Volatility estimation under one-sided errors with applications to limit order books

Abstract

For a semi-martingale Xt, which forms a stochastic boundary, a rate-optimal estimator for its quadratic variation X, X t is constructed based on observations in the vicinity of Xt. The problem is embedded in a Poisson point process framework, which reveals an interesting connection to the theory of Brownian excursion areas. We derive n-1/3 as optimal convergence rate in a high-frequency framework with n observations (in mean). We discuss a potential application for the estimation of the integrated squared volatility of an efficient price process Xt from intra-day order book quotes.