George Cybenko scite author profile

In this paper we demonstrate that finite linear combinations of com positions of a fixed, univariate function and a set of affine functionals can uniformly approximate any continuous function of n real variables with support in the unit hypercube; only mild conditions are imposed on the univariate function. Our results settle an open question about representability in the class of single hidden layer neural networks. In particular, we show that arbitrary decision regions can be arbitrarily well approximated by continuous feedforward neural networks with only a single internal, hidden layer and any continuous sigmoidal nonlinearity. The paper discusses approximation properties of other possible types of nonlinearities that might be implemented by artificial neural networks.

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Approximation by superpositions of a sigmoidal function

Cybenko¹

1992

Math. Control Signal Systems

1,781

2,147

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Dynamic load balancing for distributed memory multiprocessors

Cybenko

1989

Journal of Parallel and Distributed Computing

859

557

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Tracking a moving object with a binary sensor network

et al. 2003

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George Cybenko

Approximation by superpositions of a sigmoidal function

Approximation by superpositions of a sigmoidal function

Dynamic load balancing for distributed memory multiprocessors

Tracking a moving object with a binary sensor network

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