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Approximation of functions with one-bit neural networks

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arxiv 2112.09181 v2 pith:RZ5PZCIT submitted 2021-12-16 cs.LG cs.ITcs.NAmath.ITmath.NA

Approximation of functions with one-bit neural networks

classification cs.LG cs.ITcs.NAmath.ITmath.NA
keywords varepsilonapproximationnetworksneuralparametersbernsteinboldsymbolnetwork
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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The celebrated universal approximation theorems for neural networks roughly state that any reasonable function can be arbitrarily well-approximated by a network whose parameters are appropriately chosen real numbers. This paper examines the approximation capabilities of one-bit neural networks -- those whose nonzero parameters are $\pm a$ for some fixed $a\not=0$. One of our main theorems shows that for any $f\in C^s([0,1]^d)$ with $\|f\|_\infty<1$ and error $\varepsilon$, there is a $f_{NN}$ such that $|f(\boldsymbol{x})-f_{NN}(\boldsymbol{x})|\leq \varepsilon$ for all $\boldsymbol{x}$ away from the boundary of $[0,1]^d$, and $f_{NN}$ is either implementable by a $\{\pm 1\}$ quadratic network with $O(\varepsilon^{-2d/s})$ parameters or a $\{\pm \frac 1 2 \}$ ReLU network with $O(\varepsilon^{-2d/s}\log (1/\varepsilon))$ parameters, as $\varepsilon\to0$. We establish new approximation results for iterated multivariate Bernstein operators, error estimates for noise-shaping quantization on the Bernstein basis, and novel implementation of the Bernstein polynomials by one-bit quadratic and ReLU neural networks.

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  1. On Explicit Super-Expressive Approximation for Neural Networks

    cs.LG 2026-07 accept novelty 7.0

    Fixed-architecture networks of width O(D) and depth O(r) approximate Hölder functions with parameter magnitude log P = O(ε^{-2D/(r+γ)} log(1/ε)) via CRT encoding.