Mathematics (Jan 2023)

Time-Varying Pseudoinversion Based on Full-Rank Decomposition and Zeroing Neural Networks

  • Hadeel Alharbi,
  • Houssem Jerbi,
  • Mourad Kchaou,
  • Rabeh Abbassi,
  • Theodore E. Simos,
  • Spyridon D. Mourtas,
  • Vasilios N. Katsikis

DOI
https://doi.org/10.3390/math11030600
Journal volume & issue
Vol. 11, no. 3
p. 600

Abstract

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The computation of the time-varying matrix pseudoinverse has become crucial in recent years for solving time-varying problems in engineering and science domains. This paper investigates the issue of calculating the time-varying pseudoinverse based on full-rank decomposition (FRD) using the zeroing neural network (ZNN) method, which is currently considered to be a cutting edge method for calculating the time-varying matrix pseudoinverse. As a consequence, for the first time in the literature, a new ZNN model called ZNNFRDP is introduced for time-varying pseudoinversion and it is based on FRD. Five numerical experiments investigate and confirm that the ZNNFRDP model performs as well as, if not better than, other well-performing ZNN models in the calculation of the time-varying pseudoinverse. Additionally, theoretical analysis and numerical findings have both supported the effectiveness of the proposed model.

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