Brownian motion in a critical fluid; A critical long time tail

## Abstract We study a model of __n__ one‐dimensional, nonintersecting Brownian motions with two prescribed starting points at time __t__ = 0 and two prescribed ending points at time __t__ = 1 in a critical regime where the paths fill two tangent ellipses in the time‐space plane as __n__ → ∞. The l

To investigate the approach to the asymptotic long time behaviour in a d-dimensional Lorentz gas, we have calculated the ~7(t -2-dj2) correction to the long time tail t -1-d/2 in the velocity autocorrelation function, using low density kinetic theory. The results are compared with existing computer

## Abstract If __R__~t~ is the position of the rightmost particle at time __t__ in a one dimensional branching brownian motion, whore α is the inverse of the mean life time and __m__ is the mean of the reproduction law. If __Z__~t~ denotes the random point measure of particles living at time __t_

THE LINEARIZED EQUATIONS OF MOTION \_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_ 3 MOBILITIES \_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_.\_\_\_\_\_.\_.\_\_\_\_\_.\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_\_ 5 A\_ Lowest order multipole; point force approximation \_\_\_\_\_\_\_\_.\