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Abstract / Description of output
We review and compare numerical methods that simultaneously control temperature while preserving the momentum, a family of particle simulation methods commonly used for the modelling of complex fluids and polymers. The class of methods considered includes dissipative particle dynamics (DPD) as well as extended stochastic-dynamics models incorporating a generalized pairwise thermostat scheme in which stochastic forces are eliminated and the coefficient of dissipation is treated as an additional auxiliary variable subject to a feedback (kinetic energy) control mechanism. In the latter case, we consider the addition of a coupling of the auxiliary variable, as in the Nosé-Hoover-Langevin (NHL) method, with stochastic dynamics to ensure ergodicity, and find that the convergence of ensemble averages is substantially improved. To this end, splitting methods are developed and studied in terms of their thermodynamic accuracy, two-point correlation functions, and convergence. In terms of computational efficiency as measured by the ratio of thermodynamic accuracy to CPU time, we report significant advantages in simulation for the pairwise NHL method compared to popular alternative schemes (up to an 80% improvement), without degradation of convergence rate. The momentum-conserving thermostat technique described here provides a consistent hydrodynamic model in the low-friction regime, but it will also be of use in both equilibrium and nonequilibrium molecular simulation applications owing to its efficiency and simple numerical implementation.
Original language | English |
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Pages (from-to) | 72-95 |
Number of pages | 24 |
Journal | Journal of Computational Physics |
Volume | 280 |
Early online date | 22 Sept 2014 |
DOIs | |
Publication status | Published - 1 Jan 2015 |
Keywords / Materials (for Non-textual outputs)
- Configurational temperature
- Dissipative particle dynamics
- Molecular dynamics
- Momentum conservation
- Order of convergence
- Pairwise nosé-hoover-langevin thermostat
- Stochastic differential equations
- Weak order
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Dive into the research topics of 'On the numerical treatment of dissipative particle dynamics and related systems'. Together they form a unique fingerprint.Projects
- 1 Finished
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Science and Innovation: Numerical Algorithms and Intelligent Software for the Evolving HPC Platform
1/08/09 → 31/07/14
Project: Research