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Understanding population annealing Monte Carlo simulations

Martin Weigel, Lev Barash, Lev Shchur, Wolfhard Janke

2021Physical review. E30 citationsDOIOpen Access PDF

Abstract

Population annealing is a recent addition to the arsenal of the practitioner in computer simulations in statistical physics and it proves to deal well with systems with complex free-energy landscapes. Above all else, it promises to deliver unrivaled parallel scaling qualities, being suitable for parallel machines of the biggest caliber. Here we study population annealing using as the main example the two-dimensional Ising model, which allows for particularly clean comparisons due to the available exact results and the wealth of published simulational studies employing other approaches. We analyze in depth the accuracy and precision of the method, highlighting its relation to older techniques such as simulated annealing and thermodynamic integration. We introduce intrinsic approaches for the analysis of statistical and systematic errors and provide a detailed picture of the dependence of such errors on the simulation parameters. The results are benchmarked against canonical and parallel tempering simulations.

Topics & Concepts

Parallel temperingSimulated annealingScalingMonte Carlo methodStatistical physicsComputer sciencePopulationIsing modelAlgorithmTheoretical computer scienceMonte Carlo molecular modelingMathematicsStatisticsPhysicsMarkov chain Monte CarloGeometryDemographySociologyTheoretical and Computational PhysicsComplex Network Analysis TechniquesStochastic processes and statistical mechanics
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