DERIVATION OF GEOSTROPHIC EQUATIONS AS A RIGOROUS LIMIT OF COMPRESSIBLE ROTATING AND HEAT CONDUCTING FLUIDS WITH THE GENERAL INITIAL DATA

YOUNG-SAM KWON; ANTONIN NOVOTNY

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DERIVATION OF GEOSTROPHIC EQUATIONS AS A RIGOROUS LIMIT OF COMPRESSIBLE ROTATING AND HEAT CONDUCTING FLUIDS WITH THE GENERAL INITIAL DATA

机译：衍生出地高空方程作为具有一般初始数据的可压缩旋转和导热流体的严格极限

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We investigate a distinguished low Mach and Rossby - high Reynolds and Peclet number singular limit in the complete Navier-Stokes-Fourier system towards a strong solution of a geostrophic system of equations. The limit is effectuated in the context of weak solutions with ill prepared initial data. The main tool in the proof is based on the relative energy method.

机译：我们调查完整的Navier-Stokes-Fourier系统中的杰出低马赫和罗斯比 - 高雷诺兹和PECLED编号奇异限制朝向热度方程式的强大解。限制在弱溶液的背景下有效地实现了ILL准备的初始数据。证据中的主要工具基于相对能量方法。

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来源
《Discrete and continuous dynamical systems》 |2020年第1期|395-421|共27页
作者
YOUNG-SAM KWON; ANTONIN NOVOTNY;
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作者单位

Department of Mathematics Dong-A University Busan Korea;

University of Toulon IMATH BP 20139 839 57 La Garde France;

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原文格式 PDF
正文语种 eng
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关键词
Navier-Stokes-Fourier system; singular limit; Rossby mumber; Mach number; Reynolds number; Peclet number; geostrophic equations;

机译：Navier-Stokes-Fourier系统;奇异限制;rossby mumber;马赫数;雷诺数;Peclet号码;地球节方程式;

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1. VISCOUS LIMITS TO PIECEWISE SMOOTH SOLUTIONS FOR THE NAVIER-STOKES EQUATIONS OF ONE-DIMENSIONAL COMPRESSIBLE VISCOUS HEAT-CONDUCTING FLUIDS [J] . SHIXIANG MA Methods and applications of analysis . 2009,第1期

机译：一维可压缩粘性导热流体Navier-Stokes方程的分段光滑解的粘性极限
2. Vanishing viscosity limit to rarefaction waves for the Navier-Stokes equations of one-dimensional compressible heat-conducting fluids [J] . Jiang S, Ni GX, Sun WJ SIAM Journal on Mathematical Analysis . 2006,第2期

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3. Multiple Scales and Singular Limits for Compressible Rotating Fluids with General Initial Data [J] . EDUARD FEIREISL, ANTONíN NOVOTNY Communications in Partial Differential Equations . 2014,第4a6期

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5. Global existence of solutions with large, discontinuous initial data for the Navier-Stokes equations for compressible fluid flows. [D] . Perepelitsa, Mikhail. 2004

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6. Blowup Phenomena for the Compressible Euler and Euler-Poisson Equations with Initial Functional Conditions [O] . Sen Wong, Manwai Yuen -1

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7. Derivation of geostrophic equations as a rigorous limit of compressible rotating and heat conducting fluids with the general initial data [O] . Young-Sam Kwon, Antonin Novotny 2020

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8. Initial Boundary Value Problems for the Equations of Motion of Compressible Viscous and Heat-Conductive Fluids [R] . Matsumura, A., Nishida, T. 1982

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DERIVATION OF GEOSTROPHIC EQUATIONS AS A RIGOROUS LIMIT OF COMPRESSIBLE ROTATING AND HEAT CONDUCTING FLUIDS WITH THE GENERAL INITIAL DATA

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