Short-Time Dynamics of the Three-Dimensional Fully Frustrated Ising Model
V.A. Mutailamov, A.K. Murtazaev
TL;DR
This study investigates the short-time critical dynamics of the 3D fully frustrated Ising model, providing new estimates of static and dynamic critical exponents using Monte Carlo simulations.
Contribution
It presents the first analysis of short-time dynamics for the 3D fully frustrated Ising model, including critical exponents obtained via Monte Carlo methods.
Findings
Static critical exponents for magnetization and correlation radius determined.
Dynamic critical exponent calculated for the model.
Simulation performed on large system sizes with N=262144 spins.
Abstract
The critical relaxation from the low-temperature ordered state of the three-dimensional fully frustrated Ising model on a simple cubic lattice has been studied using the short time dynamics method. Particles with the periodic boundary conditions containing N = 262144 spins have been studied. Calculations have been performed by the standard Metropolis Monte Carlo algorithm. The static critical exponents of the magnetization and correlation radius have been obtained. The dynamic critical exponent of the model under study has been calculated.
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Taxonomy
TopicsTheoretical and Computational Physics · Opinion Dynamics and Social Influence · Complex Network Analysis Techniques