SOLUTIONS OF EULER-POISSON EQUATIONS IN Rn

doi:10.1016/S0252-9602(08)60004-1

Abstract

Abstract:

In this article, the authors study the structure of the solutions for the Euler-Poisson equations in a bounded domain of Rⁿ with the given angular velocity and n is an odd number. For a ball domain and a constant angular velocity,
both existence and non-existence theorem are obtained depending on the adiabatic gas constant $\gamma$. In addition, they obtain the monotonicity of the radius of the star with both angular velocity and center density. They also prove that the radius of a rotating spherically symmetric star, with given constant angular velocity and constant entropy, is uniformly bounded independent of the central density. This is different to the case of the non-rotating star.

Key words: Euler-Poisson equations, existence

CLC Number:

35L60

Deng Yinbin; Gao Yan; Xiang Jianlin. SOLUTIONS OF EULER-POISSON EQUATIONS IN Rⁿ[J].Acta mathematica scientia,Series B, 2008, 28(1): 24-034.

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SOLUTIONS OF EULER-POISSON EQUATIONS IN Rⁿ

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