Statistics of first-passage Brownian functionals
Abstract
We study the distribution of first-passage functionals , where is a Brownian motion (with or without drift) with diffusion constant , starting at , and is the first-passage time to the origin. In the driftless case, we compute exactly, for all , the probability density . This probability density has an essential singular tail as and a power-law tail as . The former is reproduced by the optimal fluctuation method (OFM), which also predicts the optimal paths of the conditioned process for small . For the case with a drift toward the origin, where no exact solution is known for general , the OFM predicts the distribution tails. For it predicts the same essential singular tail as in the driftless case. For it predicts a stretched exponential tail for all . In the limit of large P\'eclet number , where is the drift velocity, the OFM predicts a large-deviation scaling for all : , where is the mean value of . We compute the rate function analytically for all . For is analytic for all , but for it is non-analytic at , implying a dynamical phase transition. The order of this transition is for , while for the order of transition changes continuously with . Finally, we apply the OFM to the case of (drift away from the origin). We show that, when the process is conditioned on reaching the origin, the distribution of coincides with the distribution of for with the same .
Keywords
Cite
@article{arxiv.1911.06668,
title = {Statistics of first-passage Brownian functionals},
author = {Satya N. Majumdar and Baruch Meerson},
journal= {arXiv preprint arXiv:1911.06668},
year = {2021}
}
Comments
22 pages, 5 figures