Stability threshold for 2D shear flows of the Boussinesq system near Couette

Dongfen Bian; Xueke Pu

doi:10.1063/5.0091052

Stability threshold for 2D shear flows of the Boussinesq system near Couette

Dongfen Bian^*
, Xueke Pu

^*Corresponding author for this work

School of Mathematics and Statistics

Guangzhou University

Research output: Contribution to journal › Article › peer-review

8 Citations (Scopus)

Abstract

In this paper, we consider the nonlinear stability for the shear flows of the Boussinesq system in a domain T×R. We prove the nonlinear stability of the shear flow (US,ΘS)=((eνt∂yyU(y),0)⊤,αy) with U(y) close to y and α ≥ 0 in Sobolev spaces for the following two cases: (i) α ≥ 0 is small scaling with the viscosity coefficients and initial perturbation ≲min{ν,μ}1/2 and (ii) α > 0 is not small, the heat diffusion coefficient μ is fixed, and initial perturbation ≲ν1/2.

Original language	English
Article number	081501
Journal	Journal of Mathematical Physics
Volume	63
Issue number	8
DOIs	https://doi.org/10.1063/5.0091052
Publication status	Published - 1 Aug 2022

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abstract = "In this paper, we consider the nonlinear stability for the shear flows of the Boussinesq system in a domain T×R. We prove the nonlinear stability of the shear flow (US,ΘS)=((eνt∂yyU(y),0)⊤,αy) with U(y) close to y and α ≥ 0 in Sobolev spaces for the following two cases: (i) α ≥ 0 is small scaling with the viscosity coefficients and initial perturbation ≲min\{ν,μ\}1/2 and (ii) α > 0 is not small, the heat diffusion coefficient μ is fixed, and initial perturbation ≲ν1/2.",

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AU - Pu, Xueke

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N2 - In this paper, we consider the nonlinear stability for the shear flows of the Boussinesq system in a domain T×R. We prove the nonlinear stability of the shear flow (US,ΘS)=((eνt∂yyU(y),0)⊤,αy) with U(y) close to y and α ≥ 0 in Sobolev spaces for the following two cases: (i) α ≥ 0 is small scaling with the viscosity coefficients and initial perturbation ≲min{ν,μ}1/2 and (ii) α > 0 is not small, the heat diffusion coefficient μ is fixed, and initial perturbation ≲ν1/2.

AB - In this paper, we consider the nonlinear stability for the shear flows of the Boussinesq system in a domain T×R. We prove the nonlinear stability of the shear flow (US,ΘS)=((eνt∂yyU(y),0)⊤,αy) with U(y) close to y and α ≥ 0 in Sobolev spaces for the following two cases: (i) α ≥ 0 is small scaling with the viscosity coefficients and initial perturbation ≲min{ν,μ}1/2 and (ii) α > 0 is not small, the heat diffusion coefficient μ is fixed, and initial perturbation ≲ν1/2.

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Stability threshold for 2D shear flows of the Boussinesq system near Couette

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