[PDF][PDF] A Husimi Rhombus Lattice with Random Angles to Present the Space Stochasticity in Exact Thermodynamic Calculation
R Huang, C Wu, C Chen - arXiv preprint arXiv:1502.06560, 2015 - researchgate.net
Square unit in Husimi lattice (the Bethe square lattice) is generalized to be rhombus with
randomly variable angles. The independence feature of unit cells in recursive lattice makes …
randomly variable angles. The independence feature of unit cells in recursive lattice makes …
[HTML][HTML] A Husimi rhombus lattice with random angles to present the configurational stochasticity in exact thermodynamic calculation
R Huang - Results in Physics, 2019 - Elsevier
The square unit in Husimi lattice is generalized to be rhombus with random angles. The
independence feature of unit cells in recursive lattice makes the random conformation …
independence feature of unit cells in recursive lattice makes the random conformation …
Thermodynamics and Phase Transitions of Ising Model on Inhomogeneous Stochastic Recursive Lattice
R Huang - APS March Meeting Abstracts, 2016 - ui.adsabs.harvard.edu
As one of the few exactly solvable thermodynamic models, the Ising model on recursive
lattice is featured by its impressive advantages and successful applications in various …
lattice is featured by its impressive advantages and successful applications in various …
[PDF][PDF] Cooperation of genetic and metropolis algorithms for finding unconventional thermodynamic behaviour of many-body systems
R Volotovskiy, Y Shevchenko, A Perzhu… - Fifth Asian School …, 2020 - spsl.nsc.ru
All magnetic materials have at least two thermodynamic phases—order and disorder, which
determine the second-order phase transition. The peak in the temperature behavior of the …
determine the second-order phase transition. The peak in the temperature behavior of the …
Phase Transition of Ferromagnetic Ising Spins on Husimi Lattice of Variable Unit Ensemble
R Huang, C Chen - Journal of the Physical Society of Japan, 2014 - journals.jps.jp
The Husimi recursive lattice is extended to a hybrid ensemble of variable unit cells. This
enables the Husimi lattice to be more versatile in describing complex systems, including …
enables the Husimi lattice to be more versatile in describing complex systems, including …
Thermodynamic and magnetic properties of the Archimedean lattices
QL Zhang - International Journal of Modern Physics B, 2005 - World Scientific
We numerically study the thermodynamic properties of two Archimedean lattices1 with Ising
spins using Wang–Landau algorithm of the Monte Carlo simulation. The two Archimedean …
spins using Wang–Landau algorithm of the Monte Carlo simulation. The two Archimedean …
Enhancing Monte Carlo methods by using a generalized fluctuation theory
L Velazquez - arXiv preprint cond-mat/0612683, 2006 - arxiv.org
According to the recently obtained thermodynamic uncertainty relation, the microcanonical
regions with a negative heat capacity can be accessed within a canonical-like description by …
regions with a negative heat capacity can be accessed within a canonical-like description by …
[HTML][HTML] Ising spins on randomly multi-branched Husimi square lattice: Thermodynamics and phase transition in cross-dimensional range
R Huang - Physics Letters A, 2016 - Elsevier
An inhomogeneous random recursive lattice is constructed from the multi-branched Husimi
square lattice. The number of repeating units connected on one vertex is randomly set to be …
square lattice. The number of repeating units connected on one vertex is randomly set to be …
A Comparison of Thermal and Magnetic Behaviors in Triangular, Square and Pentagonal Husimi-Like Structures: Monte Carlo Simulations
Z Fadil, A Mhirech, B Kabouchi, L Bahmad… - Spin, 2021 - World Scientific
In this work, Monte Carlo simulations have been performed to investigate the magnetic
properties and thermal behavior of different Husimi-like structures: triangular, square and …
properties and thermal behavior of different Husimi-like structures: triangular, square and …
[HTML][HTML] Critical temperature and magnetic properties of new 2D lattice model with double hexagonal symmetry: Monte Carlo study
Here, we present a theoretical study of a new statistical lattice model based on a double
hexagonal structure associated with G 2 symmetry. Using Monte Carlo simulation, we study …
hexagonal structure associated with G 2 symmetry. Using Monte Carlo simulation, we study …