A Globally Convergent Algorithm for Neural Network Parameter Optimization Based on Difference-of-Convex Functions
MCML Authors
Stefan Feuerriegel
Prof. Dr.
Principal Investigator
Abstract
Stefan Feuerriegel
Prof. Dr.
Principal Investigator
Abstract
We propose an algorithm for optimizing the parameters of single hidden layer neural networks. Specifically, we derive a blockwise difference-of-convex (DC) functions representation of the objective function. Based on the latter, we propose a block coordinate descent (BCD) approach that we combine with a tailored difference-of-convex functions algorithm (DCA). We prove global convergence of the proposed algorithm. Furthermore, we mathematically analyze the convergence rate of parameters and the convergence rate in value (i.e., the training loss). We give conditions under which our algorithm converges linearly or even faster depending on the local shape of the loss function. We confirm our theoretical derivations numerically and compare our algorithm against state-of-the-art gradient-based solvers in terms of both training loss and test loss.
article
Transactions on Machine Learning Research
Sep. 2024.Authors
D. Tschernutter • M. Kraus • S. FeuerriegelLinks
URLResearch Area
BibTeXKey: TKF24