The Ising correlation C(M,N) for =-k

Abstract

We present Painlev\'e VI sigma form equations for the general Ising low and high temperature two-point correlation functions C(M,N) with M ≤ N in the special case = -k where = \, 2Eh/kBT/ 2Ev/kBT. More specifically four different non-linear ODEs depending explicitly on the two integers M and N emerge: these four non-linear ODEs correspond to distinguish respectively low and high temperature, together with M+N even or odd. These four different non-linear ODEs are also valid for M N when = -1/k. For the low-temperature row correlation functions C(0,N) with N odd, we exhibit again for this selected = \, -k condition, a remarkable phenomenon of a Painlev\'e VI sigma function being the sum of four Painlev\'e VI sigma functions having the same Okamoto parameters. We show in this = \, -k case for T < Tc and also T > Tc, that C(M,N) with M ≤ N is given as an N × N Toeplitz determinant.