The Global Weak Solutions of the Compressible Euler Equation with Spherical Symmetry(Evolution Equations and Nonlinear Problems)
スポンサーリンク
概要
著者
-
Ukai Seiji
Department Of Mathematical And Computing Sciences Tokyo Institute Of Technology
-
Ukai Seiji
Department Of Applied Mathematics Yokohama National University
-
Makino Tetu
Department Of Liberal Arts Osaka Sangyo University
-
Makino Tetu
Department Of Applied Science Faculty Of Engineering Yamaguchi University
-
Mizohata Kiyoshi
Department of Mathematical and Computing Sciences, Tokyo Institute of Technology
-
Mizohata Kiyoshi
Department Of Mathematical And Computing Sciences Tokyo Institute Of Technology
-
Mizohata Kiyoshi
Department Of Information Sciences Tokyo Institute Of Technology
-
Ukai Seiji
Department of Mathematical and Computing Sciences, Tokyo Institute of Technology
関連論文
- On the Cauchy problem of the Boltzmann Equation with a Soft Potential
- The Boltzmann-Grad Limit and Cauchy-Kovalevskaya Theorem
- Free Boundary Problem for the Equation of Spherically Symmetric Motion of Viscous Gas (III)
- Perturbation of the Navier-Stokes flow in an annular domain with the non-vanishing outflow condition
- Steady Solutions of the Boltzmann Equation for a Gas Flow past an Obstacle, II. Stability : Dedicated to Professor Mizohata on his 60th anniversary
- Convex entropy function and symmetrization of the relativistic Euler equation(Mathematical Analysis of Phenomena in fluid and Plasma Dynamics)
- Recent topics on the compressible Euler equation(Mathematical Fluid Mechanics and Modeling)
- Global weak solutions of the compressible Euler equation with spherical symmetry (II)
- The Global Weak Solutions of the Compressible Euler Equation with Spherical Symmetry(Evolution Equations and Nonlinear Problems)
- Equivalence of Eulerian and Lagrangian weak solutions of the compressible Euler equation with spherical symmetry
- Global Solutions to the Relativistic Euler Equation with Spherical Symmetry
- Global weak solutions for the equation of isothermal gas around a star.
- On the Singular Limits of the Boltzmann Equation(Mathematical Fluid Mechanics and Modeling)
- A Generalized Analysis of Rossi-α Experiment