COUPLE MICROSCALE PERIODIC PATCHES TO SIMULATE MACROSCALE EMERGENT DYNAMICS
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Publication:4607624
DOI10.1017/S1446181117000396zbMath1384.37108arXiv1703.00204OpenAlexW2962825042MaRDI QIDQ4607624
Barry J. Cox, Hammad Alotaibi, Anthony Roberts
Publication date: 14 March 2018
Published in: The ANZIAM Journal (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1703.00204
Particle methods and lattice-gas methods (76M28) Simulation of dynamical systems (37M05) Numerical chaos (65P20) Heterogeneous agent models (91B69)
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Cites Work
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- On the acceleration of spatially distributed agent-based computations: a patch dynamics scheme
- A dynamical systems approach to simulating macroscale spatial dynamics in multiple dimensions
- Recent progress in the theory and application of symplectic integrators
- Lifting in equation-free methods for molecular dynamics simulations of dense fluids
- A stochastic version of center manifold theory
- Low-dimensional modelling of dynamics via computer algebra
- The Hartman-Grobman theorem for Carathéodory-type differential equations in Banach spaces
- The extended distributed microstructure model for gradient-driven transport: a two-scale model for bypassing effective parameters
- Resolution of subgrid microscale interactions enhances the discretisation of nonautonomous partial differential equations
- A fast adaptive multipole algorithm in three dimensions
- Good coupling for the multiscale patch scheme on systems with microscale heterogeneity
- Patch dynamics with buffers for homogenization problems
- Multiscale modelling couples patches of non-linear wave-like simulations
- MULTISCALE FLOW SIMULATIONS USING PARTICLES
- Resolving the Multitude of Microscale Interactions Accurately Models Stochastic Partial Differential Equations
- General Tooth Boundary Conditions for Equation Free Modeling
- Projective Methods for Stiff Differential Equations: Problems with Gaps in Their Eigenvalue Spectrum
- Geometric numerical integration illustrated by the Störmer–Verlet method
- Multiscale modelling couples patches of wave-like simulations
- Patch dynamics for macroscale modelling in one dimension
- Extracting macroscopic dynamics: model problems and algorithms
- EQUATION-FREE, EFFECTIVE COMPUTATION FOR DISCRETE SYSTEMS: A TIME STEPPER BASED APPROACH
- The Gap-Tooth Scheme for Homogenization Problems
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