Metropolis Monte Carlo simulation is a powerful tool for studying the equilibrium properties of matter. In complex condensed-phase systems, however, it is difficult to design Monte Carlo moves with high acceptance probabilities that also rapidly sample uncorrelated configurations. Here, we introduce a new class of moves based on nonequilibrium dynamics: candidate configurations are generated through a finite-time process in which a system is actively driven out of equilibrium, and accepted with criteria that preserve the equilibrium distribution. The acceptance rule is similar to the Metropolis acceptance probability, but related to the nonequilibrium work rather than the instantaneous energy difference. Our method is applicable to samplin...
Nonequilibrium driving can independently tune the structure and dynamics of molecular and colloidal ...
Configurational freezing (<i>J. Chem. Theory Comput.</i> <b>2011</b>, <i>7</i>, 582) is a method dev...
A numerical technique is introduced that reduces exponentially the time required for Monte Carlo sim...
Metropolis Monte Carlo simulation is a powerful tool for studying the equilibrium properties of matt...
Equilibrium sampling is at the core of computational thermodynamics, aiding our understanding of var...
To achieve acceptable accuracy in fast-switching free energy estimates by Jarzynski equality [Phys. ...
A new numerical technique is demonstrated and shown to reduce exponentially the time required for Mo...
Abstract: A new numerical technique is demonstrated and shown to reduce exponentially the time requi...
The jump-walking Monte-Carlo algorithm is revisited and updated to study the equilibrium properties ...
A Monte Carlo method to sample the classical configurational canonical ensemble is introduced. In co...
Competing phases or interactions in complex many-particle systems can result in free energy barriers...
A numerical technique is introduced that reduces exponentially the time required for Monte Carlo sim...
Molecular simulations aim to sample all of the thermodynamically important states; when the sampling...
We examine non-Boltzmann Monte Carlo algorithms used to study slowly relaxing systems. By adding a ...
We have investigated the maximum computational efficiency of reversible work calculations that chang...
Nonequilibrium driving can independently tune the structure and dynamics of molecular and colloidal ...
Configurational freezing (<i>J. Chem. Theory Comput.</i> <b>2011</b>, <i>7</i>, 582) is a method dev...
A numerical technique is introduced that reduces exponentially the time required for Monte Carlo sim...
Metropolis Monte Carlo simulation is a powerful tool for studying the equilibrium properties of matt...
Equilibrium sampling is at the core of computational thermodynamics, aiding our understanding of var...
To achieve acceptable accuracy in fast-switching free energy estimates by Jarzynski equality [Phys. ...
A new numerical technique is demonstrated and shown to reduce exponentially the time required for Mo...
Abstract: A new numerical technique is demonstrated and shown to reduce exponentially the time requi...
The jump-walking Monte-Carlo algorithm is revisited and updated to study the equilibrium properties ...
A Monte Carlo method to sample the classical configurational canonical ensemble is introduced. In co...
Competing phases or interactions in complex many-particle systems can result in free energy barriers...
A numerical technique is introduced that reduces exponentially the time required for Monte Carlo sim...
Molecular simulations aim to sample all of the thermodynamically important states; when the sampling...
We examine non-Boltzmann Monte Carlo algorithms used to study slowly relaxing systems. By adding a ...
We have investigated the maximum computational efficiency of reversible work calculations that chang...
Nonequilibrium driving can independently tune the structure and dynamics of molecular and colloidal ...
Configurational freezing (<i>J. Chem. Theory Comput.</i> <b>2011</b>, <i>7</i>, 582) is a method dev...
A numerical technique is introduced that reduces exponentially the time required for Monte Carlo sim...