UNIFORMLY HIGHER ORDER ACCURATE EXTRAPOLATIONS TO SOLUTIONS OF UNIFORMLY CONVERGENT DISCRETIZATION METHODS FOR SINGULARLY PERTURBED PROBLEMS

Applied Mathematics and Mechanics (English Edition) ›› 1990, Vol. 11 ›› Issue (3): 271-276.

UNIFORMLY HIGHER ORDER ACCURATE EXTRAPOLATIONS TO SOLUTIONS OF UNIFORMLY CONVERGENT DISCRETIZATION METHODS FOR SINGULARLY PERTURBED PROBLEMS

孙光甫

Department of Computer Science, Fuzhou University, Fuzhou

收稿日期:1989-10-07 出版日期:1990-03-18 发布日期:1990-03-18
基金资助:
Supported by the National Natural Science Foundation of China

UNIFORMLY HIGHER ORDER ACCURATE EXTRAPOLATIONS TO SOLUTIONS OF UNIFORMLY CONVERGENT DISCRETIZATION METHODS FOR SINGULARLY PERTURBED PROBLEMS

Sun Guang-fu

Department of Computer Science, Fuzhou University, Fuzhou

Received:1989-10-07 Online:1990-03-18 Published:1990-03-18
Supported by:
Supported by the National Natural Science Foundation of China

摘要/Abstract

摘要： We discuss the uniformly higher order accurate extrapolations, which are based on the uniform expansion for global error, to solutions of uniformly convergent discretization methods for singularly perturbed problems. By applying the approach to the in-Allen-Southwell scheme for a non-self-adjoint problem, we obtain an extrapolation solution which is uniformly convergent with order two. We confirm the result by numerical calculations.

关键词: nonlinear two-dimensional Newton-Boussinesq equation, classical solution, a priori estimates

Abstract: We discuss the uniformly higher order accurate extrapolations, which are based on the uniform expansion for global error, to solutions of uniformly convergent discretization methods for singularly perturbed problems. By applying the approach to the in-Allen-Southwell scheme for a non-self-adjoint problem, we obtain an extrapolation solution which is uniformly convergent with order two. We confirm the result by numerical calculations.

Key words: nonlinear two-dimensional Newton-Boussinesq equation, classical solution, a priori estimates

孙光甫. UNIFORMLY HIGHER ORDER ACCURATE EXTRAPOLATIONS TO SOLUTIONS OF UNIFORMLY CONVERGENT DISCRETIZATION METHODS FOR SINGULARLY PERTURBED PROBLEMS[J]. Applied Mathematics and Mechanics (English Edition), 1990, 11(3): 271-276.

Sun Guang-fu. UNIFORMLY HIGHER ORDER ACCURATE EXTRAPOLATIONS TO SOLUTIONS OF UNIFORMLY CONVERGENT DISCRETIZATION METHODS FOR SINGULARLY PERTURBED PROBLEMS[J]. Applied Mathematics and Mechanics (English Edition), 1990, 11(3): 271-276.

[1]	房少梅金玲玉郭柏灵. Global existence of solutions to the periodic initial value problems for two-dimensional Newton-Boussinesq equations[J]. Applied Mathematics and Mechanics (English Edition), 2010, 31(4): 405-414.
[2]	刘法贵;孔德兴. GLOBAL EXISTENCE AND BLOW-UP PHENOMENA OF CLASSICAL SOLUTIONS FOR THE SYSTEM OF COMPRESSIBLE ADIABATIC FLOW THROUGH POROUS MEDIA[J]. Applied Mathematics and Mechanics (English Edition), 2004, 25(6): 703-713.
[3]	郭艾. INITIAL VALUE PROBLEMS FOR A CLASS OF NONLINEAR INTEGRO-PARTIAL DIFFERENTIAL EQUATIONS[J]. Applied Mathematics and Mechanics (English Edition), 1999, 20(6): 683-689.
[4]	徐龙封. A VERIGIN PROBLEM WITH KINETIC CONDITION[J]. Applied Mathematics and Mechanics (English Edition), 1997, 18(2): 191-199.
[5]	朱长江. INITIAL VALUE PROBLEM FOR HIGH DIMENSIONAL DYNAMIC SYSTEMS[J]. Applied Mathematics and Mechanics (English Edition), 1995, 16(3): 279-282.
[6]	崔尚斌;屈长征. INITIAL BOUNDARY VALUE PROBLEMS FOR A CLASS OF NONLINEAR INTEGRO-PARTIAL DIFFERENTIAL EQUATIONS[J]. Applied Mathematics and Mechanics (English Edition), 1994, 15(4): 389-404.

UNIFORMLY HIGHER ORDER ACCURATE EXTRAPOLATIONS TO SOLUTIONS OF UNIFORMLY CONVERGENT DISCRETIZATION METHODS FOR SINGULARLY PERTURBED PROBLEMS

UNIFORMLY HIGHER ORDER ACCURATE EXTRAPOLATIONS TO SOLUTIONS OF UNIFORMLY CONVERGENT DISCRETIZATION METHODS FOR SINGULARLY PERTURBED PROBLEMS

PDF

可视化

摘要/Abstract

引用本文

使用本文

参考文献

相关文章 6

编辑推荐

Metrics

本文评价