Efficient Numerical Evaluation of Thermodynamic Quantities on Infinite (Semi-)classical Chains

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Abstract

This work presents an efficient numerical method to evaluate the free energy density and associated thermodynamic quantities of (quasi) one-dimensional classical systems, by combining the transfer operator approach with a numerical discretization of integral kernels using quadrature rules. For analytic kernels, the technique exhibits exponential convergence in the number of quadrature points. As demonstration, we apply the method to a classical particle chain, to the semiclassical nonlinear Schrödinger (NLS) equation and to a classical system on a cylindrical lattice. A comparison with molecular dynamics simulations performed for the NLS model shows very good agreement.

Original languageEnglish
Article number57
JournalJournal of Statistical Physics
Volume182
Issue number3
DOIs
StatePublished - Mar 2021

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