A. Caramico D'Auria scite author profile

We formulate the spectral-density method in classical statistical mechanics in strict analogy with the known quantum version, and we apply it to the classical Heisenberg ferromagnetic model in an external field. A new formula for the magnetization in the classical formulation of spin-vector Green functions is derived for arbitrary spatial dimensionality. Furthermore, the static properties of the oneand three-dimensional cases are considered in detail. We obtain accurate results over a wide range of temperatures with the external field for the one-dimensional model and without field for the three-dimensional model. In the first case very good agreement with the exact numerical transfer-matrix data is also found in the region of higher temperature where the interacting-boson approach fails. In particular the zero-field susceptibility results are found to be consistent with the exact results obtained by Fisher.

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On exactly solvable models for systems with quantum-phase transitions

D'Auria

Cesare

Rabuffo

2002

Physica A: Statistical Mechanics and its Applications

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Low-temperature critical properties and crossovers of a spin-12planar ferromagnet in4−εdimensions

et al. 2008

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Phenomenological modeling of molecular-based rings beyond the strong exchange limit: Bond alternation and single-ion anisotropy effects

Kamieniarz

Kozłowski

Musiał

et al. 2008

Inorganica Chimica Acta

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Quantum transfer-matrix approach toS=1antiferromagnetic chains at finite temperatures

et al. 1997

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