Unconditional stability of alternating difference schemes with variable time steplengthes for dispersive equation

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In this paper, the difference method with intrinsic parallelism for dispersive equation is studied. The general alternating difference schemes with variable time steplengthes are constructed and proved to be unconditionally stable. Some concrete parallel difference schemes are the special cases of the general schemes, such as the alternating group explicit scheme with variable time steplengthes, the alternating segment explicit-implicit scheme with variable time steplengthes, the alternating segment Crank–Nicolson scheme with variable time steplengthes, and so on. The numerical results are given to show the effectiveness of the present method. They show that the variable time steplengthes schemes are more accurate and can be obtained with less computational effort than the equal time steplengthes schemes.

论文关键词:Dispersive equation,Alternating difference schemes,Variable time step lengthes,Unconditional stability

论文评审过程:Received 5 August 2013, Revised 7 January 2015, Accepted 11 April 2015, Available online 14 May 2015, Version of Record 14 May 2015.

论文官网地址:https://doi.org/10.1016/j.amc.2015.04.037