On convergence of the projective integration method for stiff ordinary differential equations

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DOI10.4310/CMS.2014.v12.n2.a2zbMath1337.65063arXiv1301.6851OpenAlexW2964132216MaRDI QIDQ396513

John MacLean, Georg A. Gottwald

Publication date: 13 August 2014

Published in: Communications in Mathematical Sciences (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/1301.6851

zbMATH Keywords

convergence finite difference method numerical examples error analysis center manifold theory heterogeneous multiscale methods multi-scale integrators projective integration

Mathematics Subject Classification ID

Nonlinear ordinary differential equations and systems (34A34) Stability and convergence of numerical methods for ordinary differential equations (65L20) Error bounds for numerical methods for ordinary differential equations (65L70) Numerical methods for Hamiltonian systems including symplectic integrators (65P10) Finite difference and finite volume methods for ordinary differential equations (65L12) Discretization methods and integrators (symplectic, variational, geometric, etc.) for dynamical systems (37M15) Numerical methods for stiff equations (65L04)

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Adaptively Detect and Accurately Resolve Macro-scale Shocks in an Efficient Equation-Free Multiscale Simulation ⋮ On convergence of higher order schemes for the projective integration method for stiff ordinary differential equations

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