At four loops there first occurs a test of the four-term relation derived by
the second author in the course of investigating whether counterterms from
subdivergence-free diagrams form a weight system. This test relates
counterterms in a four-dimensional field theory with Yukawa and ϕ4
interactions, where no such relation was previously suspected. Using
integration by parts, we reduce each counterterm to massless two-loop two-point
integrals. The four-term relation is verified, with =0−3ζ3+6ζ3−3ζ3=0, demonstrating non-trivial cancellation of
the trefoil knot and thus supporting the emerging connection between knots and
counterterms, via transcendental numbers assigned by four-dimensional field
theories to chord diagrams. Restrictions to scalar couplings and renormalizable
interactions are found to be necessary for the existence of a pure four-term
relation. Strong indications of richer structure are given at five loops.Comment: minor changes, references updated, 10 pages, LaTe
