Square lattice Ising model (5) ODE in exact arithmetic

Abstract

We obtain in exact arithmetic the order 24 linear differential operator L24 and right hand side E(5) of the inhomogeneous equationL24((5)) = E(5), where (5) =(5)-(3)/2+(1)/120 is a linear combination of n-particle contributions to the susceptibility of the square lattice Ising model. In Bostan, et al. (J. Phys. A: Math. Theor. 42, 275209 (2009)) the operator L24 (modulo a prime) was shown to factorize into L12( left) · L12( right); here we prove that no further factorization of the order 12 operator L12( left) is possible. We use the exact ODE to obtain the behaviour of (5) at the ferromagnetic critical point and to obtain a limited number of analytic continuations of (5) beyond the principal disk defined by its high temperature series. Contrary to a speculation in Boukraa, et al (J. Phys. A: Math. Theor. 41 455202 (2008)), we find that (5) is singular at w=1/2 on an infinite number of branches.