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Critical and tricritical singularities from small-scale Monte Carlo simulations: the Blume–Capel model in two dimensions

Leïla Moueddene, Nikolaos G. Fytas, Yurij Holovatch, Ralph Kenna, Bertrand Berche

2024Journal of Statistical Mechanics Theory and Experiment25 citationsDOI

Abstract

Abstract We show that accurate insights into the critical properties of the Blume–Capel model at two dimensions can be deduced from Monte Carlo simulations, even for small system sizes, when one analyses the behaviour of the zeros of the partition function. The phase diagram of the model displays a line of second-order phase transitions ending at a tricritical point, then a line of first-order transitions. We concentrate on critical and tricritical properties and compare the accuracy achieved via standard finite-size scaling of thermodynamic quantities with that from the zeros analysis. This latter analysis showcases spectacular precision, even for systems as small as 64 spins. We also show that the zeros are very sensitive to subtle crossover effects.

Topics & Concepts

Monte Carlo methodStatistical physicsScale (ratio)Gravitational singularityPhysicsTricritical pointMathematicsPhase diagramStatisticsQuantum mechanicsPhase (matter)Theoretical and Computational PhysicsStochastic processes and statistical mechanicsMarkov Chains and Monte Carlo Methods
Critical and tricritical singularities from small-scale Monte Carlo simulations: the Blume–Capel model in two dimensions | Litcius