AIMS Mathematics (Sep 2023)

A novel quaternion linear matrix equation solver through zeroing neural networks with applications to acoustic source tracking

  • Vladislav N. Kovalnogov ,
  • Ruslan V. Fedorov,
  • Igor I. Shepelev,
  • Vyacheslav V. Sherkunov,
  • Theodore E. Simos ,
  • Spyridon D. Mourtas,
  • Vasilios N. Katsikis

DOI
https://doi.org/10.3934/math.20231323
Journal volume & issue
Vol. 8, no. 11
pp. 25966 – 25989

Abstract

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Due to its significance in science and engineering, time-varying linear matrix equation (LME) problems have received a lot of attention from scholars. It is for this reason that the issue of finding the minimum-norm least-squares solution of the time-varying quaternion LME (ML-TQ-LME) is addressed in this study. This is accomplished using the zeroing neural network (ZNN) technique, which has achieved considerable success in tackling time-varying issues. In light of that, two new ZNN models are introduced to solve the ML-TQ-LME problem for time-varying quaternion matrices of arbitrary dimension. Two simulation experiments and two practical acoustic source tracking applications show that the models function superbly.

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