arXiv:0907.5468 Abstract | arXiv Analytics

arXiv:0907.5468 [math.PR]Abstract References Reviews Resources

Self-interacting diffusions IV: Rate of convergence

Published 2009-07-31Version 1

Self-interacting diffusions are processes living on a compact Riemannian manifold defined by a stochastic differential equation with a drift term depending on the past empirical measure of the process. The asymptotics of this measure is governed by a deterministic dynamical system and under certain conditions it converges almost surely towards a deterministic measure (see Bena\"im, Ledoux, Raimond (2002) and Bena\"im, Raimond (2005)). We are interested here in the rate of this convergence. A central limit theorem is proved. In particular, this shows that greater is the interaction repelling faster is the convergence.

Categories: math.PR

Keywords: self-interacting diffusions, convergence, central limit theorem, stochastic differential equation, compact riemannian manifold

Related articles: Most relevant | Search more

arXiv:1009.3406 [math.PR] (Published 2010-09-17)

The role of the central limit theorem in discovering sharp rates of convergence to equilibrium for the solution of the Kac equation

Emanuele Dolera, Eugenio Regazzini

arXiv:1212.1379 [math.PR] (Published 2012-12-06, updated 2013-06-09)

Optimal On-Line Selection of an Alternating Subsequence: A Central Limit Theorem

Alessandro Arlotto, J. Michael Steele

arXiv:math/0702481 [math.PR] (Published 2007-02-16, updated 2007-05-04)

Central Limit Theorem for a Class of Relativistic Diffusions

Jürgen Angst, Jacques Franchi