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Algorithms for Piecewise Constant Signal Approximations

Signal Processing 2019-06-12 v3 Information Theory math.IT

Abstract

We consider the problem of finding optimal piecewise constant approximations of one-dimensional signals. These approximations should consist of a specified number of segments (samples) and minimise the mean squared error to the original signal. We formalise this goal as a discrete nonconvex optimisation problem, for which we study two algorithms. First we reformulate a recent adaptive sampling method by Dar and Bruckstein in a compact and transparent way. This allows us to analyse its limitations when it comes to violations of its three key assumptions: signal smoothness, local linearity, and error balancing. As a remedy, we propose a direct optimisation approach which does not rely on any of these assumptions and employs a particle swarm optimisation algorithm. Our experiments show that for nonsmooth signals or low sample numbers, the direct optimisation approach offers substantial qualitative advantages over the Dar--Bruckstein method. As a more general contribution, we disprove the optimality of the principle of error balancing for optimising data in the l^2 norm.

Keywords

Cite

@article{arxiv.1903.01320,
  title  = {Algorithms for Piecewise Constant Signal Approximations},
  author = {Leif Bergerhoff and Joachim Weickert and Yehuda Dar},
  journal= {arXiv preprint arXiv:1903.01320},
  year   = {2019}
}
R2 v1 2026-06-23T07:57:39.563Z