1 research outputs found
Differentially Private High Dimensional Sparse Covariance Matrix Estimation
In this paper, we study the problem of estimating the covariance matrix under
differential privacy, where the underlying covariance matrix is assumed to be
sparse and of high dimensions. We propose a new method, called DP-Thresholding,
to achieve a non-trivial -norm based error bound, which is
significantly better than the existing ones from adding noise directly to the
empirical covariance matrix. We also extend the -norm based error bound
to a general -norm based one for any , and show
that they share the same upper bound asymptotically. Our approach can be easily
extended to local differential privacy. Experiments on the synthetic datasets
show consistent results with our theoretical claims.Comment: A short version will be appeared in CISS 201