期刊文献+
任意字段
题名或关键词
题名
关键词
文摘
作者
第一作者
机构
刊名
分类号
参考文献
作者简介
基金资助
栏目信息

A Finite Difference Scheme for Blow-Up Solutions of Nonlinear Wave Equations

A Finite Difference Scheme for Blow-Up Solutions of Nonlinear Wave Equations
下载PDF
导出
摘要 We consider a finite difference scheme for a nonlinear wave equation, whose solutions may lose their smoothness in finite time, i.e., blow up in finite time. In order to numerically reproduce blow-up solutions, we propose a rule for a time-stepping,which is a variant of what was successfully used in the case of nonlinear parabolic equations. A numerical blow-up time is defined and is proved to converge, under a certain hypothesis, to the real blow-up time as the grid size tends to zero. We consider a finite difference scheme for a nonlinear wave equation,whose solutions may lose their smoothness in finite time,i.e.,blow up in finite time.In order to numerically reproduce blow-up solutions,we propose a rule for a time-stepping, which is a variant of what was successfully used in the case of nonlinear parabolic equations.A numerical blow-up time is defined and is proved to converge,under a certain hypothesis,to the real blow-up time as the grid size tends to zero.
作者 Chien-Hong Cho
机构地区 Research Institute for Mathematical Sciences Department of Mathematics
出处 《Numerical Mathematics(Theory,Methods and Applications)》 SCIE 2010年第4期475-498,共24页 高等学校计算数学学报(英文版)
基金 supported by the grant NSC 98-2115-M-194-010-MY2
关键词 Finite difference method nonlinear wave equation blow-up Nonlinear Wave Equations Solutions Blow-Up finite difference scheme nonlinear wave equation finite time blow-up solutions In order used in defined grid case
分类号 O241.82 [理学—计算数学]
  • 相关文献

参考文献31

  • 1Pablo Groisman.Totally Discrete Explicit and Semi-implicit Euler Methods for a Blow-up Problem in Several Space Dimensions[J]. Computing . 2006 (3-4)
  • 2Luis A. Caffarelli,Avner Friedman.Differentiability of the blow-up curve for one dimensional nonlinear wave equations[J]. Archive for Rational Mechanics and Analysis . 1985 (1)
  • 3Robert T. Glassey.Finite-time blow-up for solutions of nonlinear wave equations[J]. Mathematische Zeitschrift . 1981 (3)
  • 4Fritz John.Blow-up of solutions of nonlinear wave equations in three space dimensions[J]. Manuscripta Mathematica . 1979 (1-3)
  • 5Tomoyasu Nakagawa.Blowing up of a finite difference solution tou t = uxx + u2[J]. Applied Mathematics & Optimization . 1975 (4)
  • 6K.Stewart,T.Geveci.Numerical experiments with a nonlinear evolution equation which exhibits blow-up. Applied Numerical Mathematics . 1992
  • 7Y.Tsutsumi.Global existence and blow-up of solutions of nonlinear wave equations. Sugaku . 2001
  • 8L.M.Abia,J.C.Lopez-Marcos,J.Martinez.Blow-up for semidiscretizations of reaction diffusion equations. Applied Numerical Mathematics . 1996
  • 9P.Baras,L.Cohen.max</sub> for the solution of a semilinear heat equation&amp;sid=Journal of Functional Analysis&amp;aufirst=P.Baras');&#xA; ">Complete blow-up after T<sub>max</sub> for the solution of a semilinear heat equation. Journal of Functional Analysis . 1987
  • 10D.Chae.Incompressible Euler Equations:the blow-up problem and related results. Handbook of Differential Equations:Evolutionary Partial Differential Equations .
Numerical Mathematics(Theory,Methods and Applications)
2010年 第4期

相关作者

内容加载中请稍等...

相关机构

内容加载中请稍等...

相关主题

内容加载中请稍等...

浏览历史

内容加载中请稍等...
;
使用帮助 返回顶部