Constrained Brownian motion: Fluctuations away from circular and parabolic barriers

Abstract

Motivated by the polynuclear growth model, we consider a Brownian bridge b(t) with b( T)=0 conditioned to stay above the semicircle cT(t)=2-t2. In the limit of large T, the fluctuation scale of b(t)-cT(t) is T1/3 and its time-correlation scale is T2/3. We prove that, in the sense of weak convergence of path measures, the conditioned Brownian bridge, when properly rescaled, converges to a stationary diffusion process with a drift explicitly given in terms of Airy functions. The dependence on the reference point t=τ T, τ∈(-1,1), is only through the second derivative of cT(t) at t=τ T. We also prove a corresponding result where instead of the semicircle the barrier is a parabola of height Tγ, γ>1/2. The fluctuation scale is then T(2-γ)/3. More general conditioning shapes are briefly discussed.

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