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Neural Network Approximation for Time Splitting Random Functions

Author

Listed:
  • George A. Anastassiou

    (Department of Mathematical Sciences, University of Memphis, Memphis, TN 38152, USA)

  • Dimitra Kouloumpou

    (Section of Mathematics, Hellenic Naval Academy, 18539 Piraeus, Greece)

Abstract

In this article we present the multivariate approximation of time splitting random functions defined on a box or R N , N ∈ N , by neural network operators of quasi-interpolation type. We achieve these approximations by obtaining quantitative-type Jackson inequalities engaging the multivariate modulus of continuity of a related random function or its partial high-order derivatives. We use density functions to define our operators. These derive from the logistic and hyperbolic tangent sigmoid activation functions. Our convergences are both point-wise and uniform. The engaged feed-forward neural networks possess one hidden layer. We finish the article with a great variety of applications.

Suggested Citation

  • George A. Anastassiou & Dimitra Kouloumpou, 2023. "Neural Network Approximation for Time Splitting Random Functions," Mathematics, MDPI, vol. 11(9), pages 1-25, May.
    • Handle: RePEc:gam:jmathe:v:11:y:2023:i:9:p:2183-:d:1140175
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