Optimal superconvergence results for Volterra functional integral equations with proportional vanishing delays
作者:
Highlights:
•
摘要
In this paper, we develop a new technique to study the optimal convergence orders of collocation methods for Volterra functional integral equations with vanishing delays on quasi-geometric meshes. Basing on a perturbation analysis, we show that for m collocation points, the global convergence order of the collocation solution is only m. However, the collocation solution may exhibit superconvergence with order m+1 at the collocation points. In particular, the local convergence order may attain 2m−1 at the nodes, provided that the collocation is based on the m Radau II points. Finally, some numerical examples are performed to verify our theoretical results.
论文关键词:Volterra functional integral equations,Vanishing delays,Collocation methods,Quasi-geometric meshes,Perturbation analysis
论文评审过程:Received 9 May 2017, Revised 3 September 2017, Accepted 24 September 2017, Available online 5 November 2017, Version of Record 5 November 2017.
论文官网地址:https://doi.org/10.1016/j.amc.2017.09.045