ϕ6 at 6 (and some 8) loops in 3d

Abstract

We recalculate the contributions of individual six loop graphs to the β-function for a three dimensional scalar theory with an arbitrary sextic scalar potential. Previously this was calculated by Hager who specialised to a theory with maximal O(N) symmetry. Our results differ in some contributions to the overall β-function but agree with a recent calculation Kompaniets2. At large N three eight loop diagrams which are relevant are calculated. At the O(N) fixed point some critical exponents are determined to O(3). Imposing that the β-function satisfies a gradient flow equation is shown to require linear relations between some β-function coefficients. The curvature for the associated metric is also determined. Detailed results for the Feynman integrals are described in the appendices.