Mixing “In the sense of Ibragimov.” Estimate for the rate of approach of a family of integral functionals of a solution of a differential equation with periodic coefficients to a family of wiener processes. Some applications. I

  • B. V. Bondarev
  • S. M. Kozyr'

Abstract

We prove that a bounded 1-periodic function of a solution of a time-homogeneous diffusion equation with 1-periodic coefficients forms a process that satisfies the condition of uniform strong mixing. We obtain an estimate for the rate of approach of a certain normalized integral functional of a solution of an ordinary time-homogeneous stochastic differential equation with 1-periodic coefficients to a family of Wiener processes in probability in the metric of space $C[0, T]$. As an example, we consider an ordinary differential equation perturbed by a rapidly oscillating centered process that is a 1-periodic function of a solution of a time-homogeneous stochastic differential equation with 1-periodic coefficients. We obtain an estimate for the rate of approach of a solution of this equation to a solution of the corresponding Itô stochastic equation.
Published
25.06.2010
How to Cite
BondarevB. V., and Kozyr’S. M. “Mixing ‘In the Sense of Ibragimov.’ Estimate for the Rate of Approach of a Family of Integral Functionals of a Solution of a Differential Equation With Periodic Coefficients to a Family of Wiener Processes. Some Applications. I”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 62, no. 6, June 2010, pp. 733–753, https://umj.imath.kiev.ua/index.php/umj/article/view/2905.
Section
Research articles