Full linear multistep methods as root-finders

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摘要

Root-finders based on full linear multistep methods (LMMs) use previous function values, derivatives and root estimates to iteratively find a root of a nonlinear function. As ODE solvers, full LMMs are typically not zero-stable. However, used as root-finders, the interpolation points are convergent so that such stability issues are circumvented. A general analysis is provided based on inverse polynomial interpolation, which is used to prove a fundamental barrier on the convergence rate of any LMM-based method. We show, using numerical examples, that full LMM-based methods perform excellently. Finally, we also provide a robust implementation based on Brent’s method that is guaranteed to converge.

论文关键词:Root-finder,Nonlinear equation,Linear multistep methods,Iterative methods,Convergence rate

论文评审过程:Received 10 February 2017, Revised 29 August 2017, Accepted 2 September 2017, Available online 10 October 2017, Version of Record 10 October 2017.

论文官网地址:https://doi.org/10.1016/j.amc.2017.09.003