AppliedMath (May 2024)

Approximating a Function with a Jump Discontinuity—The High-Noise Case

  • Qusay Muzaffar,
  • David Levin,
  • Michael Werman

DOI
https://doi.org/10.3390/appliedmath4020030
Journal volume & issue
Vol. 4, no. 2
pp. 561 – 569

Abstract

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This paper presents a novel deep-learning network designed to detect intervals of jump discontinuities in single-variable piecewise smooth functions from their noisy samples. Enhancing the accuracy of jump discontinuity estimations can be used to find a more precise overall approximation of the function, as traditional approximation methods often produce significant errors near discontinuities. Detecting intervals of discontinuities is relatively straightforward when working with exact function data, as finite differences in the data can serve as indicators of smoothness. However, these smoothness indicators become unreliable when dealing with highly noisy data. In this paper, we propose a deep-learning network to pinpoint the location of a jump discontinuity even in the presence of substantial noise.

Keywords