In this paper, we present a test for the maximal rank of the volatility process in continuous diffusion models observed with noise. Such models are typically applied in mathematical finance, where latent price processes are corrupted by microstructure noise at ultra high frequencies. Using high frequency observations, we construct a test statistic for the maximal rank of the time varying stochastic volatility process. Our methodology is based upon a combination of a matrix perturbation approach and pre-averaging. We will show the asymptotic mixed normality of the test statistic and obtain a consistent testing procedure. We complement the paper with a simulation and an empirical study showing the performances on finite samples
AbstractWe consider a new class of estimators for volatility functionals in the setting of frequentl...
We find the asymptotic distribution of the multi-dimensional multi-scale and kernel estimators for h...
We consider the models Yi,n = ∫ i/n 0 σ(s)dWs + τ(i/n)i,n, and Ỹi,n = σ(i/n)Wi/n + τ(i/n)i,n, i = 1...
In this paper, we present a test for the maximal rank of the volatility process in continuous diffus...
We study nonparametric estimation of the volatility function of a diffusion process from discrete da...
December 2012In this paper we present a test for the maximal rank of the matrix-valued volatility pr...
We consider the problem of testing the parametric form of the volatility for high frequency data. It...
AbstractThis paper introduces adaptiveness to the non-parametric estimation of volatility in high fr...
This paper presents a generalized pre-averaging approach for estimating the integrated volatility. T...
A measurement volatility of return process should be the primary object of traders and practitioners...
Abstract We consider the problem of testing the parametric form of the volatility for high frequency...
We propose localized spectral estimators for the quadratic covariation and the spot covolatility of ...
A measurement volatility of return process should be the primary object of traders and practitioners...
We consider estimation of the spot volatility in a stochastic boundary model with one-sided microstr...
The basic model for high-frequency data in finance is considered, where an efficient price process i...
AbstractWe consider a new class of estimators for volatility functionals in the setting of frequentl...
We find the asymptotic distribution of the multi-dimensional multi-scale and kernel estimators for h...
We consider the models Yi,n = ∫ i/n 0 σ(s)dWs + τ(i/n)i,n, and Ỹi,n = σ(i/n)Wi/n + τ(i/n)i,n, i = 1...
In this paper, we present a test for the maximal rank of the volatility process in continuous diffus...
We study nonparametric estimation of the volatility function of a diffusion process from discrete da...
December 2012In this paper we present a test for the maximal rank of the matrix-valued volatility pr...
We consider the problem of testing the parametric form of the volatility for high frequency data. It...
AbstractThis paper introduces adaptiveness to the non-parametric estimation of volatility in high fr...
This paper presents a generalized pre-averaging approach for estimating the integrated volatility. T...
A measurement volatility of return process should be the primary object of traders and practitioners...
Abstract We consider the problem of testing the parametric form of the volatility for high frequency...
We propose localized spectral estimators for the quadratic covariation and the spot covolatility of ...
A measurement volatility of return process should be the primary object of traders and practitioners...
We consider estimation of the spot volatility in a stochastic boundary model with one-sided microstr...
The basic model for high-frequency data in finance is considered, where an efficient price process i...
AbstractWe consider a new class of estimators for volatility functionals in the setting of frequentl...
We find the asymptotic distribution of the multi-dimensional multi-scale and kernel estimators for h...
We consider the models Yi,n = ∫ i/n 0 σ(s)dWs + τ(i/n)i,n, and Ỹi,n = σ(i/n)Wi/n + τ(i/n)i,n, i = 1...