| Popis: |
Most existing methodologies of estimating low-rank matrices rely on Burer-Monteiro factorization, but these approaches can suffer from slow convergence, especially when dealing with solutions characterized by a large condition number, defined by the ratio of the largest to the $r$-th singular values, where $r$ is the search rank. While methods such as Scaled Gradient Descent have been proposed to address this issue, such methods are more complicated and sometimes have weaker theoretical guarantees, for example, in the rank-deficient setting. In contrast, this paper demonstrates the effectiveness of the projected gradient descent algorithm. Firstly, its local convergence rate is independent of the condition number. Secondly, under conditions where the objective function is rank-$2r$ restricted $L$-smooth and $\mu$-strongly convex, with $L/\mu < 3$, projected gradient descent with appropriate step size converges linearly to the solution. Moreover, a perturbed version of this algorithm effectively navigates away from saddle points, converging to an approximate solution or a second-order local minimizer across a wide range of step sizes. Furthermore, we establish that there are no spurious local minimizers in estimating asymmetric low-rank matrices when the objective function satisfies $L/\mu<3.$ |
