Critical Relaxation of a Three-Dimensional Fully Frustrated Ising Model

Critical relaxation from the low-temperature ordered state of the three-dimensional fully frustrated Ising model on a simple cubic lattice is studied by the short-time dynamics method. Cubic systems with periodic boundary conditions and linear sizes of L = 32, 64, 96, and 128 in each crystallographi...

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Bibliographic Details
Published in:Physics of the solid state 2018-06, Vol.60 (6), p.1120-1124
Main Authors: Mutailamov, V. A., Murtazaev, A. K.
Format: Article
Language:English
Subjects:
ALGORITHMS
Analysis
BOUNDARY CONDITIONS
Computer simulation
COMPUTERIZED SIMULATION
CONDENSED MATTER PHYSICS, SUPERCONDUCTIVITY AND SUPERFLUIDITY
CORRELATIONS
CRYSTALLOGRAPHY
Cubic lattice
CUBIC LATTICES
Exponents
ISING MODEL
Magnetism
MAGNETIZATION
Mathematical models
MONTE CARLO METHOD
Monte Carlo methods
Monte Carlo simulation
PERIODICITY
Physics
Physics and Astronomy
RELAXATION
Solid State Physics
Three dimensional models
THREE-DIMENSIONAL CALCULATIONS
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Summary:Critical relaxation from the low-temperature ordered state of the three-dimensional fully frustrated Ising model on a simple cubic lattice is studied by the short-time dynamics method. Cubic systems with periodic boundary conditions and linear sizes of L = 32, 64, 96, and 128 in each crystallographic direction are studied. Calculations were carried out by the Monte Carlo method using the standard Metropolis algorithm. The static critical exponents for the magnetization and correlation radius and the dynamic critical exponents are calculated.
ISSN:1063-7834
1090-6460
DOI:10.1134/S1063783418060264