AIMS Mathematics (Jun 2024)

A novel nonzero functional method to extended dissipativity analysis for neural networks with Markovian jumps

  • Wenlong Xue,
  • Yufeng Tian,
  • Zhenghong Jin

DOI
https://doi.org/10.3934/math.2024927
Journal volume & issue
Vol. 9, no. 7
pp. 19049 – 19067

Abstract

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This paper explored the topic of extended dissipativity analysis for Markovian jump neural networks (MJNNs) that were influenced by time-varying delays. A distinctive Lyapunov functional, distinguished by a non-zero delay-product types, was presented. This was achieved by combining a Wirtinger-based double integral inequality with a flexible matrix set. This novel methodology addressed the limitations of the slack matrices found in earlier research. As a result, a fresh condition for extended dissipativity in MJNNs was formulated, utilizing an exponential type reciprocally convex inequality in conjunction with the newly introduced nonzero delay-product types. A numerical example was included to demonstrate the effectiveness of the proposed methodology.

Keywords