Yuta Koike
Published 2013-05-06, updated 2013-07-03Version 2
We consider two continuous It\^o semimartingales observed with noise and sampled at stopping times in a nonsynchronous manner. In this article we establish a central limit theorem for the pre-averaged Hayashi-Yoshida estimator of their integrated covariance in a general endogenous time setting. In particular, we show that the time endogeneity has no impact on the asymptotic distribution of the pre-averaged Hayashi-Yoshida estimator, which contrasts the case for the realized volatility in a pure diffusion setting. We also establish a central limit theorem for the modulated realized covariance, which is another pre-averaging based integrated covariance estimator, and demonstrate the above property seems to be a special feature of the pre-averaging technique.
Comments: 39 pages, 2 figures, 7 tables. arXiv admin note: text overlap with arXiv:1302.4887
Central limit theorem of nonparametric estimate of spectral density functions of sample covariance matrices
A central limit theorem in the $β$-model for undirected random graphs with a diverging number of vertices
Time endogeneity and an optimal weight function in pre-averaging covariance estimation
![QR code for arXiv:1305.1229 [math.ST]](http://oss.arxitics.com/images/favicon.svg)