An integral arising from the chiral sl(n) Potts model

Abstract

We show that the integral J(t) = (1/π3) ∫0π ∫0π ∫0π dx dy dz (t - x - y - z + xyz), can be expressed in terms of 5F4 hypergeometric functions. The integral arises in the solution by Baxter and Bazhanov of the free-energy of the sl(n) Potts model, which includes the term J(2). Our result immediately gives the logarithmic Mahler measure of the Laurent polynomial k - (x+1/x) - (y+1/y) - (z+1/z) + 1/4(x+1/x) (y+1/y) (z+1/z) in terms of the same hypergeometric functions.