We consider an ensemble of n nonintersecting Brownian particles on the unit circle with diffusion parameter n−1/2, which are conditioned to begin at the same point and to return to that point after time T, but otherwise not to intersect. There is a critical value of T which separates the subcritical case, in which it is vanishingly unlikely that the particles wrap around the circle, and the supercritical case, in which particles may wrap around the circle. In this paper we show that in the subcritical and critical cases the probability that the total winding number is zero is almost surely 1 as n → ∞, and in the supercritical case that the distribution of the total winding number converges to the discrete normal distribution. We also give a...
Abstract. The Brownian motion model introduced by Dyson [7] for the eigenvalues of unitary random ma...
Abstract. We study the large N asymptotics of the Brownian motions on the orthogonal, uni-tary and s...
© Institute of Mathematical Statistics, 2019. We consider the N-particle noncolliding Bernoulli rand...
We consider an ensemble of n nonintersecting Brownian particles on the unit circle with diffusion pa...
Claeys T, Neuschel T, Venker M. Critical Behavior of Non-intersecting Brownian Motions. COMMUNICATIO...
We study n non-intersecting Brownian motions corresponding to initial configurations which have a va...
Consider n nonintersecting Brownian particles on R (Dyson Brownian motions), all starting from the o...
Consider N = n1 +n2 + · · ·+np non-intersecting Brownian motions on the real line, starting from th...
We consider N non-intersecting Brownian bridges conditioned to stay below a fixed threshold. We cons...
AbstractWe consider n one-dimensional Brownian motions, such that n/2 Brownian motions start at time...
Motivated by the polynuclear growth model, we consider a Brownian bridge b(t) with b(±T) = 0 condit...
We consider the process of $n$ Brownian excursions conditioned to be nonintersecting. We sh...
We show that the squared maximal height of the top path amongNnon-intersecting Brownian bridges star...
We consider n one-dimensional Brownian motions, such that n/2 Brownian motions start at time t=0 in ...
Abstract. Consider a time-varying collection of n points on the positive real axis, modeled as Expon...
Abstract. The Brownian motion model introduced by Dyson [7] for the eigenvalues of unitary random ma...
Abstract. We study the large N asymptotics of the Brownian motions on the orthogonal, uni-tary and s...
© Institute of Mathematical Statistics, 2019. We consider the N-particle noncolliding Bernoulli rand...
We consider an ensemble of n nonintersecting Brownian particles on the unit circle with diffusion pa...
Claeys T, Neuschel T, Venker M. Critical Behavior of Non-intersecting Brownian Motions. COMMUNICATIO...
We study n non-intersecting Brownian motions corresponding to initial configurations which have a va...
Consider n nonintersecting Brownian particles on R (Dyson Brownian motions), all starting from the o...
Consider N = n1 +n2 + · · ·+np non-intersecting Brownian motions on the real line, starting from th...
We consider N non-intersecting Brownian bridges conditioned to stay below a fixed threshold. We cons...
AbstractWe consider n one-dimensional Brownian motions, such that n/2 Brownian motions start at time...
Motivated by the polynuclear growth model, we consider a Brownian bridge b(t) with b(±T) = 0 condit...
We consider the process of $n$ Brownian excursions conditioned to be nonintersecting. We sh...
We show that the squared maximal height of the top path amongNnon-intersecting Brownian bridges star...
We consider n one-dimensional Brownian motions, such that n/2 Brownian motions start at time t=0 in ...
Abstract. Consider a time-varying collection of n points on the positive real axis, modeled as Expon...
Abstract. The Brownian motion model introduced by Dyson [7] for the eigenvalues of unitary random ma...
Abstract. We study the large N asymptotics of the Brownian motions on the orthogonal, uni-tary and s...
© Institute of Mathematical Statistics, 2019. We consider the N-particle noncolliding Bernoulli rand...