On quadratic variations for the fractional-white wave equation

IF 0.4 Q4 STATISTICS & PROBABILITY Theory of Probability and Mathematical Statistics Pub Date : 2021-11-26 DOI:10.1090/tpms/1192
Radomyra Shevchenko
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Abstract

This paper studies the behaviour of quadratic variations of a stochastic wave equation driven by a noise that is white in space and fractional in time. Complementing the analysis of quadratic variations in the space component carried out in [Correlation structure, quadratic variations and parameter estimation for the solution to the wave equation with fractional noise, Electron. J. Stat. 12 (2018), no. 2, 3639–3672] and [Generalized k k -variations and Hurst parameter estimation for the fractional wave equation via Malliavin calculus, J. Statist. Plann. Inference 207 (2020), 155–180], it focuses on the time component of the solution process. For different values of the Hurst parameter a central and a noncentral limit theorems are proved, allowing to construct parameter estimators and compare them to the findings in the space-dependent case. Finally, rectangular quadratic variations in the white noise case are studied and a central limit theorem is demonstrated.
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分数型白波方程的二次变分
本文研究了一个随机波动方程的二次变分行为,该方程由空间上为白色、时间上为分数的噪声驱动。补充了[具有分数噪声的波动方程解的相关结构、二次方差和参数估计,Electron.J.Stat.12(2018),no.2,3639–3672]和[通过Malliavin微积分对分数波动方程的广义k k-方差和Hurst参数估计,J。Statist。Plann。推论207(2020),155–180],它关注解决方案过程的时间成分。对于Hurst参数的不同值,证明了一个中心极限定理和一个非中心极限定理,允许构造参数估计量,并将其与空间相关情况下的结果进行比较。最后,研究了白噪声情况下的矩形二次变分,并证明了一个中心极限定理。
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来源期刊
CiteScore
1.30
自引率
0.00%
发文量
22
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