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Spatial decay bound and structural stability for the double-diffusion perturbation equations


  • Received: 05 October 2022 Revised: 07 November 2022 Accepted: 12 November 2022 Published: 01 December 2022
  • In this paper, we study the double-diffusion perturbation equations when the flow is through a porous medium. If the initial conditions satisfy some constraint conditions, the Saint-Venant type spatial decay of solutions for double-diffusion perturbation equations is obtained. Based on the spatial decay bound, the structural stability for the double-diffusion perturbation equations is also established.

    Citation: Yuanfei Li, Xuejiao Chen. Spatial decay bound and structural stability for the double-diffusion perturbation equations[J]. Mathematical Biosciences and Engineering, 2023, 20(2): 2998-3022. doi: 10.3934/mbe.2023142

    Related Papers:

  • In this paper, we study the double-diffusion perturbation equations when the flow is through a porous medium. If the initial conditions satisfy some constraint conditions, the Saint-Venant type spatial decay of solutions for double-diffusion perturbation equations is obtained. Based on the spatial decay bound, the structural stability for the double-diffusion perturbation equations is also established.



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