Ling Peng-cheng. Uniform Convergence for the Difference Scheme in the Conservation Form of Ordinary Differential Equation with a Small Parameter[J]. Applied Mathematics and Mechanics, 1986, 7(11): 993-1002.
Citation: Ling Peng-cheng. Uniform Convergence for the Difference Scheme in the Conservation Form of Ordinary Differential Equation with a Small Parameter[J]. Applied Mathematics and Mechanics, 1986, 7(11): 993-1002.

Uniform Convergence for the Difference Scheme in the Conservation Form of Ordinary Differential Equation with a Small Parameter

  • Received Date: 1985-05-26
  • Publish Date: 1986-11-15
  • In this paper, we consider a singular perturbation boundary problem for a self-adjoint ordinary differential equaiton. We construct a class of difference schemes with fitted factors, and give the sufficient conditions under which the solution of difference scheme converges uniformly to the solution of differential equation. From this we propose several specific schemes under weaker conditions, and give much higher order of uniform convergence.
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  • [1]
    Doolan,E.P,J.J.H.Miller and W.H.A.Schilders,Uniform NUmerical Methods for Problems with Initial and Boundary Layers,Dubline:Boole Press(1980).
    [2]
    林鹏程、郭雯,《奇异摄动问题数值解法讲义》.
    [3]
    Il'in A.M.,Differencing scheme for differential equation with a small parameter affecting the highest derivative,Math Notes.6(1969),596-602.
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