English

Extreme value distributions of noncolliding diffusion processes

Probability 2011-05-05 v2 Statistical Mechanics High Energy Physics - Theory Mathematical Physics math.MP Exactly Solvable and Integrable Systems

Abstract

Noncolliding diffusion processes reported in the present paper are NN-particle systems of diffusion processes in one-dimension, which are conditioned so that all particles start from the origin and never collide with each other in a finite time interval (0,T)(0, T), 0<T<0 < T < \infty. We consider four temporally inhomogeneous processes with duration TT, the noncolliding Brownian bridge, the noncolliding Brownian motion, the noncolliding three-dimensional Bessel bridge, and the noncolliding Brownian meander. Their particle distributions at each time t[0,T]t \in [0, T] are related to the eigenvalue distributions of random matrices in Gaussian ensembles and in some two-matrix models. Extreme values of paths in [0,T][0, T] are studied for these noncolliding diffusion processes and determinantal and pfaffian representations are given for the distribution functions. The entries of the determinants and pfaffians are expressed using special functions.

Keywords

Cite

@article{arxiv.1006.5779,
  title  = {Extreme value distributions of noncolliding diffusion processes},
  author = {Minami Izumi and Makoto Katori},
  journal= {arXiv preprint arXiv:1006.5779},
  year   = {2011}
}

Comments

v2: LaTeX2e, 21 pages, 2 figures, correction made

R2 v1 2026-06-21T15:42:46.098Z