💤Quietscore 0.0Jul 10, 2026·2607.09546cs.LGmath.NAmath.OC

Graph-Regularized Low-Rank Matrix Completion by Variable Projection

Benoît Loucheur, P. -A. Absil, Michel Journée

Narrative

No narrative written yet. The narrate cron picks top papers by score; run /api/cron/narrate to populate this manually.

Abstract

We address the low-rank matrix completion problem by incorporating graph regularization into the existing Riemannian Trust-Region Matrix Completion (RTRMC) framework. The latter uses the geometry of the low-rank constraint to remodel the problem as an unconstrained optimization problem on a single Grassmann manifold. Our approach, named Graph-Regularized RTRMC (GR-RTRMC), exploits the inherent relationships between rows and columns of the matrix. By using these relationships, we aim to improve the accuracy and robustness of matrix completion, particularly in scenarios where the underlying data exhibits strong correlations between rows or columns.

Citation timeline
Not enough citation snapshots yet to plot a timeline. Come back after a few cron runs.