论文信息 - Universality in halting time

Universality in halting time

The authors present empirical distributions for the halting time (measured by the number of iterations to reach a given accuracy) of optimization algorithms applied to two random systems: spin glasses and deep learning. Given an algorithm, which we take to be both the optimization routine and the form of the random landscape, the fluctuations of the halting time follow a distribution that remains unchanged even when the input is changed drastically. We observe two main classes, a Gumbel-like distribution that appears in Google searches, human decision times, QR factorization and spin glasses, and a Gaussian-like distribution that appears in conjugate gradient method, deep network with MNIST input data and deep network with random input data. This empirical evidence suggests presence of a class of distributions for which the halting time is independent of the underlying distribution under some conditions.

Yann LeCun | Levent Sagun | T. Trogdon

[1] Thomas Trogdon,et al. Universality for Eigenvalue Algorithms on Sample Covariance Matrices , 2017, SIAM J. Numer. Anal..

[2] Michael I. Jordan,et al. Gradient Descent Converges to Minimizers , 2016, ArXiv.

[3] T. Trogdon,et al. Sampling unitary ensembles , 2015 .

[4] P. Deift,et al. Universality in numerical computations with random data , 2014, Proceedings of the National Academy of Sciences.

[5] Joshua Correll,et al. A neural computation model for decision-making times , 2012 .

[6] Anne Greenbaum,et al. Predicting the Behavior of Finite Precision Lanczos and Conjugate Gradient Computations , 2015, SIAM J. Matrix Anal. Appl..

[7] A. Greenbaum. Behavior of slightly perturbed Lanczos and conjugate-gradient recurrences , 1989 .

[8] E. Kostlan. Complexity theory of numerical linear algebra , 1988 .

[9] M. Hestenes,et al. Methods of conjugate gradients for solving linear systems , 1952 .