Ising model susceptibility: Fuchsian differential equation for (4) and its factorization properties

Abstract

We give the Fuchsian linear differential equation satisfied by (4), the ``four-particle'' contribution to the susceptibility of the isotropic square lattice Ising model. This Fuchsian differential equation is deduced from a series expansion method introduced in two previous papers and is applied with some symmetries and tricks specific to (4). The corresponding order ten linear differential operator exhibits a large set of factorization properties. Among these factorizations one is highly remarkable: it corresponds to the fact that the two-particle contribution (2) is actually a solution of this order ten linear differential operator. This result, together with a similar one for the order seven differential operator corresponding to the three-particle contribution, (3), leads us to a conjecture on the structure of all the n-particle contributions (n).

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