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Autori principali: Li, Jiayun, Cheng, Yuxiao, Lu, Yiwen, Xia, Zhuofan, Mo, Yilin, Huang, Gao
Natura: Preprint
Pubblicazione: 2023
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Accesso online:https://arxiv.org/abs/2309.17194
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author Li, Jiayun
Cheng, Yuxiao
Lu, Yiwen
Xia, Zhuofan
Mo, Yilin
Huang, Gao
author_facet Li, Jiayun
Cheng, Yuxiao
Lu, Yiwen
Xia, Zhuofan
Mo, Yilin
Huang, Gao
contents Activation functions are essential to introduce nonlinearity into neural networks, with the Rectified Linear Unit (ReLU) often favored for its simplicity and effectiveness. Motivated by the structural similarity between a shallow Feedforward Neural Network (FNN) and a single iteration of the Projected Gradient Descent (PGD) algorithm, a standard approach for solving constrained optimization problems, we consider ReLU as a projection from R onto the nonnegative half-line R+. Building on this interpretation, we extend ReLU by substituting it with a generalized projection operator onto a convex cone, such as the Second-Order Cone (SOC) projection, thereby naturally extending it to a Multivariate Projection Unit (MPU), an activation function with multiple inputs and multiple outputs. We further provide mathematical proof establishing that FNNs activated by SOC projections outperform those utilizing ReLU in terms of expressive power. Experimental evaluations on widely-adopted architectures further corroborate MPU's effectiveness against a broader range of existing activation functions.
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id arxiv_https___arxiv_org_abs_2309_17194
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publishDate 2023
record_format arxiv
spellingShingle Generalized Activation via Multivariate Projection
Li, Jiayun
Cheng, Yuxiao
Lu, Yiwen
Xia, Zhuofan
Mo, Yilin
Huang, Gao
Machine Learning
Activation functions are essential to introduce nonlinearity into neural networks, with the Rectified Linear Unit (ReLU) often favored for its simplicity and effectiveness. Motivated by the structural similarity between a shallow Feedforward Neural Network (FNN) and a single iteration of the Projected Gradient Descent (PGD) algorithm, a standard approach for solving constrained optimization problems, we consider ReLU as a projection from R onto the nonnegative half-line R+. Building on this interpretation, we extend ReLU by substituting it with a generalized projection operator onto a convex cone, such as the Second-Order Cone (SOC) projection, thereby naturally extending it to a Multivariate Projection Unit (MPU), an activation function with multiple inputs and multiple outputs. We further provide mathematical proof establishing that FNNs activated by SOC projections outperform those utilizing ReLU in terms of expressive power. Experimental evaluations on widely-adopted architectures further corroborate MPU's effectiveness against a broader range of existing activation functions.
title Generalized Activation via Multivariate Projection
topic Machine Learning
url https://arxiv.org/abs/2309.17194