神经进化
梯度下降
人工神经网络
极限(数学)
计算机科学
功能(生物学)
随机梯度下降算法
数学
应用数学
人工智能
算法
数学分析
进化生物学
生物
作者
Stephen Whitelam,Viktor Selin,Sang-Won Park,Isaac Tamblyn
标识
DOI:10.1038/s41467-021-26568-2
摘要
We show analytically that training a neural network by conditioned stochastic mutation or neuroevolution of its weights is equivalent, in the limit of small mutations, to gradient descent on the loss function in the presence of Gaussian white noise. Averaged over independent realizations of the learning process, neuroevolution is equivalent to gradient descent on the loss function. We use numerical simulation to show that this correspondence can be observed for finite mutations, for shallow and deep neural networks. Our results provide a connection between two families of neural-network training methods that are usually considered to be fundamentally different.
科研通智能强力驱动
Strongly Powered by AbleSci AI