A note on the cluster variation method.
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Publication:1963519
DOI10.1007/BF01019726zbMath1084.82510OpenAlexW2021165211MaRDI QIDQ1963519
Publication date: 2 February 2000
Published in: Journal of Statistical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf01019726
Related Items (17)
Pair correlations and structure factor of the \(J_1\)-\(J_2\) square lattice Ising model in an external field ⋮ Geometrical folding transitions of the triangular lattice in the face-centred cubic lattice ⋮ Cluster variation method and Möbius inversion formula ⋮ Alternative variational approach to cactus lattices ⋮ Magnetocaloric effect in the \(J_x\)-\(J_y\) Blume-Capel model ⋮ Spin Glass approach to the feedback vertex set problem ⋮ Generalized belief propagation for the magnetization of the simple cubic Ising model ⋮ Region graph partition function expansion and approximate free energy landscapes: theory and some numerical results ⋮ Virtual-site correlation mean field approach to criticality in spin systems ⋮ Lowering the error floor of Gallager codes: a statistical-mechanical view ⋮ Multiparticle correlation expansion of relative entropy in lattice systems ⋮ On one-step replica symmetry breaking in the Edwards–Anderson spin glass model ⋮ Variational approximations for stochastic dynamics on graphs ⋮ Metastable and unstable states of the Blume-Capel model obtained by the cluster variation method and the path probability method ⋮ Folding transitions of the square-diagonal two-dimensional lattice ⋮ A general method of solution for the cluster variation method in ionic solids, with application to diffusionless transitions in yttria-stabilized zirconia ⋮ On the convergence of kikuchi's natural iteration method
Cites Work
- Generalized Cumulant Expansion Method
- [https://portal.mardi4nfdi.de/wiki/Publication:5731810 On the foundations of combinatorial theory I. Theory of M�bius Functions]
- A Theory of Cooperative Phenomena
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