相关参考文献
注意:仅列出部分参考文献,下载原文获取全部文献信息。Chaos in spin glasses revealed through thermal boundary conditions
Wenlong Wang et al.
PHYSICAL REVIEW B (2015)
Measuring free energy in spin-lattice models using parallel tempering Monte Carlo
Wenlong Wang
PHYSICAL REVIEW E (2015)
Comparing Monte Carlo methods for finding ground states of Ising spin glasses: Population annealing, simulated annealing, and parallel tempering
Wenlong Wang et al.
PHYSICAL REVIEW E (2015)
Efficient Cluster Algorithm for Spin Glasses in Any Space Dimension
Zheng Zhu et al.
PHYSICAL REVIEW LETTERS (2015)
Evidence against a mean-field description of short-range spin glasses revealed through thermal boundary conditions
Wenlong Wang et al.
PHYSICAL REVIEW B (2014)
Temperature chaos in 3D Ising spin glasses is driven by rare events
L. A. Fernandez et al.
EPL (2013)
Correlations between the dynamics of parallel tempering and the free-energy landscape in spin glasses
Burcu Yucesoy et al.
PHYSICAL REVIEW E (2013)
Evidence of Non-Mean-Field-Like Low-Temperature Behavior in the Edwards-Anderson Spin-Glass Model
B. Yucesoy et al.
PHYSICAL REVIEW LETTERS (2012)
Monte Carlo Methods for Rough Free Energy Landscapes: Population Annealing and Parallel Tempering
J. Machta et al.
JOURNAL OF STATISTICAL PHYSICS (2011)
Nature of the spin-glass phase at experimental length scales
R. Alvarez Banos et al.
JOURNAL OF STATISTICAL MECHANICS-THEORY AND EXPERIMENT (2010)
Population annealing with weighted averages: A Monte Carlo method for rough free-energy landscapes
J. Machta
PHYSICAL REVIEW E (2010)
Strengths and weaknesses of parallel tempering
J. Machta
PHYSICAL REVIEW E (2009)
Make life simple: Unleash the full power of the parallel tempering algorithm
Elmar Bittner et al.
PHYSICAL REVIEW LETTERS (2008)
Temperature and disorder chaos in three-dimensional ising spin glasses
Helmut G. Katzgraber et al.
PHYSICAL REVIEW LETTERS (2007)
Universality in three-dimensional ising spin glasses:: A Monte Carlo study
Helmut G. Katzgraber et al.
PHYSICAL REVIEW B (2006)
Feedback-optimized parallel tempering Monte Carlo
HG Katzgraber et al.
JOURNAL OF STATISTICAL MECHANICS-THEORY AND EXPERIMENT (2006)
Parallel tempering: Theory, applications, and new perspectives
DJ Earl et al.
PHYSICAL CHEMISTRY CHEMICAL PHYSICS (2005)
Go with the winners: a general Monte Carlo strategy
P Grassberger
COMPUTER PHYSICS COMMUNICATIONS (2002)
Determining the density of states for classical statistical models: A random walk algorithm to produce a flat histogram
FG Wang et al.
PHYSICAL REVIEW E (2001)
Monte Carlo simulations of spin glasses at low temperatures
HG Katzgraber et al.
PHYSICAL REVIEW B (2001)
Efficient, multiple-range random walk algorithm to calculate the density of states
FG Wang et al.
PHYSICAL REVIEW LETTERS (2001)