A Liouville-operator derived measure-preserving integrator for molecular dynamics simulations in the isothermal–isobaric ensemble
University of California, Los Angeles · Applied Mathematics (United States) · +4 more institutions
Abstract
The constant-pressure, constant-temperature (NPT) molecular dynamics approach is re-examined from the viewpoint of deriving a new measure-preserving reversible geometric integrator for the equations of motion. The underlying concepts of non-Hamiltonian phase-space analysis, measure-preserving integrators and the symplectic property for Hamiltonian systems are briefly reviewed. In addition, current measure-preserving schemes for the constant-volume, constant-temperature ensemble are also reviewed. A new geometric integrator for the NPT method is presented, is shown to preserve the correct phase-space volume element and is demonstrated to perform well in realistic examples. Finally, a multiple time-step version…
Citation impact
- FWCI
- 5.44
- Percentile
- 100%
- References
- 51
Authors
5- MEMark E. TuckermanCorresponding
University of California, Los Angeles, Applied Mathematics (United States), New York University, Courant Institute of Mathematical Sciences
- JAJosé Alejandre
Universidad Autónoma Metropolitana
- RLRoberto López-Rendón
Universidad Autónoma Metropolitana
- ALAndrea L. Jochim
New York University
- GMGlenn Martyna
Physical Sciences (United States)
Topics & keywords
- Integrator
- Measure (data warehouse)
- Isobaric process
- Operator (biology)
- Isothermal process
- Molecular dynamics
- Statistical physics
- Physics