带最大密度限制的Navier-Stokes方程的耗散测度值解
Dissipative Measure-Valued Solution of Na-vier-Stokes Equation with Maximum Density Constraint
摘要: 本文研究具有最大密度限制的可压Navier-Stokes方程,其中,最大密度限制是由一个奇性的压强项给定的。利用带有参数K的Brenner模型,我们构造了Navier-Stokes方程的逼近解。为了处理压强的奇性,引入一个逼近压强pθ,δ,其中θ,δ为逼近参数。当这些参数K,θ,δ→0时,我们证明逼近解收敛到Navier- Stokes方程的耗散测度值解。
Abstract: This paper considers the compressible Navier-Stokes equation with maximum density constraint, where the maximum density constraint is imposed by a singular pressure term. Approximate solu-tions of the Navier-Stokes equation are constructed using the Brenner model with a parameter K. To deal with the singularity of pressure, an approximate pressure pθ,δ is introduced, where θ,δ are the approximate parameters. When K,θ,δ→0 , we show that the approximate solutions con-verge to the dissipative measure-valued solution of the Navier-Stokes equation.
文章引用:李婷婷, 华嘉乐. 带最大密度限制的Navier-Stokes方程的耗散测度值解[J]. 应用数学进展, 2023, 12(5): 2263-2273. https://doi.org/10.12677/AAM.2023.125231

参考文献

[1] Berthelin, F., Degond, P., Delitala, M. and Rascle, M. (2008) A Model for the Formation and Evolution of Traffic Jams. Archive for Rational Mechanics and Analysis, 187, 185-220. [Google Scholar] [CrossRef
[2] Degond, P., Hua, J. and Navoret, L. (2011) Numerical Simula-tions of the Euler System with Congestion Constraint. Journal of Computational Physics, 230, 8057-8088. [Google Scholar] [CrossRef
[3] Degond, P., Navoret, L., Bon, R. and Sanchez, D. (2010) Conges-tion in a Macroscopic Model of Self-Driven Particles Modeling Gregariousness. Journal of Statistical Physics, 138, 85-125. [Google Scholar] [CrossRef
[4] Degond, P. and Hua, J. (2013) Self-Organized Hydrody-namics with Congestion and Path Formation in Crowds. Journal of Computational Physics, 237, 299-319. [Google Scholar] [CrossRef
[5] Di Perna, R.J. (1985) Measure-Valued Solutions to Conservation Laws. Archive for Rational Mechanics and Analysis, 88, 223-270. [Google Scholar] [CrossRef
[6] Di Perna, R.J. and Majda, A.J. (1987) Oscillations and Concentrations in Weak Solutions of the Incompressible Fluid Equa-tions. Communications in Mathematical Physics, 108, 667-689. [Google Scholar] [CrossRef
[7] Gwiazda, P. (2010) On Measure-Valued Solutions to a Two-Dimensional Gravity-Driven Avalanche Flow Model. Mathematical Methods in the Applied Sciences, 28, 2201-2223. [Google Scholar] [CrossRef
[8] Neustupa, J. (1993) Meas-ure-Valued Solutions of the Euler and Navier-Stokes Equations for Compressible Barotropic Fluids. Mathematische Na-chrichten, 163, 217-227. [Google Scholar] [CrossRef
[9] Feireisl, E., Gwiazda, P., Gwiazda, A.Ś. and Wiedemann, E. (2016) Dissipative Measure-Valued Solutions to the Compressible Navier-Stokes System. Calculus of Variations and Partial Differential Equations, 55, Article No. 141. [Google Scholar] [CrossRef
[10] Prodi, G. (1959) Un teorema di unicita per le equazioni di Navier-Stokes. Annali di Matematica Pura ed Applicata, 48, 173-182. [Google Scholar] [CrossRef
[11] Serrin, J. (1963) The Initial Value Problem for the Navier-Stokes Equa-tion. In: Langer, R.E., Ed., Nonlinear Problems, University of Wisconsin Press, Madison, 69-98.
[12] Bianchini, R. and Perrin, C. (2021) Soft Congestion Approximation to the One-Dimensional Constrained Euler Equations. Nonlinearity, 34, 6901-6929. [Google Scholar] [CrossRef
[13] Perrin, C. and Zatorska, E. (2015) Free/congested Two-Phase Model from Weak Solutions to Multidimensional Compressible Navier-Stokes Equations. Communications in Partial Differential Equations, 40, 1558-1589. [Google Scholar] [CrossRef
[14] Perrin, C. and Saleh, K. (2022) Numerical Staggered Schemes for the Free-Congested Navier-Stokes Equations. SIAM Journal on Numerical Analysis, 60, 1824-1852. [Google Scholar] [CrossRef
[15] Nečasová, Š́., Novotný, A. and Roy, A. (2022) Compressible Na-vier-Stokes System with the Hard Sphere Pressure Law in an Exterior Domain. Zeitschrift für Angewandte Mathematik und Physik, 73, Article No. 197. [Google Scholar] [CrossRef
[16] 华嘉乐, 夏黎蓉. 最大密度限制下可压等熵欧拉系统含接触间断时可容许弱解的不唯一性[J]. 应用数学进展, 2022, 11(3): 1089-1106. [Google Scholar] [CrossRef
[17] Brenner, H. (2005) Navier-Stokes Revisited. Physica A: Statistical Mechanics and Its Applications, 349, 60-132. [Google Scholar] [CrossRef
[18] Feireisl, E., Lukáčová-Medvidová, M. and Mizerová, H. (2020) Convergence of Finite Volume Schemes for the Euler Equations via Dissipative Measure-Valued Solutions. Foundations of Computational Mathematics, 20, 923-966. [Google Scholar] [CrossRef
[19] Pedregal, P. (1997) Parametrized Measures and Variational Prin-ciples. Progress in Nonlinear Differential Equations and Their Applications, Vol. 30, Birkhäuser, Basel. [Google Scholar] [CrossRef

为你推荐