Low-temperature asymptotics of free energy of 3D Ising model in an external magnetic field

Martin S. Kochman'ski

Published 1997-10-20Version 1

The paper presents new method for calculating the low-temperature asymptotics of free energy of the 3D Ising model in external magnetic field $(H\neq 0)$. The results obtained are valid in the wide range of temperature and magnetic field values fulfilling the condition: $[1-\tanh(h/2)]\sim\epsilon,$ for $\epsilon\ll 1$, where $h=\beta H$, $\beta$ - the inverse temperature and $H$ - external magnetic field. For this purpose the method of transfer-matrix, and generalized Jordan-Wigner transformations, in the form introduced by the author in $\cite{mkoch95}$, are applied.