Two-dimensional Riemann problems of simplified Euler equation 被引量：3

Two-dimensional Riemann problems of simplified Euler equation

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摘要 The two-dimensional Riemann problem of simplifed Euler equation is discussed, in which initial value contains two different constant states that are separated by a smooth curve. This problem is a natural description of realistic phenomena, but it is hard to study by conventional idea. So a new approach is proposed. Some new properties about two-dimensional rarefaction wave, shock wave and intermediate state of solutions are disclosed. The two-dimensional Riemann problem of simplifed Euler equation is discussed, in which initial value contains two different constant states that are separated by a smooth curve. This problem is a natural description of realistic phenomena, but it is hard to study by conventional idea. So a new approach is proposed. Some new properties about two-dimensional rarefaction wave, shock wave and intermediate state of solutions are disclosed.

作者 YANG Xiaozhou 1,2 and HUANG Feimin+1 1. Institute of Applied Mathematics, Chinese Academy of Sciences, Beijing 100080, China 2. Department of Mathematics, Shantou University, Guangdong 515063, China

出处《Chinese Science Bulletin》 SCIE EI CAS 1998年第6期441-444,共4页

关键词 D RIEMANN problem IMPLICIT functions CYLINDRICAL SURFACE PENCIL of CYLINDRICAL surface. 2-D Riemann problem implicit functions cylindrical surface pencil of cylindrical surface

分类号 O186.1 [理学—基础数学]

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Chinese Science Bulletin

1998年第6期

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Two-dimensional Riemann problems of simplified Euler equation 被引量：3

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