New definite integrals and a two-term dilogarithm identity

Abstract

Among the several proofs known for Σn=1∞1/n2 = π2/6, the one by Beukers, Calabi, and Kolk involves the evaluation of \,∫01 ∫011/(1-x2 y2) \, dx \, dy. It starts by showing that this double integral is equivalent to 34 Σn=1∞1/n2, and then a non-trivial trigonometric change of variables is applied which transforms that integral into \,∫ ∫T \: 1 \; du \, dv, where T is a triangular domain whose area is simply π2/8. Here in this note, I introduce a hyperbolic version of this change of variables and, by applying it to the above integral, I find exact closed-form expressions for ∫0∞[-1(u)-u] d u, \,∫α∞[u--1(u)] d u, and \,∫\,α/2∞(u) \: d u, where α = -1(1). From the latter integral, I also derive a two-term dilogarithm identity.