Experimental mathematics on the magnetic susceptibility of the square lattice Ising model

Abstract

We calculate very long low- and high-temperature series for the susceptibility of the square lattice Ising model as well as very long series for the five-particle contribution (5) and six-particle contribution (6). These calculations have been made possible by the use of highly optimized polynomial time modular algorithms and a total of more than 150000 CPU hours on computer clusters. For (5) 10000 terms of the series are calculated modulo a single prime, and have been used to find the linear ODE satisfied by (5) modulo a prime. A diff-Pad\'e analysis of 2000 terms series for (5) and (6) confirms to a very high degree of confidence previous conjectures about the location and strength of the singularities of the n-particle components of the susceptibility, up to a small set of ``additional'' singularities. We find the presence of singularities at w=1/2 for the linear ODE of (5), and w2= 1/8 for the ODE of (6), which are not singularities of the ``physical'' (5) and (6), that is to say the series-solutions of the ODE's which are analytic at w =0. Furthermore, analysis of the long series for (5) (and (6)) combined with the corresponding long series for the full susceptibility yields previously conjectured singularities in some (n), n 7. We also present a mechanism of resummation of the logarithmic singularities of the (n) leading to the known power-law critical behaviour occurring in the full , and perform a power spectrum analysis giving strong arguments in favor of the existence of a natural boundary for the full susceptibility .