Diffusion approximation for slow motion in fully coupled averaging

被引:42
作者
Bakhtin, V
Kifer, Y
机构
[1] Belarusian State Univ, Dept Phys, Minsk 220050, BELARUS
[2] Hebrew Univ Jerusalem, Inst Math, IL-91904 Jerusalem, Israel
来源
PROBABILITY THEORY AND RELATED FIELDS | 2004年 / 129卷 / 02期
关键词
averaging; diffusion; limit theorems; stochastic differential equations;
D O I
10.1007/s00440-003-0326-7
中图分类号
O21 [概率论与数理统计]; C8 [统计学];
学科分类号
020208 ; 070103 ; 0714 ;
摘要
In systems which combine fast and slow motions it is usually impossible to study directly corresponding two scale equations and the averaging principle suggests to approximate the slow motion by averaging in fast variables. We consider the averaging setup when both fast and slow motions are diffusion processes depending on each other (fully coupled) and show that there exists a diffusion process which approximates the slow motion in the L-2 sense much better than the averaged motion prescribed by the averaging principle.
引用
收藏
页码:157 / 181
页数:25
相关论文
共 21 条
  • [1] [Anonymous], 2003, STOCH DYNAM
  • [2] [Anonymous], STOCHASTICS STOCHAST
  • [3] [Anonymous], 2003, STOCH STOCH REP
  • [4] [Anonymous], 1975, MEM AM MATH SOC
  • [5] Bakhtin VI, 1999, THEOR PROBAB APPL+, V44, P1
  • [6] APPROXIMATION THEOREMS FOR INDEPENDENT AND WEAKLY DEPENDENT RANDOM VECTORS
    BERKES, I
    PHILIPP, W
    [J]. ANNALS OF PROBABILITY, 1979, 7 (01) : 29 - 54
  • [7] Billingsley P., 1999, CONVERGENCE PROBABIL
  • [8] Dehling H, 2002, EMPIRICAL PROCESS TE
  • [9] Doukhan P., 1994, Mixing
  • [10] INVARIANCE-PRINCIPLES FOR SUMS OF BANACH-SPACE VALUED RANDOM ELEMENTS AND EMPIRICAL PROCESSES
    DUDLEY, RM
    PHILIPP, W
    [J]. ZEITSCHRIFT FUR WAHRSCHEINLICHKEITSTHEORIE UND VERWANDTE GEBIETE, 1983, 62 (04): : 509 - 552
123