Asymptotic stability of viscous shocks in the modular Burgers equation Journal Articles

abstract

• Abstract Dynamics of viscous shocks is considered in the modular Burgers equation, where the time evolution becomes complicated due to singularities produced by the modular nonlinearity. We prove that the viscous shocks are asymptotically stable under odd and general perturbations. For the odd perturbations, the proof relies on the reduction of the modular Burgers equation to a linear diffusion equation on a half-line. For the general perturbations, the proof is developed by converting the time-evolution problem to a system of linear equations coupled with a nonlinear equation for the interface position. Exponential weights in space are imposed on the initial data of general perturbations in order to gain the asymptotic decay of perturbations in time. We give numerical illustrations of asymptotic stability of the viscous shocks under general perturbations.

authors

• Le, Uyen
• Pelinovsky, Dmitry E
• Poullet, Pascal

status

• published 

publication date

• September 1, 2021

has subject area

• 0102 Applied Mathematics (FoR)
• General Mathematics (Science Metrix)

published in

• Nonlinearity  Journal

keywords

• ENSTROPHY GROWTH
• FRONTS
• MEDIA
• METASTABILITY
• Mathematics
• Mathematics, Applied
• NONLINEAR STABILITY
• ORBITAL STABILITY
• Physical Sciences
• Physics
• Physics, Mathematical
• Science & Technology
• TRAVELING-WAVE SOLUTIONS
• asymptotic stability
• modular Burgers equation
• viscous shocks

Digital Object Identifier (DOI)

• 10.1088/1361-6544/ac0f4f

start page

• 5979

end page

• 6016

volume

• 34

issue

• 9