Mathematics (Sep 2023)

On the Stability of a Convective Flow with Nonlinear Heat Sources

  • Armands Gritsans,
  • Andrei Kolyshkin,
  • Felix Sadyrbaev,
  • Inara Yermachenko

DOI
https://doi.org/10.3390/math11183895
Journal volume & issue
Vol. 11, no. 18
p. 3895

Abstract

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The linear stability of a convective flow in a vertical fluid layer caused by nonlinear heat sources in the presence of cross-flow through the walls of the channel is investigated in this paper. This study is relevant to the analysis of factors that affect the effectiveness of biomass thermal conversion. The nonlinear problem for the base flow temperature is investigated in detail using the Krasnosel’skiĭ–Guo cone expansion/contraction theorem. It is shown that a different number of solutions can exist depending on the values of the parameters. Estimates for the norm of the solutions are obtained. The linear stability problem is solved numerically by a collocation method based on Chebyshev polynomials. It is shown that the increase in the cross-flow intensity stabilizes the flow, but there is also a small region of the radial Reynolds numbers where the flow is destabilized.

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