摘要
该文主要讨论的是滑线性过程X_k=sum from i=-∞to∞a_(i+k)ε_i,其中{ε_i;-∞<i<∞}是均值为零,方差有限的双测无穷同分布■-混合或负相伴随机变量序列,{a_i;~∞<i<∞}为绝对可和的实数序列.令S_n=sum from k=1 to n X_k,n≥1,作者证明了,对于1≤p<2以及r>p,若E|ε_1|~r<∞■ε^(2(r-p)/(2-p))sum from n=1 to∞n^(r/p-2)P{|S_n|≥εn^(1/p)}=p/(r-p)E|Z|^(2(r-p)/(2-p)),其中Z是服从均值为零,方差为τ~2=σ~2·(sum from i=-∞to∞.a_i)~2的正态分布.
In this paper, the author discusses moving-average process Xk=^∞∑i=-∞ai+kεi, where {εi;-∞〉i〈∞} is a doubly infinite sequence of identically distributed φ-mixing or negatively associated random variables with mean zeros and finite variances, {ai;-∞〉i〈∞} is an absolutely summable sequence of real numbers. Set Sn=^n∑k=1Xk,n≥1, the author proves that, if E|ε1|^r〈∞, then, for 1 ≤ p 〈 2 and τ 〉 p limε↓0 ε^2(τ-p)/(2-p)^∞∑n=1 n^τ/-2P{|Sn|}≥εn^1/p}=p/r-pE|Z|^)(τ-p)/(2-p).where Z has a normal distribution with mean 0 and variance τ^2=σ^2,(^∞∑i=-∞,ai)^2.
出处
《数学物理学报(A辑)》
CSCD
北大核心
2006年第5期675-687,共13页
Acta Mathematica Scientia
基金
浙江省教育厅2006年度科研基金(20060122)资助
