Your search keyword '"Zhouping Xin"' showing total 130 results

1. Uniform regularity and vanishing viscosity limit for the compressible Navier-Stokes with general Navier-slip boundary conditions in 3-dimensional domains

Author

Yong, Wang, Zhouping, Xin, and Yan, Yong

Subjects

Mathematics - Analysis of PDEs, 35Q35, 35B65, 76N10

Abstract

In this paper, we investigate the uniform regularity for the isentropic compressible Navier-Stokes system with general Navier-slip boundary conditions (1.6) and the inviscid limit to the compressible Euler system. It is shown that there exists a unique strong solution of the compressible Navier-Stokes equations with general Navier-slip boundary conditions in an interval of time which is uniform in the vanishing viscosity limit. The solution is uniformly bounded in a conormal Sobolev space and is uniform bounded in $W^{1,\infty}$. It is also shown that the boundary layer for the density is weaker than the one for the velocity field. In particular, it is proved that the velocity will be uniform bounded in $L^\infty(0,T;H^2)$ when the boundary is flat and the Navier-Stokes system is supplemented with the special boundary condition (1.21). Based on such uniform estimates, we prove the convergence of the viscous solutions to the inviscid ones in $L^\infty(0,T;L^2)$, $L^\infty(0,T;H^1)$ and $L^\infty([0,T]\times\Omega)$ with a rate of convergence., Comment: 54 pages

Published

2015

2. On blowup of classical solutions to the compressible Navier-Stokes equations

Author

Zhouping, Xin and Wei, Yan

Subjects

Mathematics - Analysis of PDEs

Abstract

We study the finite time blow up of smooth solutions to the Compressible Navier-Stokes system when the initial data contain vacuums. We prove that any classical solutions of viscous compressible fluids without heat conduction will blow up in finite time, as long as the initial data has an isolated mass group (see definition in the paper). The results hold regardless of either the size of the initial data or the far fields being vacuum or not. This improves the blowup results of Xin (1998) by removing the crucial assumptions that the initial density has compact support and the smooth solution has finite total energy. Furthermore, the analysis here also yields that any classical solutions of viscous compressible fluids without heat conduction in bounded domains or periodic domains will blow up in finite time, if the initial data have an isolated mass group satisfying some suitable conditions., Comment: 13 pages, Submitted

Published

2012

3. Global Well-Posedness of the Inviscid Heat-Conductive Resistive Compressible MHD in a Strip Domain

Author

Yanjin Wang Zhouping Xin

Subjects

Physics, Resistive touchscreen, Inviscid flow, Compressibility, General Medicine, Mechanics, Magnetohydrodynamics, Electrical conductor, Well posedness, Domain (software engineering)

Published

2022

4. On the vanishing dissipation limit for the incompressible MHD equations on bounded domains

Author

Yuelong Xiao, Qin Duan, and Zhouping Xin

Subjects

General Mathematics, Weak solution, Bounded function, Mathematical analysis, Boundary (topology), Boundary value problem, Magnetohydrodynamic drive, Limit (mathematics), Magnetohydrodynamics, Domain (mathematical analysis), Mathematics

Abstract

In this paper, we investigate the solvability, regularity and the vanishing dissipation limit of solutions to the three-dimensional viscous magnetohydrodynamic (MHD) equations in bounded domains. On the boundary, the velocity field fulfills a Navier-slip condition, while the magnetic field satisfies the insulating condition. It is shown that the initial boundary value problem has a global weak solution for a general smooth domain. More importantly, for a flat domain, we establish the uniform local well-posedness of the strong solution with higher-order uniform regularity and the asymptotic convergence with a rate to the solution of the ideal MHD equation as the dissipations tend to zero.

Published

2021

5. Entropy‐Bounded Solutions to the One‐Dimensional Heat Conductive Compressible Navier‐Stokes Equations with Far Field Vacuum

Author

Jinkai Li and Zhouping Xin

Subjects

Entropy (classical thermodynamics), Applied Mathematics, General Mathematics, Bounded function, Degenerate energy levels, Mathematical analysis, Mathematics::Analysis of PDEs, Initial value problem, Uniform boundedness, Polytropic process, Type (model theory), Parabolic partial differential equation, Mathematics

Abstract

In the presence of vacuum, the physical entropy for polytropic gases behaves singularly and it is thus a challenge to study its dynamics. It is shown in this paper that the boundedness of the entropy can be propagated up to any finite time provided that the initial vacuum presents only at far fields with sufficiently slow decay of the initial density. More precisely, for the Cauchy problem of the one dimensional heat conductive compressible Navier-Stokes equations, the global well-posedness of strong solutions and uniform boundedness of the corresponding entropy are established, as long as the initial density vanishes only at far fields with a rate no more than $O(\frac{1}{x^2})$. The main tools of proving the uniform boundedness of the entropy are some singularly weighted energy estimates carefully designed for the heat conductive compressible Navier-Stokes equations and an elaborate De Giorgi type iteration technique for some classes of degenerate parabolic equations. The De Giorgi type iterations are carried out to different equations in establishing the lower and upper bounds of the entropy.

Published

2021

6. Well-posedness of the three-dimensional isentropic compressible Navier-Stokes equations with degenerate viscosities and far field vacuum

Author

Zhouping Xin and Shengguo Zhu

Subjects

Sobolev space, Viscosity, Applied Mathematics, General Mathematics, Open problem, Degenerate energy levels, Mathematical analysis, Compressibility, Regular solution, Initial value problem, Constant (mathematics), Mathematics

Abstract

In this paper, the Cauchy problem for the three-dimensional (3-D) isentropic compressible Navier-Stokes equations is considered. When viscosity coefficients are given as a constant multiple of the density's power ( ρ δ with 0 δ 1 ), based on some analysis of the nonlinear structure of this system, we identify a class of initial data admitting a local regular solution with far field vacuum and finite energy in some inhomogeneous Sobolev spaces by introducing some new variables and initial compatibility conditions, which solves an open problem of degenerate viscous flow partially mentioned by Bresh-Desjardins-Metivier [3] , Jiu-Wang-Xin [11] and so on. Moreover, in contrast to the classical theory in the case of the constant viscosity, we show that one cannot obtain any global regular solution whose L ∞ norm of u decays to zero as time t goes to infinity.

Published

2021

7. Steady compressible radially symmetric flows with nonzero angular velocity in an annulus

Author

Zhouping Xin, Shangkun Weng, and Hongwei Yuan

Subjects

76H05, 35M12, 35L65, 76N15, Astrophysics::High Energy Astrophysical Phenomena, FOS: Physical sciences, Angular velocity, 01 natural sciences, Physics::Fluid Dynamics, Mathematics - Analysis of PDEs, Inviscid flow, FOS: Mathematics, Annulus (firestop), Supersonic speed, Boundary value problem, 0101 mathematics, Astrophysics::Galaxy Astrophysics, Mathematics, Shock (fluid dynamics), Applied Mathematics, 010102 general mathematics, Fluid Dynamics (physics.flu-dyn), Symmetry in biology, Physics - Fluid Dynamics, Mechanics, 010101 applied mathematics, Transonic, Analysis, Analysis of PDEs (math.AP)

Abstract

In this paper, we investigate steady inviscid compressible flows with radial symmetry in an annulus. The major concerns are transonic flows with or without shocks. One of the main motivations is to elucidate the role played by the angular velocity in the structure of steady inviscid compressible flows. We give a complete classification of flow patterns in terms of boundary conditions at the inner and outer circle. Due to the nonzero angular velocity, many new flow patterns will appear. There exists accelerating or decelerating smooth transonic flows in an annulus satisfying one side boundary conditions at the inner or outer circle with all sonic points being nonexceptional and noncharacteristically degenerate. More importantly, it is found that besides the well-known supersonic-subsonic shock in a divergent nozzle as in the case without angular velocity, there exists a supersonic-supersonic shock solution, where the downstream state may change smoothly from supersonic to subsonic. Furthermore, there exists a supersonic-sonic shock solution where the shock circle and the sonic circle coincide, which is new and interesting., 22 pages

Published

2021

8. Structural Stability of the Transonic Shock Problem in a Divergent Three-Dimensional Axisymmetric Perturbed Nozzle

Author

Chunjing Xie, Zhouping Xin, and Shangkun Weng

Subjects

Astrophysics::High Energy Astrophysical Phenomena, Applied Mathematics, Nozzle, Mathematical analysis, Mathematics::Analysis of PDEs, Rotational symmetry, Euler system, 01 natural sciences, Shock (mechanics), Physics::Fluid Dynamics, 010101 applied mathematics, Computational Mathematics, Structural stability, 0101 mathematics, Choked flow, Transonic, Astrophysics::Galaxy Astrophysics, Analysis, Mathematics

Abstract

In this paper, we prove the structural stability of the transonic shocks for three-dimensional axisymmetric Euler system with swirl velocity under the perturbations for the incoming supersonic flow...

Published

2021

9. On Admissible Locations of Transonic Shock Fronts for Steady Euler Flows in an Almost Flat Finite Nozzle with Prescribed Receiver Pressure

Author

Zhouping Xin and Beixiang Fang

Subjects

35A01, 35A02, 35B20, 35B35, 35B65, 35J56, 35L65, 35L67, 35M30, 35M32, 35Q31, 35R35, 76L05, 76N10, Shock (fluid dynamics), Astrophysics::High Energy Astrophysical Phenomena, Applied Mathematics, General Mathematics, 010102 general mathematics, Nozzle, Mathematical analysis, Boundary (topology), Euler system, 01 natural sciences, Physics::Fluid Dynamics, 010104 statistics & probability, symbols.namesake, Mathematics - Analysis of PDEs, FOS: Mathematics, Free boundary problem, Euler's formula, symbols, Boundary value problem, 0101 mathematics, Transonic, Astrophysics::Galaxy Astrophysics, Analysis of PDEs (math.AP), Mathematics

Abstract

This paper concerns the existence of transonic shock solutions to the 2-D steady compressible Euler system in an almost flat finite nozzle ( in the sense that it is a generic small perturbation of a flat one ), under physical boundary conditions proposed by Courant-Friedrichs in \cite{CourantFriedrichs1948}, in which the receiver pressure is prescribed at the exit of the nozzle. In the resulting free boundary problem, the location of the shock-front is one of the most desirable information one would like to determine. However, the location of the normal shock-front in a flat nozzle can be anywhere in the nozzle so that it provides little information on the possible location of the shock-front when the nozzle's boundary is perturbed. So one of the key difficulties in looking for transonic shock solutions is to determine the shock-front. To this end, a free boundary problem for the linearized Euler system will be proposed, whose solution will be taken as an initial approximation for the transonic shock solution. In this paper, a sufficient condition in terms of the geometry of the nozzle and the given exit pressure is derived which yields the existence of the solutions to the proposed free boundary problem. Once an initial approximation is obtained, a further nonlinear iteration could be constructed and proved to lead to a transonic shock solution., 53 pages

Published

2020

10. On regular solutions for three-dimensional full compressible Navier-Stokes equations with degenerate viscosities and far field vacuum

Author

Qin Duan, Zhouping Xin, and Shengguo Zhu

Subjects

Mathematics (miscellaneous), Mathematics - Analysis of PDEs, Mechanical Engineering, FOS: Mathematics, 35Q30, 35A09, 35A01, 35B44, 35B40, 76N10, Analysis, Analysis of PDEs (math.AP)

Abstract

In this paper, the Cauchy problem for the three-dimensional (3-D) full compressible Navier-Stokes equations (CNS) with zero thermal conductivity is considered. First, when shear and bulk viscosity coefficients both depend on the absolute temperature $\theta$ in a power law ($\theta^\nu$ with $\nu>0$) of Chapman-Enskog, based on some elaborate analysis of this system's intrinsic singular structures, we identify one class of initial data admitting a local-in-time regular solution with far field vacuum in terms of the mass density $\rho$, velocity $u$ and entropy $S$. Furthermore, it is shown that within its life span of such a regular solution, the velocity stays in an inhomogeneous Sobolev space, i.e., $u\in H^3(\mathbb{R}^3)$, $S$ has uniformly finite lower and upper bounds in the whole space, and the laws of conservation of total mass, momentum and total energy are all satisfied. Note that due to the appearance of the vacuum, the momentum equations are degenerate both in the time evolution and viscous stress tensor, and the physical entropy for polytropic gases behaves singularly, which make the study on corresponding well-posedness challenging. For proving the existence, we first introduce an enlarged reformulated structure by considering some new variables, which can transfer the degeneracies of the full CNS to the possible singularities of some special source terms related with $S$, and then carry out some singularly weighted energy estimates carefully designed for this reformulated system., Comment: arXiv admin note: text overlap with arXiv:1811.04744

Published

2022

11. On scaling invariance and type-I singularities for the compressible Navier-Stokes equations

Author

Zhouping Xin and Zhen Lei

Subjects

General Mathematics, 010102 general mathematics, Mathematics::Analysis of PDEs, Type (model theory), 01 natural sciences, 010101 applied mathematics, Mathematics - Analysis of PDEs, Barotropic fluid, FOS: Mathematics, Compressibility, Gravitational singularity, 0101 mathematics, Compressible navier stokes equations, Adiabatic process, Scaling, Analysis of PDEs (math.AP), Mathematical physics, Mathematics

Abstract

We find a new scaling invariance of the barotropic compressible Navier-Stokes equations. Then it is shown that type-I singularities of solutions with $$\mathop {\lim \sup }\limits_{t \nearrow T} |div(t,x)|(T - t) \leqslant \kappa $$ can never happen at time T for all adiabatic number γ > 1. Here κ > 0 does not depend on the initial data. This is achieved by proving the regularity of solutions under $$\rho (t,x) \leqslant \frac{M}{{{{(T - t)}^\kappa }}},M < \infty .$$ This new scaling invariance also motivates us to construct an explicit type-II blowup solution for γ > 1.

Published

2019

12. On Some Smooth Symmetric Transonic Flows with Nonzero Angular Velocity and Vorticity

Author

Hongwei Yuan, Zhouping Xin, and Shangkun Weng

Subjects

Physics, 76H05, 35M12, 35L65, 76N15, Applied Mathematics, Mixed type, Angular velocity, Mechanics, Vorticity, Multiplier (Fourier analysis), Physics::Fluid Dynamics, Mathematics - Analysis of PDEs, Structural stability, Modeling and Simulation, Concentric cylinder, FOS: Mathematics, Transonic, Analysis of PDEs (math.AP)

Abstract

This paper concerns the structural stability of smooth cylindrically symmetric transonic flows in a concentric cylinder. Both cylindrical and axi-symmetric perturbations are considered. The governing system here is of mixed elliptic-hyperbolic and changes type and the suitable formulation of boundary conditions at the boundaries is of great importance. First, we establish the existence and uniqueness of smooth cylindrical transonic spiral solutions with nonzero angular velocity and vorticity which are close to the background transonic flow with small perturbations of the Bernoulli's function and the entropy at the outer cylinder and the flow angles at both the inner and outer cylinders independent of the symmetric axis, and it is shown that in this case, the sonic points of the flow are nonexceptional and noncharacteristically degenerate, and form a cylindrical surface. Second, we also prove the existence and uniqueness of axi-symmetric smooth transonic rotational flows which are adjacent to the background transonic flow, whose sonic points form an axi-symmetric surface. The key elements in our analysis are to utilize the deformation-curl decomposition for the steady Euler system introduced in \cite{WengXin19} to deal with the hyperbolicity in subsonic regions and to find an appropriate multiplier for the linearized second order mixed type equations which are crucial to identify the suitable boundary conditions and to yield the important basic energy estimates., 39 pages

Published

2021

13. Global Well-posedness of Free Interface Problems for the incompressible Inviscid Resistive MHD

Author

Yanjin Wang and Zhouping Xin

Subjects

Physics, Mathematics::Analysis of PDEs, FOS: Physical sciences, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Plasma, Mechanics, Vorticity, Conservative vector field, Magnetic field, Mathematics - Analysis of PDEs, Inviscid flow, Physics::Plasma Physics, FOS: Mathematics, Compressibility, Boundary value problem, Magnetohydrodynamics, Mathematical Physics, Analysis of PDEs (math.AP)

Abstract

We consider the plasma-vacuum interface problem in a horizontally periodic slab impressed by a uniform non-horizontal magnetic field. The lower plasma region is governed by the incompressible inviscid and resistive MHD, the upper vacuum region is governed by the pre-Maxwell equations, and the effect of surface tension is taken into account on the free interface. The global well-posedness of the problem, supplemented with physical boundary conditions, around the equilibrium is established, and the solution is shown to decay to the equilibrium almost exponentially. Our results reveal the strong stabilizing effect of the magnetic field as the global well-posedness of the free-boundary incompressible Euler equations, without the irrotational assumption, around the equilibrium is unknown. One of the key observations here is an induced damping structure for the fluid vorticity due to the resistivity and transversal magnetic field. A similar global well-posedness for the plasma-plasma interface problem is obtained, where the vacuum is replaced by another plasma., 60pp

Published

2020

14. Subsonic flows past a profile with a vortex line at the trailing edge

Author

Jun Chen, Zhouping Xin, and Aibin Zang

Subjects

Physics::Fluid Dynamics, Computational Mathematics, Mathematics - Analysis of PDEs, Applied Mathematics, FOS: Mathematics, Analysis, Analysis of PDEs (math.AP)

Abstract

We established the existence, uniqueness and stability of subsonic flows past an airfoil with a vortex line at the trailing edge. Such a flow pattern is governed by the two dimensional steady compressible Euler equations. The vortex line attached to the trailing edge is a contact discontinuity for the Euler system and is treated as a free boundary. The problem is formulated and solved by using the implicit function theorem. The main difficulties are due to the fitting of the vortex line with the profile at the trailing edge and the possible subtle instability of the vortex line at the far field. Suitable choices of the weights and elaborate barrier functions are found to deal with such difficulties.

Published

2020

15. Global entropy solutions to weakly nonlinear gas dynamics

Author

Peng Qu and Zhouping Xin

Subjects

Conservation law, General Mathematics, 010102 general mathematics, Gas dynamics, 01 natural sciences, 010101 applied mathematics, Nonlinear system, Bounded function, A priori and a posteriori, Applied mathematics, Uniqueness, 0101 mathematics, Approximate solution, Entropy (arrow of time), Mathematics

Abstract

Entropy weak solutions with bounded periodic initial data are considered for the system of weakly nonlinear gas dynamics. Through a modified Glimm scheme, an approximate solution sequence is constructed, and then a priori estimates are provided with the methods of approximate characteristics and approximate conservation laws, which gives not only the existence and uniqueness but also the uniform total variation bounds for the entropy solutions.

Published

2017

16. Asymptotic stability of shock profiles and rarefaction waves under periodic perturbations for 1-d convex scalar viscous conservation laws

Author

Zhouping Xin, Qian Yuan, and Yuan Yuan

Subjects

Mathematics - Analysis of PDEs, General Mathematics, FOS: Mathematics, 35L67(Primary) 35L65 76L05 (Secondary), Analysis of PDEs (math.AP)

Abstract

This paper studies the asymptotic stability of shock profiles and rarefaction waves under space-periodic perturbations for one-dimensional convex scalar viscous conservation laws. For the shock profile, we show that the solution approaches the background shock profile with a constant shift in the $ L^\infty(\mathbb{R}) $ norm at exponential rates. The new phenomena contrasting to the case of localized perturbations is that the constant shift cannot be determined by the initial excessive mass in general, which indicates that the periodic oscillations at infinities make contributions to this shift. And the vanishing viscosity limit for the shift is also shown. The key elements of the poof consist of the construction of an ansatz which tends to two periodic solutions as $ x \rightarrow \pm\infty, $ respectively, and the anti-derivative variable argument, and an elaborate use of the maximum principle. For the rarefaction wave, we also show the stability in the $ L^\infty(\mathbb{R}) $ norm., Comment: 43 pages, 3 figures

Published

2019

17. On an Elliptic Free Boundary Problem and Subsonic Jet Flows for a Given Surrounding Pressure

Author

Zhouping Xin and Chunpeng Wang

Subjects

Jet (fluid), Astrophysics::High Energy Astrophysical Phenomena, Applied Mathematics, Mathematical analysis, Nozzle, Mechanics, Solid wall, 01 natural sciences, 010101 applied mathematics, Physics::Fluid Dynamics, Computational Mathematics, Mathematics - Analysis of PDEs, Jet flow, Free boundary problem, Compressibility, FOS: Mathematics, 0101 mathematics, Analysis, Mathematics, Analysis of PDEs (math.AP)

Abstract

This paper concerns compressible subsonic jet flows for a given surrounding pressure from a two-dimensional finitely long convergent nozzle with straight solid wall, which are governed by a free boundary problem for a quasilinear elliptic equation. For a given surrounding pressure and a given incoming mass flux, we seek a subsonic jet flow with the given incoming mass flux such that the flow velocity at the inlet is along the normal direction, the flow satisfies the slip condition at the wall, and the pressure of the flow at the free boundary coincides with the given surrounding pressure. In general, the free boundary contains two parts: one is the particle path connected with the wall and the other is a level set of the velocity potential. We identify a suitable space of flows in terms of the minimal speed and the maximal velocity potential difference for the well-posedness of the problem. It is shown that there is an optimal interval such that there exists a unique subsonic jet flow in the space iff the length of the nozzle belongs to this interval. Furthermore, the optimal regularity and other properties of the flows are shown., Comment: accepted on SIAM J. Math. Anal

Published

2019

18. On nonlinear asymptotic stability of the Lane–Emden solutions for the viscous gaseous star problem

Author

Tao Luo, Zhouping Xin, and Huihui Zeng

Subjects

General Mathematics, Uniform convergence, 010102 general mathematics, Mathematical analysis, Boundary (topology), 01 natural sciences, Symmetry (physics), 010101 applied mathematics, Nonlinear system, Singularity, Free boundary problem, Uniform boundedness, Circular symmetry, 0101 mathematics, Mathematics

Abstract

This paper proves the nonlinear asymptotic stability of the Lane–Emden solutions for spherically symmetric motions of viscous gaseous stars if the adiabatic constant γ lies in the stability range ( 4 / 3 , 2 ) . It is shown that for small perturbations of a Lane–Emden solution with same mass, there exists a unique global (in time) strong solution to the vacuum free boundary problem of the compressible Navier–Stokes–Poisson system with spherical symmetry for viscous stars, and the solution captures the precise physical behavior that the sound speed is C 1 / 2 -Holder continuous across the vacuum boundary provided that γ lies in ( 4 / 3 , 2 ) . The key is to establish the global-in-time regularity uniformly up to the vacuum boundary, which ensures the large time asymptotic uniform convergence of the evolving vacuum boundary, density and velocity to those of the Lane–Emden solution with detailed convergence rates, and detailed large time behaviors of solutions near the vacuum boundary. In particular, it is shown that every spherical surface moving with the fluid converges to the sphere enclosing the same mass inside the domain of the Lane–Emden solution with a uniform convergence rate and the large time asymptotic states for the vacuum free boundary problem (1.1.2a) , (1.1.2b) , (1.1.2c) , (1.1.2d) , (1.1.2e) , (1.1.2f) are determined by the initial mass distribution and the total mass. To overcome the difficulty caused by the degeneracy and singular behavior near the vacuum free boundary and coordinates singularity at the symmetry center, the main ingredients of the analysis consist of combinations of some new weighted nonlinear functionals (involving both lower-order and higher-order derivatives) and space–time weighted energy estimates. The constructions of these weighted nonlinear functionals and space–time weights depend crucially on the structures of the Lane–Emden solution, the balance of pressure and gravitation, and the dissipation. Finally, the uniform boundedness of the acceleration of the vacuum boundary is also proved.

Published

2016

19. On formation of singularity for non-isentropic Navier-Stokes equations without heat-conductivity

Author

Zhouping Xin and Xiangdi Huang

Subjects

Physics, Large class, Isentropic process, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, 01 natural sciences, 35Q35, 35B65, 76N10, 010101 applied mathematics, Continuation, Mathematics - Analysis of PDEs, Thermal conductivity, Singularity, Simple (abstract algebra), FOS: Mathematics, Discrete Mathematics and Combinatorics, 0101 mathematics, Finite time, Navier–Stokes equations, Analysis, Analysis of PDEs (math.AP)

Abstract

It is known that smooth solutions to the non-isentropic Navier-Stokes equations without heat-conductivity may lose their regularities in finite time in the presence of vacuum. However, in spite of the recent progress on such blowup phenomenon, it remain to give a possible blowup mechanism. In this paper, we present a simple continuation principle for such system, which asserts that the concentration of the density or the temperature occurs in finite time for a large class of smooth initial data, which is responsible for the breakdown of classical solutions. It also give an affirmative answer to a strong version of conjecture proposed by J.Nash in 1950s, 17 pages. arXiv admin note: substantial text overlap with arXiv:1210.5930

Published

2016

20. On the uniqueness of weak solutions to the Ericksen–Leslie liquid crystal model in ℝ2

Author

Edriss S. Titi, Jinkai Li, and Zhouping Xin

Subjects

Applied Mathematics, Weak solution, 010102 general mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, 01 natural sciences, 010101 applied mathematics, Stress (mechanics), Liquid crystal, Modeling and Simulation, Initial value problem, Order (group theory), Uniqueness, 0101 mathematics, Constant (mathematics), Mathematics

Abstract

This paper concerns the uniqueness of weak solutions to the Cauchy problem to the Ericksen–Leslie system of liquid crystal models in [Formula: see text], with both general Leslie stress tensors and general Oseen–Frank density. It is shown here that such a system admits a unique weak solution provided that the Frank coefficients are close to some positive constant. One of the main ideas of our proof is to perform suitable energy estimates at the level one order lower than the natural basic energy estimates for the Ericksen–Leslie system.

Published

2016

21. Entropy bounded solutions to the one-dimensional compressible Navier-Stokes equations with zero heat conduction and far field vacuum

Author

Zhouping Xin and Jinkai Li

Subjects

Sobolev space, General Mathematics, Bounded function, Mathematical analysis, Uniform boundedness, Initial value problem, Uniqueness, Thermal conduction, Entropy (arrow of time), Ideal gas, Mathematics

Abstract

The entropy is one of the fundamental states of a fluid and, in the viscous case, the equation that it satisfies is highly singular in the region close to the vacuum. In spite of its importance in the gas dynamics, the mathematical analyses on the behavior of the entropy near the vacuum region, were rarely carried out; in particular, in the presence of vacuum, either at the far field or at some isolated interior points, it was unknown whether the entropy remains its boundedness. The results obtained in this paper indicate that the ideal gases retain their uniform boundedness of the entropy, locally or globally in time, if the vacuum occurs at the far field only and the density decays slowly enough at the far field. Precisely, we consider the Cauchy problem to the one-dimensional full compressible Navier-Stokes equations without heat conduction, and establish the local and global existence and uniqueness of entropy-bounded solutions, in the presence of vacuum at the far field only. It is also shown that, different from the case that with compactly supported initial density, the compressible Navier-Stokes equations, with slowly decaying initial density, can propagate the regularities in inhomogeneous Sobolev spaces.

Published

2020

22. Global well-posedness of regular solutions to the three-dimensional isentropic compressible Navier-Stokes Equations with degenerate viscosities and vacuum

Author

Zhouping Xin and Shengguo Zhu

Subjects

Isentropic process, General Mathematics, Degenerate energy levels, Mathematical analysis, Vacuum state, Space (mathematics), Viscosity, Mathematics - Analysis of PDEs, Flow velocity, FOS: Mathematics, Compressibility, Initial value problem, 35B40, 35A05, 76Y05, 35B35, 35L65, Analysis of PDEs (math.AP), Mathematics

Abstract

In this paper, the Cauchy problem for the three-dimensional (3-D) isentropic compressible Navier-Stokes equations with degenerate viscosities is considered. By introducing some new variables and making use of the “quasi-symmetric hyperbolic”–“degenerate elliptic” coupled structure to control the behavior of the fluid velocity, we prove the global-in-time well-posedness of regular solutions with vacuum for a class of smooth initial data that are of small density but possibly large velocities. Here the initial mass density is required to decay to zero in the far field, and the spectrum of the Jacobi matrix of the initial velocity are all positive. The result here applies to a class of degenerate density-dependent viscosity coefficients, is independent of the BD-entropy, and seems to be the first on the global existence of smooth solutions which have large velocities and contain vacuum state for such degenerate system in three space dimensions.

Published

2018

23. Incompressible impinging jet flow with gravity

Author

Jianfeng Cheng, Lili Du, and Zhouping Xin

Subjects

Physics::Fluid Dynamics, Mathematics - Analysis of PDEs, Applied Mathematics, FOS: Mathematics, Analysis, Analysis of PDEs (math.AP)

Abstract

In this paper, we investigate steady two-dimensional free-surface flows of an inviscid and incompressible fluid emerging from a nozzle, falling under gravity and impinging onto a horizontal wall. More precisely, for any given atmosphere pressure $p_{atm}$ and any appropriate incoming total flux $Q$, we establish the existence of two-dimensional incompressible impinging jet with gravity. The two free surfaces initiate smoothly at the endpoints of the nozzle and become to be horizontal in downstream. By transforming the free boundary problem into a minimum problem, we establish the properties of the flow region and the free boundaries. Moreover, the asymptotic behavior of the impinging jet in upstream and downstream is also obtained., Comment: 53 Pages

Published

2018

24. Asymptotic stability of shock waves and rarefaction waves under periodic perturbations for 1-D convex scalar conservation laws

Author

Qian Yuan, Zhouping Xin, and Yuan Yuan

Subjects

Shock wave, Conservation law, Applied Mathematics, Mathematical analysis, Scalar (mathematics), Regular polygon, 01 natural sciences, 010101 applied mathematics, Computational Mathematics, Mathematics - Analysis of PDEs, Exponential stability, Periodic perturbation, FOS: Mathematics, 0101 mathematics, Analysis, Mathematics, Analysis of PDEs (math.AP)

Abstract

In this paper we study large time behaviors toward shock waves and rarefaction waves under periodic perturbations for 1-D convex scalar conservation laws. The asymptotic stabilities and decay rates of shock waves and rarefaction waves under periodic perturbations are proved.

Published

2018

25. Optimal decay for the compressible Navier-Stokes equations without additional smallness assumptions

Author

Zhouping Xin and Jiang Xu

Subjects

Work (thermodynamics), Applied Mathematics, 010102 general mathematics, Mathematical analysis, 01 natural sciences, 010101 applied mathematics, Sobolev space, Mathematics - Analysis of PDEs, Product (mathematics), Barotropic fluid, Compressibility, FOS: Mathematics, 76N15, 35Q30, 35L65, 35K65, Spectral analysis, 0101 mathematics, Compressible navier stokes equations, Analysis, Energy (signal processing), Mathematics, Analysis of PDEs (math.AP)

Abstract

This work is concerned with the large time behavior of solutions to the barotropic compressible Navier-Stokes equations in $\mathbb{R}^{d}(d\geq2)$. Precisely, it is shown that if the initial density and velocity additionally belong to some Besov space $\dot{B}^{-\sigma_1}_{2,\infty}$ with $\sigma_1\in (1-d/2, 2d/p-d/2]$, then the $L^p$ norm (the slightly stronger $\dot{B}^{0}_{p,1}$ norm in fact) of global solutions admits the optimal decay $t^{-\frac{d}{2}(\frac 12-\frac 1p)-\frac{\sigma_1}{2}}$ for $t\rightarrow+\infty$. In contrast to refined time-weighted approaches ([11,43]), a pure energy argument (independent of the spectral analysis) has been developed in more general $L^p$ critical framework, which allows to remove the smallness of low frequencies of initial data. Indeed, bounding the evolution of $\dot{B}^{-\sigma_1}_{2,\infty}$-norm restricted in low frequencies is the key ingredient, whose proof mainly depends on non standard $L^p$ product estimates with respect to different Sobolev embeddings. The result can hold true in case of large highly oscillating initial velocities., Comment: 26 pages

Published

2018

26. Remarks on blow-up of smooth solutions to the compressible fluid with constant and degenerate viscosities

Author

Yuexun Wang, Zhouping Xin, and Quansen Jiu

Subjects

Isentropic process, Applied Mathematics, Mathematical analysis, Degenerate energy levels, Mathematics::Analysis of PDEs, Thermal conduction, Compressible flow, Euler equations, Physics::Fluid Dynamics, symbols.namesake, Mathematics - Analysis of PDEs, FOS: Mathematics, symbols, Compressibility, Initial value problem, Constant (mathematics), Analysis, Analysis of PDEs (math.AP), Mathematics

Abstract

In this paper, we will show the blow-up of smooth solutions to the Cauchy problem for the full compressible Navier–Stokes equations and isentropic compressible Navier–Stokes equations with constant and degenerate viscosities in arbitrary dimensions under some restrictions on the initial data. In particular, the results hold true for the full compressible Euler equations and isentropic compressible Euler equations and the blow-up time can be computed in a more precise way. It is not required that the initial data has compact support or contains vacuum in any finite regions. Moreover, we will give a simplified and unified proof on the blow-up results to the classical solutions of the full compressible Navier–Stokes equations without heat conduction by Xin [41] and with heat conduction by Cho–Jin [5] .

Published

2015

27. Non-Existence of Classical Solutions with Finite Energy to the Cauchy Problem of the Compressible Navier-Stokes Equations

Author

Hai-Liang Li, Zhouping Xin, and Yuexun Wang

Subjects

Cauchy problem, Cauchy number, Mechanical Engineering, 010102 general mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, 01 natural sciences, Euler equations, 010101 applied mathematics, Sobolev space, Physics::Fluid Dynamics, symbols.namesake, Arbitrarily large, Mathematics (miscellaneous), Mathematics - Analysis of PDEs, Compressibility, symbols, FOS: Mathematics, Initial value problem, Boundary value problem, 0101 mathematics, Analysis, Mathematics, Analysis of PDEs (math.AP)

Abstract

The well-posedness of classical solutions with finite energy to the compressible Navier–Stokes equations (CNS) subject to arbitrarily large and smooth initial data is a challenging problem. In the case when the fluid density is away from vacuum (strictly positive), this problem was first solved for the CNS in either one-dimension for general smooth initial data or multi-dimension for smooth initial data near some equilibrium state (that is, small perturbation) (Antontsev et al. in Boundary value problems in mechanics of nonhomogeneous fluids, North-Holland Publishing Co., Amsterdam, 1990; Kazhikhov in Sibirsk Mat Zh 23:60–64, 1982; Kazhikhov et al. in Prikl Mat Meh 41:282–291, 1977; Matsumura and Nishida in Proc Jpn Acad Ser A Math Sci 55:337–342, 1979, J Math Kyoto Univ 20:67–104, 1980, Commun Math Phys 89:445–464, 1983). In the case that the flow density may contain a vacuum (the density can be zero at some space-time point), it seems to be a rather subtle problem to deal with the well-posedness problem for CNS. The local well-posedness of classical solutions containing a vacuum was shown in homogeneous Sobolev space (without the information of velocity in L2-norm) for general regular initial data with some compatibility conditions being satisfied initially (Cho et al. in J Math Pures Appl (9) 83:243–275, 2004; Cho and Kim in J Differ Equ 228:377–411, 2006, Manuscr Math 120:91–129, 2006; Choe and Kim in J Differ Equ 190:504–523 2003), and the global existence of a classical solution in the same space is established under the additional assumption of small total initial energy but possible large oscillations (Huang et al. in Commun Pure Appl Math 65:549–585, 2012). However, it was shown that any classical solutions to the compressible Navier–Stokes equations in finite energy (inhomogeneous Sobolev) space cannot exist globally in time since it may blow up in finite time provided that the density is compactly supported (Xin in Commun Pure Appl Math 51:229–240, 1998). In this paper, we investigate the well-posedess of classical solutions to the Cauchy problem of Navier–Stokes equations, and prove that the classical solution with finite energy does not exist in the inhomogeneous Sobolev space for any short time under some natural assumptions on initial data near the vacuum. This implies, in particular, that the homogeneous Sobolev space is as crucial as studying the well-posedness for the Cauchy problem of compressible Navier–Stokes equations in the presence of a vacuum at far fields even locally in time.

Published

2017

28. Global in Time Stability of Steady Shocks in Nozzles

Author

Chunjing Xie, Zhouping Xin, and Jeffrey Rauch

Subjects

Physics, Nozzle, General Medicine, Mechanics, Stability (probability)

Published

2014

29. Blow-up Criteria of Strong Solutions to the Ericksen-Leslie System in ℝ3

Author

Min-Chun Hong, Jinkai Li, and Zhouping Xin

Subjects

Strong solutions, Constraint (information theory), Type condition, Applied Mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, Mixed type, Field (mathematics), Type (model theory), Direction vector, Analysis, Mathematics

Abstract

In this paper, we establish the local well-posedness and blow-up criteria of strong solutions to the Ericksen-Leslie system in ℝ3 for the well-known Oseen-Frank model. The local existence of strong solutions to liquid crystal flows is obtained by using the Ginzburg-Landau approximation approach to guarantee the constraint that the direction vector of the fluid is of length one. We establish four kinds of blow-up criteria, including (i) the Serrin type; (ii) the Beal-Kato-Majda type; (iii) the mixed type, i.e., Serrin type condition for one field and Beal-Kato-Majda type condition on the other one; (iv) a new one, which characterizes the maximal existence time of the strong solutions to the Ericksen-Leslie system in terms of Serrin type norms of the strong solutions to the Ginzburg-Landau approximate system. Furthermore, we also prove that the strong solutions of the Ginzburg-Landau approximate system converge to the strong solution of the Ericksen-Leslie system up to the maximal existence time.

Published

2014

30. Well-Posedness for the Motion of Physical Vacuum of the Three-dimensional Compressible Euler Equations with or without Self-Gravitation

Author

Tao Luo, Huihui Zeng, and Zhouping Xin

Subjects

Physics, Mechanical Engineering, Mathematical analysis, Euler equations, symbols.namesake, Mathematics - Analysis of PDEs, Mathematics (miscellaneous), Uniqueness theorem for Poisson's equation, FOS: Mathematics, Compressibility, Functional space, symbols, Cutoff, Self-gravitation, Analysis, Well posedness, Analysis of PDEs (math.AP)

Abstract

This paper concerns the well-posedness theory of the motion of physical vacuum for the compressible Euler equations with or without self-gravitation. First, a general uniqueness theorem of classical solutions is proved for the three dimensional general motion. Second, for the spherically symmetric motions, without imposing the compatibility condition of the first derivative being zero at the center of symmetry, a new local-in-time existence theory is established in a functional space involving less derivatives than those constructed for three-dimensional motions in \cite{10',7,16'} by constructing suitable weights and cutoff functions featuring the behavior of solutions near both the center of the symmetry and the moving vacuum boundary., Comment: To appear in Arch. Rational Mech. Anal

Published

2014

31. Global Well-Posedness of 2D Compressible Navier–Stokes Equations with Large Data and Vacuum

Author

Quansen Jiu, Yi Wang, and Zhouping Xin

Subjects

Applied Mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, Open set, Torus, Volume viscosity, Condensed Matter Physics, Physics::Fluid Dynamics, Computational Mathematics, Arbitrarily large, Compressibility, Periodic boundary conditions, Constant (mathematics), Power function, Mathematical Physics, Mathematics

Abstract

In this paper, we study the global well-posedness of the 2D compressible Navier–Stokes equations with large initial data and vacuum. It is proved that if the shear viscosity μ is a positive constant and the bulk viscosity λ is the power function of the density, that is, λ(ρ) = ρ β with β > 3, then the 2D compressible Navier–Stokes equations with the periodic boundary conditions on the torus $${\mathbb{T}^2}$$ admit a unique global classical solution (ρ, u) which may contain vacuums in an open set of $${\mathbb{T}^2}$$ . Note that the initial data can be arbitrarily large to contain vacuum states.

Published

2014

32. Global well-posedness of the Cauchy problem of two-dimensional compressible Navier–Stokes equations in weighted spaces

Author

Yi Wang, Zhouping Xin, and Quansen Jiu

Subjects

Cauchy problem, Applied Mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, Volume viscosity, Space (mathematics), Physics::Fluid Dynamics, Arbitrarily large, Viscosity, Flow (mathematics), Initial value problem, Constant (mathematics), Analysis, Mathematics

Abstract

In this paper, we study the global well-posedness of classical solution to 2D Cauchy problem of the compressible Navier–Stokes equations with large initial data and vacuum. It is proved that if the shear viscosity μ is a positive constant and the bulk viscosity λ is the power function of the density, that is, λ ( ρ ) = ρ β with β > 3 , then the 2D Cauchy problem of the compressible Navier–Stokes equations on the whole space R 2 admits a unique global classical solution ( ρ , u ) which may contain vacuums in an open set of R 2 . Note that the initial data can be arbitrarily large to contain vacuum states. Various weighted estimates of the density and velocity are obtained in this paper and these self-contained estimates reflect the fact that the weighted density and weighted velocity propagate along with the flow.

Published

2013

33. On the Inviscid Limit of the 3D Navier–Stokes Equations with Generalized Navier-Slip Boundary Conditions

Author

Yuelong Xiao and Zhouping Xin

Subjects

Statistics and Probability, Applied Mathematics, Mathematical analysis, Slip (materials science), Euler equations, Physics::Fluid Dynamics, Computational Mathematics, symbols.namesake, Inviscid flow, Bounded function, Compressibility, symbols, Boundary value problem, Navier–Stokes equations, Mathematics

Abstract

In this paper, we investigate the vanishing viscosity limit problem for the 3-dimensional (3D) incompressible Navier–Stokes equations in a general bounded smooth domain of R3 with the generalized Navier-slip boundary conditions \(u^{\varepsilon}\cdot n = 0,\ n\times(\omega^{\varepsilon}) = [B u^{\varepsilon}]_{\tau}\ {\rm on} \ \partial\varOmega\). Some uniform estimates on rates of convergence in C([0,T],L2(Ω)) and C([0,T],H1(Ω)) of the solutions to the corresponding solutions of the ideal Euler equations with the standard slip boundary condition are obtained.

Published

2013

34. Preface

Author

Tong Yang and Zhouping Xin

Subjects

Applied Mathematics, Discrete Mathematics and Combinatorics, Analysis

Published

2016

35. Stability analysis for the incompressible Navier-Stokes equations with Navier boundary conditions

Author

Quanrong Li, Zhouping Xin, and Shijin Ding

Subjects

Physics, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Slip (materials science), Condensed Matter Physics, 01 natural sciences, Instability, 010101 applied mathematics, Physics::Fluid Dynamics, Computational Mathematics, Nonlinear system, 76N10, 35Q30, 35R35, Mathematics - Analysis of PDEs, Exponential stability, FOS: Mathematics, Compressibility, Dissipative system, Boundary value problem, 0101 mathematics, Navier–Stokes equations, Mathematical Physics, Analysis of PDEs (math.AP)

Abstract

This paper concerns the instability and stability of the trivial steady states of the incompressible Navier-Stokes equations with Navier-slip boundary conditions in a slab domain in dimension two. The main results show that the stability (or instability) of this constant equilibrium depends crucially on whether the boundaries dissipate energy and the strengthen of the viscosity and slip length. It is shown that in the case that when all the boundaries are dissipative, then nonlinear asymptotic stability holds true, otherwise, there is a sharp critical viscosity, which distinguishes the nonlinear stability from instability., 35 pages

Published

2016

36. On Blowup of Classical Solutions to the Compressible Navier-Stokes Equations

Author

Zhouping Xin and Wei Yan

Subjects

Group (mathematics), Mathematical analysis, Mathematics::Analysis of PDEs, Statistical and Nonlinear Physics, Thermal conduction, Compressible flow, Mathematics - Analysis of PDEs, Bounded function, FOS: Mathematics, Compressibility, Total energy, Compressible navier stokes equations, Finite time, Mathematical Physics, Analysis of PDEs (math.AP), Mathematics

Abstract

We study the finite time blow up of smooth solutions to the Compressible Navier-Stokes system when the initial data contain vacuums. We prove that any classical solutions of viscous compressible fluids without heat conduction will blow up in finite time, as long as the initial data has an isolated mass group (see definition in the paper). The results hold regardless of either the size of the initial data or the far fields being vacuum or not. This improves the blowup results of Xin (1998) by removing the crucial assumptions that the initial density has compact support and the smooth solution has finite total energy. Furthermore, the analysis here also yields that any classical solutions of viscous compressible fluids without heat conduction in bounded domains or periodic domains will blow up in finite time, if the initial data have an isolated mass group satisfying some suitable conditions., Comment: 13 pages, Submitted

Published

2012

37. Global existence of solutions of the liquid crystal flow for the Oseen–Frank model in R2

Author

Zhouping Xin and Min-Chun Hong

Subjects

General Mathematics, 010102 general mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, Harmonic map, Geometry, 01 natural sciences, Physics::Fluid Dynamics, 010101 applied mathematics, Flow (mathematics), Liquid crystal, 0101 mathematics, Hydrodynamic theory, Heat flow, Mathematics

Abstract

In the first part of this paper, we establish the global existence of solutions of the liquid crystal (gradient) flow for the well-known Oseen–Frank model. The liquid crystal flow is a prototype of equations from the Ericksen–Leslie system in the hydrodynamic theory and generalizes the heat flow for harmonic maps into the 2-sphere. The Ericksen–Leslie system is a system of the Navier–Stokes equations coupled with the liquid crystal flow. In the second part of this paper, we also prove the global existence of solutions of the Ericksen–Leslie system for a general Oseen–Frank model in R 2 .

Published

2012

38. Analytical solutions to the compressible Navier–Stokes equations with density-dependent viscosity coefficients and free boundaries

Author

Zhenhua Guo and Zhouping Xin

Subjects

Physics, Analytical solution, Applied Mathematics, Mathematical analysis, Compressible Navier–Stokes equations, Center (group theory), Polytropic process, Compressible flow, Symmetry (physics), Physics::Fluid Dynamics, Viscosity, Classical mechanics, Density dependent, Density-dependent, Compressibility, Vector field, Analysis

Abstract

In this paper, we study a class of analytical solutions to the compressible Navier–Stokes equations with density-dependent viscosity coefficients, which describe compressible fluids moving into outer vacuum. For suitable viscous polytropic fluids, we construct a class of radial symmetric and self-similar analytical solutions in R N ( N ⩾ 2 ) with both continuous density condition and the stress free condition across the free boundaries separating the fluid from vacuum. Such solutions exhibit interesting new information such as the formation of vacuum at the center of the symmetry as time tends to infinity and explicit regularities and large time decay estimates of the velocity field.

Published

2012

39. Global well-posedness of classical solutions with large oscillations and vacuum to the three-dimensional isentropic compressible Navier-Stokes equations

Author

Xiangdi Huang, Jing Li, and Zhouping Xin

Subjects

35Q30, 76N10, Isentropic process, Applied Mathematics, General Mathematics, Mathematical analysis, FOS: Physical sciences, Mathematical Physics (math-ph), State (functional analysis), Measure (mathematics), Arbitrarily large, Compressibility, Initial value problem, Uniqueness, Constant (mathematics), Mathematical Physics, Mathematics

Abstract

We establish the global existence and uniqueness of classical solutions to the Cauchy problem for the isentropic compressible Navier-Stokes equations in three spatial dimensions with smooth initial data which are of small energy but possibly large oscillations with constant state as far field which could be either vacuum or non-vacuum. The initial density is allowed to vanish and the spatial measure of the set of vacuum can be arbitrarily large, in particular, the initial density can even have compact support. These results generalize previous results on classical solutions for initial densities being strictly away from vacuum, and are the first for global classical solutions which may have large oscillations and can contain vacuum states., 30 pages

Published

2011

40. Analyticity of the semigroup associated with the fluid–rigid body problem and local existence of strong solutions

Author

Yun Wang and Zhouping Xin

Subjects

Strong solutions, Linear map, Navier–Stokes equations, Semigroup, Mathematical analysis, Fluid–rigid body system, Ball (mathematics), Rigid body, Exterior domain, Analysis, Mathematics

Abstract

In this paper, we study the linear operator associated with the fluid–rigid body problem. The operator was first introduced by T. Takahashi and M. Tucsnak (2004) [22] . For the general three-dimensional case, we prove that the corresponding semigroup is analytic on L 6 5 ( R 3 ) ∩ L p ( R 3 ) ( p ⩾ 2 ) . In particular, when the solid is a ball in R 3 , the corresponding semigroup is analytic on L 2 ( R 3 ) ∩ L p ( R 3 ) ( p ⩾ 6 ) . And for this case, a unique local strong solution to the fluid–rigid body problem is derived.

Published

2011

41. Subsonic Flows in a Multi-Dimensional Nozzle

Author

Lili Du, Zhouping Xin, and Wei Yan

Subjects

Mass flux, Mechanical Engineering, Nozzle, Mathematical analysis, Mathematics::Analysis of PDEs, Conservative vector field, Physics::Fluid Dynamics, Elliptic curve, Mathematics - Analysis of PDEs, Mathematics (miscellaneous), Flow (mathematics), Inviscid flow, FOS: Mathematics, Uniqueness, Calculus of variations, Analysis, Analysis of PDEs (math.AP), Mathematics

Abstract

In this paper, we study the global subsonic irrotational flows in a multi-dimensional ($n\geq 2$) infinitely long nozzle with variable cross sections. The flow is described by the inviscid potential equation, which is a second order quasilinear elliptic equation when the flow is subsonic. First, we prove the existence of the global uniformly subsonic flow in a general infinitely long nozzle for arbitrary dimension for sufficiently small incoming mass flux and obtain the uniqueness of the global uniformly subsonic flow. Furthermore, we show that there exists a critical value of the incoming mass flux such that a global uniformly subsonic flow exists uniquely, provided that the incoming mass flux is less than the critical value. This gives a positive answer to the problem of Bers on global subsonic irrotational flows in infinitely long nozzles for arbitrary dimension. Finally, under suitable asymptotic assumptions of the nozzle, we obtain the asymptotic behavior of the subsonic flow in far fields by a blow-up argument. The main ingredients of our analysis are methods of calculus of variations, the Moser iteration techniques for the potential equation and a blow-up argument for infinitely long nozzles., Comment: to appear in Arch. Rational Mech. Anal

Published

2011

42. Stability of Rarefaction Waves to the 1D Compressible Navier–Stokes Equations with Density-Dependent Viscosity

Author

Zhouping Xin, Yi Wang, and Quansen Jiu

Subjects

35L60, 35L65, Isentropic process, Applied Mathematics, Weak solution, Mathematical analysis, Mathematics::Analysis of PDEs, Rarefaction, Stability (probability), Viscosity, Mathematics - Analysis of PDEs, Exponential stability, FOS: Mathematics, Compressibility, Initial value problem, Analysis, Analysis of PDEs (math.AP), Mathematics

Abstract

In this paper, we study the asymptotic stability of rarefaction waves for the compressible isentropic Navier-Stokes equations with density-dependent viscosity. First, a weak solution around a rarefaction wave to the Cauchy problem is constructed by approximating the system and regularizing the initial values which may contain vacuum state. Then some global in time estimates on the weak solution are obtained. Based on these uniform estimates, the vacuum states are shown to vanish in finite time and the weak solution we constructed becomes a unique strong one. Consequently, the stability of the rarefaction wave is proved in a weak sense. The theory holds for large-amplitudes rarefaction waves and arbitrary initial perturbations., Comment: 30 pages

Published

2011

43. Serrin-Type Criterion for the Three-Dimensional Viscous Compressible Flows

Author

Zhouping Xin, Jing Li, and Xiangdi Huang

Subjects

Applied Mathematics, Shear viscosity, Mathematical analysis, Mathematics::Analysis of PDEs, Type (model theory), Space (mathematics), Physics::Fluid Dynamics, Computational Mathematics, Bounded function, Compressibility, Initial value problem, Compressible navier stokes equations, Divergence (statistics), Analysis, Mathematics

Abstract

We extend the well-known Serrin's blowup criterion for the three-dimensional (3D) incompressible Navier–Stokes equations to the 3D viscous compressible cases. It is shown that for the Cauchy problem of the 3D compressible Navier–Stokes equations in the whole space, the strong or smooth solution exists globally if the velocity satisfies the Serrin's condition and either the supernorm of the density or the $L^1(0,T;L^\infty)$-norm of the divergence of the velocity is bounded. Furthermore, in the case that either the shear viscosity coefficient is suitably large or there is no vacuum, the Serrin's condition on the velocity can be removed in this criterion.

Published

2011

44. Blowup Criterion for Viscous Baratropic Flows with Vacuum States

Author

Jing Li, Zhouping Xin, and Xiangdi Huang

Subjects

Physics::Fluid Dynamics, Critical time, Deformation tensor, Norm (mathematics), Barotropic fluid, Mathematical analysis, Mathematics::Analysis of PDEs, Complex system, Compressibility, Statistical and Nonlinear Physics, Incompressible euler equations, Mathematical Physics, Mathematics

Abstract

We prove that the maximum norm of the deformation tensor of velocity gradients controls the possible breakdown of smooth(strong) solutions for the 3-dimensional (3D) barotropic compressible Navier-Stokes equations. More precisely, if a solution of the 3D barotropic compressible Navier-Stokes equations is initially regular and loses its regularity at some later time, then the loss of regularity implies the growth without bound of the deformation tensor as the critical time approaches. Our result is the same as Ponce’s criterion for 3-dimensional incompressible Euler equations (Ponce in Commun Math Phys 98:349–353, 1985). In addition, initial vacuum states are allowed in our cases.

Published

2010

45. The existence and monotonicity of a three-dimensional transonic shock in a finite nozzle with axisymmetric exit pressure

Author

Jun Li, Huicheng Yin, and Zhouping Xin

Subjects

Astrophysics::High Energy Astrophysical Phenomena, General Mathematics, Nozzle, Rotational symmetry, Geometry, Mechanics, Euler system, Shock (mechanics), Shock position, Position (vector), Axial symmetry, Transonic, Astrophysics::Galaxy Astrophysics, Mathematics

Abstract

We establish the existence of a multidimensional transonic shock solution in a class of slowly varying nozzles for the three dimensional steady full Euler system with axially symmetric exit pressure in the diverging part lying in an appropriate scope. We also show that the shock position depends monotonically on the exit pressure.

Published

2010

46. A blow-up criterion for classical solutions to the compressible Navier-Stokes equations

Author

Xiangdi Huang and Zhouping Xin

Subjects

Physics::Fluid Dynamics, Physics, Ideal (set theory), Incompressible flow, 35Q30, General Mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, Compressibility, FOS: Physical sciences, Mathematical Physics (math-ph), Compressible navier stokes equations, Mathematical Physics

Abstract

In this paper, we obtain a blow up criterion for classical solutions to the 3-D compressible Naiver-Stokes equations just in terms of the gradient of the velocity, similar to the Beal-Kato-Majda criterion for the ideal incompressible flow. In addition, initial vacuum is allowed in our case., Comment: 25 pages

Published

2010

47. On transonic shocks in a conic divergent nozzle with axi-symmetric exit pressures

Author

Huicheng Yin, Jun Li, and Zhouping Xin

Subjects

Shock (fluid dynamics), Applied Mathematics, Nozzle, Flow (psychology), Geometry, Mechanics, Euler system, First order elliptic system with nonlocal terms and singular source terms, Steady Euler system, Conic section, Transonic shock, Fredholm alternative, Compressibility, Supersonic speed, Transonic, Conic divergent nozzle, Analysis, Mathematics

Abstract

In this paper, we establish the existence and stability of a 3-D transonic shock solution to the full steady compressible Euler system in a class of de Laval nozzles with a conic divergent part when a given variable axi-symmetric exit pressure lies in a suitable scope. Thus, for this class of nozzles, we have solved such a transonic shock problem in the axi-symmetric case described by Courant and Friedrichs (1948) in Section 147 of [8] : Given the appropriately large exit pressure p e ( x ) , if the upstream flow is still supersonic behind the throat of the nozzle, then at a certain place in the diverging part of the nozzle a shock front intervenes and the gas is compressed and slowed down to subsonic speed so that the position and the strength of the shock front are automatically adjusted such that the end pressure at the exit becomes p e ( x ) .

Published

2010

48. Vanishing viscosity limit for the 3D magnetohydrodynamic system with a slip boundary condition

Author

Zhouping Xin, Jiahong Wu, and Yuelong Xiao

Subjects

010102 general mathematics, Mathematical analysis, Slip (materials science), 01 natural sciences, 010101 applied mathematics, Physics::Fluid Dynamics, Viscosity, Vanishing viscosity limit, Magnetohydrodynamic system, Bounded function, Magnetohydrodynamic drive, Boundary value problem, 0101 mathematics, Slip boundary condition, Analysis, Mathematics

Abstract

This work investigates the solvability, regularity and vanishing viscosity limit of the 3D viscous magnetohydrodynamic system in a class of bounded domains with a slip boundary condition.

Published

2009

49. A free boundary value problem for the full Euler system and 2-d transonic shock in a large variable nozzle

Author

Huicheng Yin, Zhouping Xin, and Jun Li

Subjects

Astrophysics::High Energy Astrophysical Phenomena, General Mathematics, Rocket engine nozzle, Nozzle, Boundary (topology), Geometry, Mechanics, Euler system, Shock (mechanics), Physics::Fluid Dynamics, Uniqueness, Boundary value problem, Transonic, Astrophysics::Galaxy Astrophysics, Mathematics

Abstract

In this paper, we establish the existence and uniqueness of a transonic shock solution to the full steady compressible Euler system in a class of de Laval nozzles with a large straight divergent part when a given variable exit pressure lies in a suitable range. Thus, for this class of nozzles, we have solved the transonic shock problem posed by Courant-Friedrichs in Section 147 of (5). By introducing a new elaborate iteration scheme, we are able to solve this boundary value problem for a coupled elliptic-hyperbolic system with a free boundary without some stringent requirements in the previous studies. One of the key ingredients in this approach is to solve a boundary value problem for a first order linear system with nonlocal terms and a free parameter. In this paper, we focus on the existence and uniqueness of a transonic shock solu- tion in a de Laval nozzle with a large straight diverging part for the two dimensional full steady compressible Euler system. This is motivated by the following well-known transonic shock phenomena described by Courant-Friedrichs in Section 147 of (5): Given the appropriately large exit pressure pe(x), if the upstream flow is still super- sonic behind the throat of the nozzle, then at a certain place in the diverging part of the nozzle a shock front intervenes and the gas is compressed and slowed down to sub- sonic speed so that the position and the strength of the shock front are automatically adjusted such that the end pressure becomes pe(x). The 2-D full steady Euler system is

Published

2009

50. Contact discontinuity with general perturbations for gas motions

Author

Zhouping Xin, Feimin Huang, and Tong Yang

Subjects

Mathematics(all), Exponential stability, Rate of convergence, General Mathematics, Norm (mathematics), Mathematical analysis, Time evolution, Perturbation (astronomy), A priori estimate, Classification of discontinuities, Boltzmann equation, Mathematics

Abstract

The contact discontinuity is one of the basic wave patterns in gas motions. The stability of contact discontinuities with general perturbations for the Navier�Stokes equations and the Boltzmann equation is a long standing open problem. General perturbations of a contact discontinuity may generate diffusion waves which evolve and interact with the contact wave to cause analytic difficulties. In this paper, we succeed in obtaining the large time asymptotic stability of a contact wave pattern with a convergence rate for the Navier�Stokes equations and the Boltzmann equation in a uniform way. One of the key observations is that even though the energy norm of the deviation of the solution from the contact wave may grow at the rate , it can be compensated by the decay in the energy norm of the derivatives of the deviation which is of the order of . Thus, this reciprocal order of decay rates for the time evolution of the perturbation is essential to close the a priori estimate containing the uniform bounds of the L8 norm on the lower order estimate and then it gives the decay of the solution to the contact wave pattern.

Published

2008