Massless scalar Feynman diagrams: five loops and beyond

Abstract

Several powerful techniques for evaluating massless scalar Feynman diagrams are developed, viz: the solution of recurrence relations to evaluate diagrams with arbitrary numbers of loops in n=4-2ω dimensions; the discovery and use of symmetry properties to restrict and compute Taylor series in ω; the reduction of triple sums over Chebyshev polynomials to products of Riemann zeta functions; the exploitation of conformal invariance to avoid four-dimensional Racah coefficients. As an example of the power of these techniques we evaluate all of the 216 diagrams, with 5 loops or less, which give finite contributions of order 1/k2 or 1/k4 to a propagator of momentum k in massless four-dimensional scalar field theories. Remarkably, only 5 basic numbers are encountered: ζ(3), ζ(5), ζ(7), ζ(9) and the value of the most symmetrical diagram, which is calculated to 14 significant figures. It is conceivable that these are the only irrationals appearing in 6-loop beta functions. En route to these results we uncover and only partially explain many remarkable relations between diagrams.