Nonnegative Low-rank Matrix Recovery Can Have Spurious Local Minima

The classical low-rank matrix recovery problem is well-known to exhibit \emph{benign nonconvexity} under the restricted isometry property (RIP): local optimization is guaranteed to converge to the global optimum, where the ground truth is recovered. We investigate whether benign nonconvexity continues to hold when the factor matrices are constrained to be elementwise nonnegative -- a common practical requirement. In the simple setting of a rank-1 nonnegative ground truth, we confirm that benign nonconvexity holds in the fully-observed case with RIP constant $\delta=0$. Surprisingly, however, this property fails to extend to the partially-observed case with any arbitrarily small RIP constant $\delta\to0^{+}$, irrespective of rank overparameterization. This finding exposes a critical theoretical gap: the continuity argument widely used to explain the empirical robustness of low-rank matrix recovery fundamentally breaks down once nonnegative constraints are imposed.

@article{zhang2025_2505.03717,
  title={ Nonnegative Low-rank Matrix Recovery Can Have Spurious Local Minima },
  author={ Richard Y. Zhang },
  journal={arXiv preprint arXiv:2505.03717},
  year={ 2025 }
}