Computable Bernstein Certificates for Cross-Fitted Clipped Covariance Estimation
About
We study operator-norm covariance estimation from heavy-tailed samples that may include a small fraction of arbitrary outliers. A simple and widely used safeguard is \emph{Euclidean norm clipping}, but its accuracy depends critically on an unknown clipping level. We propose a cross-fitted clipped covariance estimator equipped with \emph{fully computable} Bernstein-type deviation certificates, enabling principled data-driven tuning via a selector (\emph{MinUpper}) that balances certified stochastic error and a robust hold-out proxy for clipping bias. The resulting procedure adapts to intrinsic complexity measures such as effective rank under mild tail regularity and retains meaningful guarantees under only finite fourth moments. Experiments on contaminated spiked-covariance benchmarks illustrate stable performance and competitive accuracy across regimes.
Related benchmarks
| Task | Dataset | Result | Rank | |
|---|---|---|---|---|
| Covariance Estimation | Elliptical Student-t df=8 contamination level ε = 0.05 | Covariance Error0.352 | 7 | |
| Covariance Estimation | Elliptical Gaussian contamination level ε = 0.05 | CovErr0.325 | 7 | |
| Covariance Estimation | Elliptical Gaussian (ε = 0.0) (synthetic) | Covariance Error0.33 | 7 | |
| Covariance Estimation | Non-elliptical signed log-normal (σ = 0.5) with contamination level ε = 0.1 (test) | Covariance Error0.329 | 7 | |
| Robust Covariance Estimation | Non-elliptical signed log-normal (sigma = 0.5) epsilon = 0.0 | Covariance Error30.5 | 7 | |
| Robust Covariance Estimation | Non-elliptical Laplace coordinates contamination level ε = 0.1 | Covariance Error33.7 | 7 | |
| Robust Covariance Estimation | Elliptical Gaussian ε = 0.1 | Covariance Error0.303 | 7 | |
| Robust Covariance Estimation | Non-elliptical Laplace coordinates ε = 0.0 | Covariance Error0.343 | 7 | |
| Robust Covariance Estimation | Elliptical Student-t contamination level ε = 0.1 df=8 | Covariance Error0.346 | 7 | |
| Robust Covariance Estimation | Non-elliptical signed log-normal sigma=0.5, epsilon=0.05 (test) | Covariance Error0.317 | 7 |