There are no reviews yet. Be the first to send feedback to the community and the maintainers!
SummationByPartsOperators.jl
A Julia library of summation-by-parts (SBP) operators used in finite difference, Fourier pseudospectral, continuous Galerkin, and discontinuous Galerkin methods to get provably stable semidiscretizations, paying special attention to boundary conditions.HyperbolicDiffEq.jl
Numerical methods for hyperbolic differential equations.PolynomialBases.jl
Polynomial bases for spectral element methods.Dispersive-wave-schemes-notebooks
A Broad Class of Conservative Numerical Methods for Dispersive Wave Equations2023-RSE_in_Julia
Repository supporting the course "Research Software Engineering in Julia" at Johannes Gutenberg University Mainz in the winter term 2023/2024Julia_User_Group_Mainz
Collecting material from talks at the Julia User Group in Mainz, Germany2023_modeling_matters
Reproducibility repository for the article "Modeling still matters: a surprising instance of catastrophic floating point errors in mathematical biology and numerical methods for ODEs" by Cordula Reisch and Hendrik RanochaHamiltonian-RRK-notebooks
Relaxation Runge-Kutta Methods for Hamiltonian ProblemsDispersive-wave-error-growth-notebooks
On the Rate of Error Growth in Time for Numerical Solutions of Nonlinear Dispersive Wave EquationsStrongStabilityExplicitRungeKuttaForNonlinearOperators
On Strong Stability of Explicit Runge-Kutta Methods for Nonlinear Semibounded Operators2023_RK_error_estimate
Reproducibility repository for "Stability of step size control based on a posteriori error estimates"2023_multiderivative_relaxation
Reproducibility repository for the paper "Multiderivative time integration methods preserving nonlinear functionals via relaxation"2024-talk-m3odel
This repository contains the source code for the hands-on introduction to adaptive meshes with T8code.jl given by Hendrik Ranocha at the M3ODEL Lunch Talk Seminar on March 28, 2024.EnergyStabilityExplicitRungeKuttaNonlinearNonautonomous
Energy Stability of Explicit Runge-Kutta Methods for Non-autonomous or Nonlinear ProblemsOptimized-RK-CFD
Optimized Runge-Kutta Methods with Automatic Step Size Control for Compressible Computational Fluid DynamicsLove Open Source and this site? Check out how you can help us