Parametric Estimation from Approximate Data: Non-Gaussian Diffusions

Abstract

We study the problem of parameters estimation in Indirect Observability contexts, where Xt ∈ Rr is an unobservable stationary process parametrized by a vector of unknown parameters and all observable data are generated by an approximating process Yt which is close to Xt in L4 norm. We construct consistent parameter estimators which are smooth functions of the sub-sampled empirical mean and empirical lagged covariance matrices computed from the observable data. We derive explicit optimal sub-sampling schemes specifying the best paired choices of sub-sampling time-step and number of observations. We show that these choices ensure that our parameter estimators reach optimized asymptotic L2-convergence rates, which are constant multiples of the L4 norm || Yt - Xt ||.