Rank tests for time-varying covariance matrices observed under noise

Abstract

We consider a d-dimensional continuous martingale X(t) with quadratic variation matrix Xt=∫0t (s)\,ds and develop tests for the rank of its spot covariance matrix (t), t∈[0,1]. The process X is observed under observational noise, as is standard for microstructure noise models in high-frequency finance. We test the null hypothesis H0:rank((t)) r against local alternatives H1,n:λr+1((t)) vn, where λr+1 denotes the (r+1)st eigenvalue and vn 0 as the sample size n∞. We construct test statistics based on eigenvalues of carefully calibrated localized spectral covariance matrix estimates. Critical values are provided non-asymptotically as well as asymptotically via maximal eigenvalues of Gaussian orthogonal ensembles. The power analysis establishes asymptotic consistency for a separation rate vn (λr-1/(β+1)n-β/(β+1)) n-β/(β+2), depending on the H\"older-regularity β of and a possible spectral gap λr 0 under H0. A lower bound shows the optimality of this rate. We discuss why the rate is much faster than conventional estimation rates. The theory is illustrated by simulations and a real data example with German government bonds of varying maturity.