English

Blowup for the Euler and Euler-Poisson Equations with Repulsive Forces II

Mathematical Physics 2010-12-24 v1 Analysis of PDEs math.MP

Abstract

In this paper, we continue to study the blowup problem of the NN-dimensional compressible Euler or Euler-Poisson equations with repulsive forces, in radial symmetry. In details, we extend the recent result of "M.W. Yuen, \textit{Blowup for the Euler and Euler-Poisson Equations with Repulsive Forces}, Nonlinear Analysis Series A: Theory, Methods & Applications \textbf{74} (2011), 1465--1470.". We could further apply the integration method to obtain the more general results which the non-trivial classical solutions (ρ,V)(\rho,V), with compact support in [0,R][0,R], where R>0R>0 is a positive constant with ρ(t,r)=0\rho(t,r)=0 and V(t,r)=0V(t,r)=0 for rRr\geq R, under the initial condition% \begin{equation} H_{0}=\int_{0}^{R}r^{n}V_{0}dr>0 \end{equation} where an arbitrary constant n>0n>0, blow up on or before the finite time T=2Rn+2/(n(n+1)H0)T=2R^{n+2}/(n(n+1)H_{0}) for pressureless fluids or γ>1.\gamma>1. The results obtained here fully cover the previous known case for n=1n=1.

Keywords

Cite

@article{arxiv.1012.5143,
  title  = {Blowup for the Euler and Euler-Poisson Equations with Repulsive Forces II},
  author = {Manwai Yuen},
  journal= {arXiv preprint arXiv:1012.5143},
  year   = {2010}
}

Comments

9 pages; Key Words: Euler Equations, Euler-Poisson Equations, Integration Method, Blowup, Repulsive Forces, With Pressure, C? Solutions, No-Slip Condition

R2 v1 2026-06-21T17:03:27.242Z