Theory of the phase boundary for cubic Ising lattices with pair-quartet interactions
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Theory of the phase boundary for cubic Ising lattices with pair-quartet interactions. / Frank, B.; Mouritsen, O. G.
In: Journal of Physics C: Solid State Physics, Vol. 16, No. 13, 1983, p. 2481-2496.Research output: Contribution to journal › Journal article › Research › peer-review
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TY - JOUR
T1 - Theory of the phase boundary for cubic Ising lattices with pair-quartet interactions
AU - Frank, B.
AU - Mouritsen, O. G.
PY - 1983
Y1 - 1983
N2 - A theory is presented for the determination of the transition temperature Tc for spin-1/2 Ising models on cubic lattices with pair (J2) and quartet (J4) interactions. A linear relationship between Tc and J4/J2 is found to have a base wider in scope than that of previous theories. The calculation of the linear coefficient is performed through the derivation of a new equation for special four-spin correlation functions which is solved in a novel way by the use of a ratio approximation. The results are compared with those derived from previous theories, series analysis and Monte Carlo calculations which are also presented here. The linear coefficient is shown to depend on a parameter which turns out to have approximately the same value for all cubic lattices, thus suggesting a set of scaled variables in terms of which the phase boundary for all cubic lattices may be fitted by a common curve. From the authors' work a coherent picture emerges for the phase behaviour of cubic Ising lattices with pair and quartet interactions, involving regions of continuous and first-order transitions separated by a tricritical point which occurs at the same value of the scaled variables for all cubic lattices.
AB - A theory is presented for the determination of the transition temperature Tc for spin-1/2 Ising models on cubic lattices with pair (J2) and quartet (J4) interactions. A linear relationship between Tc and J4/J2 is found to have a base wider in scope than that of previous theories. The calculation of the linear coefficient is performed through the derivation of a new equation for special four-spin correlation functions which is solved in a novel way by the use of a ratio approximation. The results are compared with those derived from previous theories, series analysis and Monte Carlo calculations which are also presented here. The linear coefficient is shown to depend on a parameter which turns out to have approximately the same value for all cubic lattices, thus suggesting a set of scaled variables in terms of which the phase boundary for all cubic lattices may be fitted by a common curve. From the authors' work a coherent picture emerges for the phase behaviour of cubic Ising lattices with pair and quartet interactions, involving regions of continuous and first-order transitions separated by a tricritical point which occurs at the same value of the scaled variables for all cubic lattices.
U2 - 10.1088/0022-3719/16/13/011
DO - 10.1088/0022-3719/16/13/011
M3 - Journal article
AN - SCOPUS:30244568736
VL - 16
SP - 2481
EP - 2496
JO - Journal of Physics C: Solid State Physics
JF - Journal of Physics C: Solid State Physics
SN - 0022-3719
IS - 13
ER -
ID: 238388443