Refining Covariance Matrix Estimation in Stochastic Gradient Descent Through Bias Reduction
About
We study online inference and asymptotic covariance estimation for the stochastic gradient descent (SGD) algorithm. While classical methods (such as plug-in and batch-means estimators) are available, they either require inaccessible second-order (Hessian) information or suffer from slow convergence. To address these challenges, we propose a novel, fully online de-biased covariance estimator that eliminates the need for second-order derivatives while significantly improving estimation accuracy. Our method employs a bias-reduction technique to achieve a convergence rate of $n^{(\alpha-1)/2} \sqrt{\log n}$, outperforming existing Hessian-free alternatives.
Ziyang Wei, Wanrong Zhu, Jingyang Lyu, Wei Biao Wu• 2026
Related benchmarks
| Task | Dataset | Result | Rank | |
|---|---|---|---|---|
| Covariance matrix estimation | Linear Regression Model d=50 | Estimation Error (||Σn - Σ||F)7.91 | 6 | |
| Covariance matrix estimation | Logistic Regression Model d=50 | Estimation Error (Frobenius)92.78 | 6 | |
| Covariance matrix estimation | Expectile Regression Model d=50 | Frobenius Error8.12 | 6 | |
| Covariance matrix estimation | Linear Model d=20 | Estimation Error (MSE)3.82 | 6 | |
| Covariance matrix estimation | Logistic Model d=20 | Estimation Error (MSE)33.92 | 6 | |
| Covariance matrix estimation | Expectile Model (d=20) | Estimation Error (MSE)4.02 | 6 | |
| Covariance matrix estimation | Linear Model d = 5 | MSE1.21 | 6 | |
| Covariance matrix estimation | Logistic Model d = 5 | Estimation Error (MSE)8.99 | 6 | |
| Covariance matrix estimation | Expectile Model d = 5 | MSE1.51 | 6 | |
| Statistical Inference | Linear Regression model | Empirical Coverage93.9 | 6 |
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