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An EIM-degradation free reduced basis method via over collocation and residual hyper reduction-based error estimation.

, , , and . J. Comput. Phys., (2021)

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An EIM-degradation free reduced basis method via over collocation and residual hyper reduction-based error estimation., , , and . J. Comput. Phys., (2021)Performance Evaluation of Mixed-Precision Runge-Kutta Methods., , , and . HPEC, page 1-6. IEEE, (2021)Recovery of High Order Accuracy in Radial Basis Function Approximations of Discontinuous Problems., , , , and . J. Sci. Comput., 45 (1-3): 359-381 (2010)Erratum to: Explicit Strong Stability Preserving Multistage Two-Derivative Time-Stepping Schemes., , , and . J. Sci. Comput., 68 (3): 943-944 (2016)A general linear method approach to the design and optimization of efficient, accurate, and easily implemented time-stepping methods in CFD., , , and . J. Comput. Phys., (2022)A review of high order strong stability preserving two-derivative explicit, implicit, and IMEX methods., and . CoRR, (2024)Error Inhibiting Block One-step Schemes for Ordinary Differential Equations., and . J. Sci. Comput., 73 (2-3): 691-711 (2017)IMEX error inhibiting schemes with post-processing., , and . CoRR, (2019)Two-derivative error inhibiting schemes with post-processing., , and . CoRR, (2019)Strong Stability Preserving Integrating Factor Two-Step Runge-Kutta Methods., , and . J. Sci. Comput., 81 (3): 1446-1471 (2019)