intersection exponents for planar Brownian motion

Abstract

We show that the intersection exponents for planar Brownian motions are analytic. More precisely, let B and B' be independent planar Brownian motions started from distinct points, and define the exponent (1, λ) by E[P[B[0,t] B'[0,t] = | B[0,t]]λ] ≈ t-(1, λ)/2, t ∞. Then the mapping λ (1, λ) is real analytic in (0,∞). The same result is proved for the exponents (k, λ) where k is a positive integer. In combination with the determination of (k, λ) for integer k 1 and real λ 1 in our previous papers, this gives the value of (k, λ) also for λ ∈ (0,1) and the disconnection exponents λ 0 (k, λ). In particular, it shows that λ 0 (2, λ) = 2/3 and concludes the proof of the following result that had been conjectured by Mandelbrot: the Hausdorff dimension of the outer boundary of B[0,1] is 4/3 almost surely.

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