The Ising model is one of the simplest models describing the interacting particles. In this work, we calculate the high temperature series expansions of zero field susceptibility of ising model with ferromagnetic, antiferromagnetic and one antiferromagnetic interactions on two dimensional kagome lattice. Using the Pade´ approximation, we calculate the susceptibility of critical exponent of ferromagnetic ising model γ ≈ 1.75, which is consistent with universality hypothesis. However, antiferromagnetic and one antiferromagnetic interaction ising model doesn’t show any transition at finite temperature because of the effect of magnetic frustration.
Jalali mola,Z. and Shahbazi,F. (2019). High temperature series expansions for the susceptibility of Ising model on the Kagome lattice with nearest neighber interactions. Iranian Journal of Physics Research, 11(3), 321-328.
MLA
Jalali mola,Z. , and Shahbazi,F. . "High temperature series expansions for the susceptibility of Ising model on the Kagome lattice with nearest neighber interactions", Iranian Journal of Physics Research, 11, 3, 2019, 321-328.
HARVARD
Jalali mola Z., Shahbazi F. (2019). 'High temperature series expansions for the susceptibility of Ising model on the Kagome lattice with nearest neighber interactions', Iranian Journal of Physics Research, 11(3), pp. 321-328.
CHICAGO
Z. Jalali mola and F. Shahbazi, "High temperature series expansions for the susceptibility of Ising model on the Kagome lattice with nearest neighber interactions," Iranian Journal of Physics Research, 11 3 (2019): 321-328,
VANCOUVER
Jalali mola Z., Shahbazi F. High temperature series expansions for the susceptibility of Ising model on the Kagome lattice with nearest neighber interactions. Dear user; Recently we have changed our software to Sinaweb. If you had already registered with the old site, you may use the same USERNAME but you need to change your password. To do so at the first use, please choose, 2019; 11(3): 321-328.
