We derive a hierarchy of successively coarse-grained stochastic processes and associated coarse-grained Monte Carlo (CGMC) algorithms directly from the microscopic processes as approximations in larger length scales for the case of diffusion of interacting particles on a lattice. This hierarchy of models spans length scales between microscopic and mesoscopic, satisfies a detailed balance, and gives self-consistent fluctuation mechanisms whose noise is asymptotically identical to the microscopic MC. Rigorous, detailed asymptotics justify and clarify these connections. Gradient continuous time microscopic MC and CGMC simulations are compared under far from equilibrium conditions to illustrate the validity of our theory and delineate the error...
The coarse-grained Monte Carlo (CGMC) algorithm was originally proposed in the series of works [M. A...
The primary objective of this work is to develop coarse-graining schemes for stochastic many-body mi...
While lattice kinetic Monte Carlo (KMC) methods provide insight into numerous complex physical syste...
We derive a hierarchy of successively coarse-grained stochastic processes and associated coarse-grai...
This thesis is concerned with coarse-graining dynamics of interacting particle systems. We study two...
Diverse scientific disciplines ranging from materials science to catalysis to biomolecular dynamics ...
Plechac, PetrThis dissertation is focused on numerical schemes of coarse-graining (CG) for stochasti...
Recently a new class of approximating coarse-grained stochastic processes and associated Monte Carlo...
Recently a new class of approximating coarse-grained stochastic processes and associated Monte Carlo...
In this paper we investigate the approximation properties of the coarse-graining procedure applied t...
In this paper we investigate the approximation properties of the coarse-graining procedure applied t...
Kinetic Monte Carlo methods provide a powerful computational tool for the simulation of microscopic ...
Diverse scientific disciplines ranging from materials science to catalysis to biomolecular dynamics ...
The coarse-grained Monte Carlo (CGMC) algorithm was originally proposed in the series of works [M. A...
The primary objective of this work is to develop coarse-graining schemes for stochastic many-body mi...
While lattice kinetic Monte Carlo (KMC) methods provide insight into numerous complex physical syste...
We derive a hierarchy of successively coarse-grained stochastic processes and associated coarse-grai...
This thesis is concerned with coarse-graining dynamics of interacting particle systems. We study two...
Diverse scientific disciplines ranging from materials science to catalysis to biomolecular dynamics ...
Plechac, PetrThis dissertation is focused on numerical schemes of coarse-graining (CG) for stochasti...
Recently a new class of approximating coarse-grained stochastic processes and associated Monte Carlo...
Recently a new class of approximating coarse-grained stochastic processes and associated Monte Carlo...
In this paper we investigate the approximation properties of the coarse-graining procedure applied t...
In this paper we investigate the approximation properties of the coarse-graining procedure applied t...
Kinetic Monte Carlo methods provide a powerful computational tool for the simulation of microscopic ...
Diverse scientific disciplines ranging from materials science to catalysis to biomolecular dynamics ...
The coarse-grained Monte Carlo (CGMC) algorithm was originally proposed in the series of works [M. A...
The primary objective of this work is to develop coarse-graining schemes for stochastic many-body mi...
While lattice kinetic Monte Carlo (KMC) methods provide insight into numerous complex physical syste...