A Two-Stage Realized Volatility Approach to the Estimation for Diffusion Processes from Discrete Observations

This paper motivates and introduces a two-stage method for estimating diffusion processes based on discretely sampled observations. In the first stage we make use of the feasible central limit theory for realized volatility, as recently developed in Barndorff-Nielsen and Shephard (2002), to provide a regression model for estimating the parameters in the diffusion function. In the second stage the in-fill likelihood function is derived by means of the Girsanov theorem and then used to estimate the parameters in the drift function. Consistency and asymptotic distribution theory for these estimates are established in various contexts. The finite sample performance of the proposed method is compared with that of the approximate maximum likelihood method of Ait-Sahalia (2002).

[1]  Patrick Billingsley,et al.  Statistical inference for Markov processes , 1961 .

[2]  Oldrich A. Vasicek An equilibrium characterization of the term structure , 1977 .

[3]  V. Lánská Minimum contrast estimation in diffusion processes , 1979, Journal of Applied Probability.

[4]  S. Ross,et al.  A theory of the term structure of interest rates'', Econometrica 53, 385-407 , 1985 .

[5]  W. Newey,et al.  Large sample estimation and hypothesis testing , 1986 .

[6]  P. I. Nelson,et al.  Quasi-likelihood estimation for semimartingales , 1986 .

[7]  A. Lo Maximum Likelihood Estimation of Generalized Itô Processes with Discretely Sampled Data , 1986, Econometric Theory.

[8]  D. Florens-zmirou Approximate discrete-time schemes for statistics of diffusion processes , 1989 .

[9]  N. Yoshida Estimation for diffusion processes from discrete observation , 1992 .

[10]  Campbell R. Harvey,et al.  An Empirical Comparison of Alternative Models of the Short-Term Interest Rate , 1992 .

[11]  Avinash Dixit,et al.  The art of smooth pasting , 1993 .

[12]  A. Pedersen A new approach to maximum likelihood estimation for stochastic differential equations based on discrete observations , 1995 .

[13]  A. Harvey,et al.  5 Stochastic volatility , 1996 .

[14]  Jaeho Cho A Theory of the Term Structure of Interest Rates Under Non-expected Intertemporal Preferences , 1998 .

[15]  N. Shephard,et al.  Likelihood INference for Discretely Observed Non-linear Diffusions , 2001 .

[16]  Prakasa Rao Statistical inference for diffusion type processes , 1999 .

[17]  Yacine Aït-Sahalia Transition Densities for Interest Rate and Other Nonlinear Diffusions , 1999 .

[18]  B.L.S. Prakasa Rao Semimartingales and their Statistical Inference , 1999 .

[19]  D. Ahn,et al.  A Parametric Nonlinear Model of Term Structure Dynamics , 1999 .

[20]  Michael W. Brandt,et al.  Simulated Likelihood Estimation of Diffusions with an Application to Exchange Rate Dynamics in Incomplete Markets , 2001 .

[21]  Bjørn Eraker MCMC Analysis of Diffusion Models With Application to Finance , 2001 .

[22]  N. Shephard,et al.  How accurate is the asymptotic approximation to the distribution of realised variance , 2001 .

[23]  Peter C. B. Phillips,et al.  Fully Nonparametric Estimation of Scalar Diffusion Models , 2001 .

[24]  Robert Buff Continuous Time Finance , 2002 .

[25]  N. Shephard,et al.  Econometric analysis of realized volatility and its use in estimating stochastic volatility models , 2002 .

[26]  T. Bollerslev,et al.  Estimating Stochastic Volatility Diffusion Using Conditional Moments of Integrated Volatility , 2001 .

[27]  Yacine Aït-Sahalia Maximum Likelihood Estimation of Discretely Sampled Diffusions: A Closed‐form Approximation Approach , 2002 .

[28]  P. Phillips,et al.  Jackknifing Bond Option Prices , 2003 .

[29]  P. Phillips,et al.  A Simple Approach to the Parametric Estimation of Potentially Nonstationary Diffusions , 2005 .

[30]  Donald W. K. Andrews,et al.  Identification and Inference for Econometric Models , 2005 .