On A-stable one-leg methods for solving nonlinear Volterra functional differential equations

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This paper is concerned with the stability of the one-leg methods for nonlinear Volterra functional differential equations (VFDEs). The contractivity and asymptotic stability properties are first analyzed for quasi-equivalent and A-stable one-leg methods by use of two lemmas proven in this paper. To extend the analysis to the case of strongly A-stable one-leg methods, Nevanlinna and Liniger’s technique of introducing new norm is used to obtain the conditions for contractivity and asymptotic stability of these methods. As a consequence, it is shown that one-leg θ-methods (θ ∈ (1/2, 1]) with linear interpolation are unconditionally contractive and asymptotically stable, and 2-step Adams type method and 2-step BDF method are conditionally contractive and asymptotically stable. The bounded stability of the midpoint rule is also proved with the help of the concept of semi-equivalent one-leg methods.

论文关键词:Nonlinear Volterra functional differential equations,Contractivity,Asymptotic stability,Bounded stability,One-leg methods,A-stability

论文评审过程:Received 3 March 2017, Revised 15 June 2017, Accepted 3 July 2017, Available online 21 July 2017, Version of Record 21 July 2017.

论文官网地址:https://doi.org/10.1016/j.amc.2017.07.013