English

Primitive asymptotics in $\phi^4$ vector theory

High Energy Physics - Theory 2026-03-17 v2 Mathematical Physics Combinatorics math.MP

Abstract

A longstanding conjecture in ϕ44\phi^4_4 theory is that primitive graphs dominate the beta function asymptotically at large loop order in the minimal-subtraction scheme. Here we investigate this issue by exploiting additional combinatorial structure coming from an extension to vectors with O(N)O(N) symmetry. For the 0-dimensional case, we calculate the NN-dependent generating function of primitive graphs and its asymptotics, including arbitrarily many subleading corrections. We find that the leading asymptotic growth rate becomes visible only above 25\approx 25 loops, while data at lower order is suggestive of a wrong asymptotics. Our results also yield the symmetry-factor weighted sum of 3-connected cubic graphs, and the exact asymptotics of Martin invariants. For individual Feynman graphs, we give bounds on their degree in NN depending on their coradical degree, and construct the primitive graphs of highest degree explicitly. We calculate the 4D primitive beta function numerically up to 17 loops, and find its behaviour to be qualitatively similar to the 0D case. The locations of zeros quickly approach their large-loop asymptotics at negative integer NN, while the growth rate of the beta function differs from the asymptotic prediction even at 17 loops.

Keywords

Cite

@article{arxiv.2412.08617,
  title  = {Primitive asymptotics in $\phi^4$ vector theory},
  author = {Paul-Hermann Balduf and Johannes Thürigen},
  journal= {arXiv preprint arXiv:2412.08617},
  year   = {2026}
}

Comments

67 pages, numerous figures, 7 tables. Further raw data available from the first author

R2 v1 2026-06-28T20:31:23.167Z