Elliptic integral evaluation of a Bessel moment by contour integration of a lattice Green function

Abstract

A proof is found for the elliptic integral evaluation of the Bessel moment M:=∫0∞ t I02(t)K02(t)K0(2t) dt =1/12 K((π/12)) K((π/12)) =6(13)64π222/3 resulting from an angular average of a 2-loop 4-point massive Feynman diagram, with one internal mass doubled. This evaluation follows from contour integration of the Green function for a hexagonal lattice, thereby relating M to a linear combination of two more tractable moments, one given by the Green function for a diamond lattice and both evaluated by using W.N. Bailey's reduction of an Appell double series to a product of elliptic integrals. Cubic and sesquiplicate modular transformations of an elliptic integral from the equal-mass Dalitz plot are proven and used extensively. Derivations are given of the sum rules ∫0∞(I0(a t)K0(a t)-2π K0(4a t) K0(t))K0(t) dt=0 with a>0, proven by analytic continuation of an identity from Bailey's work, and ∫0∞ t I0(a t)(I03(a t)K0(8t)- 14π2 I0(t)K03(t)) dt=0 with 2 a0, proven by showing that a Feynman diagram in two spacetime dimensions generates the enumeration of staircase polygons in four dimensions.