Reentrant and forward phase diagrams of the anisotropic three-dimensional Ising spin glass.

@article{Gven2008ReentrantAF,
  title={Reentrant and forward phase diagrams of the anisotropic three-dimensional Ising spin glass.},
  author={Can G{\"u}ven and A. Nihat Berker and Michael Hinczewski and Hidetoshi Nishimori},
  journal={Physical review. E, Statistical, nonlinear, and soft matter physics},
  year={2008},
  volume={77 6 Pt 1},
  pages={
          061110
        }
}
The spatially uniaxially anisotropic d=3 Ising spin glass is solved exactly on a hierarchical lattice. Five different ordered phases, namely, ferromagnetic, columnar, layered, antiferromagnetic, and spin-glass phases, are found in the global phase diagram. The spin-glass phase is more extensive when randomness is introduced within the planes than when it is introduced in lines along one direction. Phase diagram cross sections, with no Nishimori symmetry, with Nishimori symmetry lines, or… 
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References

SHOWING 1-10 OF 138 REFERENCES
Phase diagram of the two-dimensional +/-J Ising spin glass.
  • F. Nobre
  • Physics
    Physical review. E, Statistical, nonlinear, and soft matter physics
  • 2001
TLDR
An accurate paramagnetic-ferromagnetic boundary is presented: the estimate for the slope at p=1 is in very good agreement with the well-known exact result, whereas the coordinates of the Nishimori point are determined within a high precision.
Phase diagram of gauge glasses
The authors introduce a general class of random spin systems which are symmetric under local gauge transformations. Their model is a generalization of the usual Ising spin glass and includes the Zq,
Phase transitions of the Ashkin-Teller model including antiferromagnetic interactions on a type of diamond hierarchical lattice.
Using the real-space renormalization-group transformation, we study the phase transitions of the Ashkin-Teller model including the antiferromagnetic interactions on a type of diamond hierarchical
Multicritical point relations in three dual pairs of hierarchical-lattice Ising spin glasses
The Ising spin glasses are investigated on three dual pairs of hierarchical lattices, using exact renormalization-group transformation of the quenched bond probability distribution. The goal is to
Statics and dynamics of the ten-state nearest-neighbour Potts glass on the simple-cubic lattice
We present the results of Monte Carlo simulations of two different three-dimensional-Potts glass models with short-range random interactions. In the first model, a ±J-distribution of the bonds is
d = 3 anisotropic and d = 2 tJ models: phase diagrams, thermodynamic properties, and chemical potential shift
Abstract. The anisotropic d=3 tJ model is studied by renormalization-group theory, yielding the evolution of the system as interplane coupling is varied from the isotropic three-dimensional to
Exact location of the multicritical point for finite-dimensional spin glasses: a conjecture
We present a conjecture on the exact location of the multicritical point in the phase diagram of spin glass models in finite dimensions. By generalizing our previous work, we combine duality and
Symmetry, complexity and multicritical point of the two-dimensional spin glass
We analyse models of spin glasses on the two-dimensional square lattice by exploiting symmetry arguments. The replicated partition functions of the Ising and related spin glasses are shown to have
Multicritical Points of Potts Spin Glasses on the Triangular Lattice(General)
We predict the locations of several multicritical points of the Potts spin glass model on the triangular lattice. In particular, continuous multicritical lines, which consist of multicritical points,
Phase diagrams and crossover in spatially anisotropic d = 3 Ising, XY magnetic, and percolation systems: exact renormalization-group solutions of hierarchical models.
TLDR
Hierarchical lattices that constitute spatially anisotropic systems are introduced and global phase diagrams are obtained for Ising and XY magnetic models and percolation systems, including crossovers from algebraic order to true long-range order.
...
...