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A universal approximation theorem of deep neural networks for expressing probability distributions

Publication ,  Journal Article
Lu, Y; Lu, J
Published in: Advances in Neural Information Processing Systems
January 1, 2020

This paper studies the universal approximation property of deep neural networks for representing probability distributions. Given a target distribution p and a source distribution pz both defined on Rd, we prove under some assumptions that there exists a deep neural network g : Rd?R with ReLU activation such that the push-forward measure (?g)#pz of pz under the map ?g is arbitrarily close to the target measure p. The closeness are measured by three classes of integral probability metrics between probability distributions: 1-Wasserstein distance, maximum mean distance (MMD) and kernelized Stein discrepancy (KSD). We prove upper bounds for the size (width and depth) of the deep neural network in terms of the dimension d and the approximation error e with respect to the three discrepancies. In particular, the size of neural network can grow exponentially in d when 1-Wasserstein distance is used as the discrepancy, whereas for both MMD and KSD the size of neural network only depends on d at most polynomially. Our proof relies on convergence estimates of empirical measures under aforementioned discrepancies and semi-discrete optimal transport.

Duke Scholars

Published In

Advances in Neural Information Processing Systems

ISSN

1049-5258

Publication Date

January 1, 2020

Volume

2020-December

Related Subject Headings

  • 4611 Machine learning
  • 1702 Cognitive Sciences
  • 1701 Psychology
 

Citation

APA
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ICMJE
MLA
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Lu, Y., & Lu, J. (2020). A universal approximation theorem of deep neural networks for expressing probability distributions. Advances in Neural Information Processing Systems, 2020-December.
Lu, Y., and J. Lu. “A universal approximation theorem of deep neural networks for expressing probability distributions.” Advances in Neural Information Processing Systems 2020-December (January 1, 2020).
Lu Y, Lu J. A universal approximation theorem of deep neural networks for expressing probability distributions. Advances in Neural Information Processing Systems. 2020 Jan 1;2020-December.
Lu, Y., and J. Lu. “A universal approximation theorem of deep neural networks for expressing probability distributions.” Advances in Neural Information Processing Systems, vol. 2020-December, Jan. 2020.
Lu Y, Lu J. A universal approximation theorem of deep neural networks for expressing probability distributions. Advances in Neural Information Processing Systems. 2020 Jan 1;2020-December.

Published In

Advances in Neural Information Processing Systems

ISSN

1049-5258

Publication Date

January 1, 2020

Volume

2020-December

Related Subject Headings

  • 4611 Machine learning
  • 1702 Cognitive Sciences
  • 1701 Psychology