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Efficient Estimation for Diffusions Sampled at High Frequency Over a Fixed Time Interval

Author

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  • Nina Munkholt Jakobsen

    (University of Copenhagen)

  • Michael Sørensen

    (University of Copenhagen and CREATES)

Abstract

Parametric estimation for diffusion processes is considered for high frequency observations over a fixed time interval. The processes solve stochastic differential equations with an unknown parameter in the diffusion coefficient. We find easily verified conditions on approximate martingale estimating functions under which estimators are consistent, rate optimal, and efficient under high frequency (in-fill) asymptotics. The asymptotic distributions of the estimators are shown to be normal variance-mixtures, where the mixing distribution generally depends on the full sample path of the diffusion process over the observation time interval. Utilising the concept of stable convergence, we also obtain the more easily applicable result that for a suitable data dependent normalisation, the estimators converge in distribution to a standard normal distribution. The theory is illustrated by a small simulation study comparing an efficient and a non-efficient estimating function.

Suggested Citation

  • Nina Munkholt Jakobsen & Michael Sørensen, 2015. "Efficient Estimation for Diffusions Sampled at High Frequency Over a Fixed Time Interval," CREATES Research Papers 2015-33, Department of Economics and Business Economics, Aarhus University.
    • Handle: RePEc:aah:create:2015-33
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    References listed on IDEAS

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    More about this item

    Keywords

    Approximate martingale estimating functions; discrete time sampling of diffusions; in-fill asymptotics; normal variance-mixtures; optimal rate; random Fisher information; stable convergence; stochastic differential equation.;
    All these keywords.

    JEL classification:

    • C22 - Mathematical and Quantitative Methods - - Single Equation Models; Single Variables - - - Time-Series Models; Dynamic Quantile Regressions; Dynamic Treatment Effect Models; Diffusion Processes

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