CONVERGENCE OF GAUSSIAN QUASI-LIKELIHOOD RANDOM FIELDS FOR ERGODIC LEVY DRIVEN SDE OBSERVED AT HIGH FREQUENCY
成果类型:
Article
署名作者:
Masuda, Hiroki
署名单位:
Kyushu University
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/13-AOS1121
发表日期:
2013
页码:
1593-1641
关键词:
ratio random fields
fishers information
Weak Convergence
estimators
DIFFUSIONS
inequalities
criteria
moments
models
bounds
摘要:
This paper investigates the Gaussian quasi-likelihood estimation of an exponentially ergodic multidimensional Markov process, which is expressed as a solution to a Levy driven stochastic differential equation whose coefficients are known except for the finite-dimensional parameters to be estimated, where the diffusion coefficient may be degenerate or even null. We suppose that the process is discretely observed under the rapidly increasing experimental design with step size h(n). By means of the polynomial-type large deviation inequality, convergence of the corresponding statistical random fields is derived in a mighty mode, which especially leads to the asymptotic normality at rate root nh(n) for all the target parameters, and also to the convergence of their moments. As our Gaussian quasi-likelihood solely looks at the local-mean and local-covariance structures, efficiency loss would be large in some instances. Nevertheless, it has the practically important advantages: first, the computation of estimates does not require any fine tuning, and hence it is straightforward; second, the estimation procedure can be adopted without full specification of the Levy measure.
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