eBook ISBN: | 978-1-4704-0243-3 |
Product Code: | MEMO/137/654.E |
List Price: | $48.00 |
MAA Member Price: | $43.20 |
AMS Member Price: | $28.80 |
eBook ISBN: | 978-1-4704-0243-3 |
Product Code: | MEMO/137/654.E |
List Price: | $48.00 |
MAA Member Price: | $43.20 |
AMS Member Price: | $28.80 |
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Book DetailsMemoirs of the American Mathematical SocietyVolume: 137; 1999; 77 ppMSC: Primary 35; 65; 76
In this volume, the one-dimensional and two-dimensional Riemann problems for the transportation equations in gas dynamics are solved constructively. In either the 1-D or 2-D case, there are only two kinds of solutions: one involves Dirac delta waves, and the other involves vacuums, which havea been merely discussed so far. The generalized Rankine-Hugoniot and entropy conditions for Dirac delta waves are clarified with viscous vanishing method. All of the existence, uniqueness and stability for viscous perturbations are proved analytically.
ReadershipGraduate students and research mathematicians working in nonlinear PDEs; numerical analysts working in fluid dynamics.
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Table of Contents
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Chapters
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I. Introduction
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II. 1-D Riemann problem for the transportation equations in gas dynamics
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III. 2-D Riemann problem for the transportation equations in gas dynamics
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In this volume, the one-dimensional and two-dimensional Riemann problems for the transportation equations in gas dynamics are solved constructively. In either the 1-D or 2-D case, there are only two kinds of solutions: one involves Dirac delta waves, and the other involves vacuums, which havea been merely discussed so far. The generalized Rankine-Hugoniot and entropy conditions for Dirac delta waves are clarified with viscous vanishing method. All of the existence, uniqueness and stability for viscous perturbations are proved analytically.
Graduate students and research mathematicians working in nonlinear PDEs; numerical analysts working in fluid dynamics.
-
Chapters
-
I. Introduction
-
II. 1-D Riemann problem for the transportation equations in gas dynamics
-
III. 2-D Riemann problem for the transportation equations in gas dynamics