Time discontinuous Galerkin space-time finite element method for nonlinear Sobolev equations

Siriguleng He; Hong Li; Yang Liu

doi:10.1007/s11464-013-0307-9

Front. Math. China ›› 2013, Vol. 8 ›› Issue (4) : 825 -836. DOI: 10.1007/s11464-013-0307-9

Research Article

RESEARCH ARTICLE

Time discontinuous Galerkin space-time finite element method for nonlinear Sobolev equations

Siriguleng He ¹³⁰⁷
, Hong Li ¹³⁰⁷^,^b
, Yang Liu ¹³⁰⁷

Author information +

History +

PDF (148KB)

Abstract

This article presents a complete discretization of a nonlinear Sobolev equation using space-time discontinuous Galerkin method that is discontinuous in time and continuous in space. The scheme is formulated by introducing the equivalent integral equation of the primal equation. The proposed scheme does not explicitly include the jump terms in time, which represent the discontinuity characteristics of approximate solution. And then the complexity of the theoretical analysis is reduced. The existence and uniqueness of the approximate solution and the stability of the scheme are proved. The optimalorder error estimates in L²(H¹) and L²(L²) norms are derived. These estimates are valid under weak restrictions on the space-time mesh, namely, without the condition k_n ⩾ ch², which is necessary in traditional space-time discontinuous Galerkin methods. Numerical experiments are presented to verify the theoretical results.

Keywords

Nonlinear Sobolev equation / time discontinuous Galerkin spacetime finite element method / optimal error estimate

Cite this article

Download citation ▾

Siriguleng He, Hong Li, Yang Liu. Time discontinuous Galerkin space-time finite element method for nonlinear Sobolev equations. Front. Math. China, 2013, 8(4): 825-836 DOI:10.1007/s11464-013-0307-9

登录浏览全文

4963

注册一个新账户忘记密码

References

Publishing order | Descend order by publishing year | Descend order by cited within

[1]	Brenner S C, Scott L R. The Mathematical Theory of Finite Element Methods, 1994, New York: Springer-Verlag

[2]	Cockburn B, Lin S Y. TVB Runge-Kutta local projection discontinuous Galerkin finite element method for conservation laws III: one dimensional systems. J Comput Phys, 1989, 84(1): 90-113

[3]	Cockburn B, Shu C W. The local discontinuous Galerkin method for time-depended convection diffusion systems. SIAM J Numer Anal, 1998, 35: 2440-2463

[4]	Eriksson K, Johnson C. Adaptive finite element methods for parabolic problems I: a linear model problem. SIAM J Numer Anal, 1991, 28(1): 43-77

[5]	Eriksson K, Johnson C. Adaptive finite element methods for parabolic problems II: optimal error estimates in L_∞ L₂ and L_∞ L_∞. SIAM J Numer Anal, 1995, 32(3): 706-740

[6]	Ewing R E. Numerical solution of Sobolev partial differential equations. SIAM J Numer Anal, 1975, 12: 345-363

[7]	Ewing R E. Time-stepping Galerkin method for nonlinear Sobolev partial differential equations. SIAM J Numer Anal, 1978, 15: 1125-1150

[8]	Karakashian O, Makridakis Ch. A space-time finite element method for the nonlinear Schrödinger equation: the discontinuous Galerkin mehtod. Math Comp, 1998, 67: 479-499

[9]	Larsson S, Thomée V, Wahlbin L B. Numerical solution of parabolic integro-differential equations by the discontinuous Galerkin method. Math Comp, 1998, 69(221): 45-71

[10]	Li H, Liu R X. The space-time finite element methods for parabolic problems. Appl Math Mech, 2001, 22: 687-700

[11]	Liu Y, Li H, He S. Mixed time discontinuous space-time finite element method for convection diffusion equations. Appl Math Mech, 2008, 29(12): 1579-1586

[12]	Reed N H, Hill T R. Triangle mesh methods for the Neutron transport equation. Report LA2 UR-73-479, Los Alamos Scientific Laboratory, 1973

[13]	Sudirham J J, Van Der Vegt J J W, Van Damme R M J. Space-time discontinuous Galerkin methods for advection-diffusion problems on time-dependent domains. Appl Numer Math, 2006, 56: 1491-1518

[14]	Sun T, Yang D. The finite element difference streamline-diffusion methods for Sobolev equation with convection dominated term. Appl Math Comput, 2002, 125: 325-345

[15]	Sun T, Yang D. A priori error estimates for interior penalty discontinuous Galerkin method applied to nonlinear Sobolev equations. Appl Math Comput, 2008, 200: 147-159