Uniform analyticity of local observables is proved in FK-percolation under mixing conditions, yielding analyticity of Potts/Ising magnetization in the supercritical regime and susceptibility in the subcritical regime.
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Hyperstatistics derives closed-form q-generalized Boltzmann factors for non-Boltzmann-Gibbs domains that reduce to q-exponentials across uniform, gamma, log-normal, F, and q-gamma distributions.
The magnetic behavior in the Griffiths phase of three-dimensional antiferromagnetic and ferrimagnetic Ising systems is more unusual than in ferromagnetic systems, with a framework provided for its identification.
citing papers explorer
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Uniform analyticity of local observables in FK-percolation and analyticity of the Ising spontaneous magnetisation
Uniform analyticity of local observables is proved in FK-percolation under mixing conditions, yielding analyticity of Potts/Ising magnetization in the supercritical regime and susceptibility in the subcritical regime.
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Hyperstatistics
Hyperstatistics derives closed-form q-generalized Boltzmann factors for non-Boltzmann-Gibbs domains that reduce to q-exponentials across uniform, gamma, log-normal, F, and q-gamma distributions.
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Magnetic Behavior of Ferro-, Antiferro-, and Ferrimagnetic Systems in the Griffiths Phase: A Theoretical Study
The magnetic behavior in the Griffiths phase of three-dimensional antiferromagnetic and ferrimagnetic Ising systems is more unusual than in ferromagnetic systems, with a framework provided for its identification.