On the Expressiveness of Rational ReLU Neural Networks With Bounded Depth
Abstract
To confirm that the expressive power of ReLU neural networks grows with their depth, the function Fn = \0,x1,…,xn\ has been considered in the literature. A conjecture by Hertrich, Basu, Di Summa, and Skutella [NeurIPS 2021] states that any ReLU network that exactly represents Fn has at least 2 (n+1) hidden layers. The conjecture has recently been confirmed for networks with integer weights by Haase, Hertrich, and Loho [ICLR 2023]. We follow up on this line of research and show that, within ReLU networks whose weights are decimal fractions, Fn can only be represented by networks with at least 3 (n+1) hidden layers. Moreover, if all weights are N-ary fractions, then Fn can only be represented by networks with at least ( n N) layers. These results are a partial confirmation of the above conjecture for rational ReLU networks, and provide the first non-constant lower bound on the depth of practically relevant ReLU networks.
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