English

Summing Radiative Corrections to the Effective Potential

High Energy Physics - Theory 2011-01-04 v2

Abstract

When one uses the Coleman-Weinberg renormalization condition, the effective potential VV in the massless ϕ44\phi_4^4 theory with O(N) symmetry is completely determined by the renormalization group functions. It has been shown how the (p+1)(p+1) order renormalization group function determine the sum of all the N\mboxp^{\mbox{\scriptsize p}}LL order contribution to VV to all orders in the loop expansion. We discuss here how, in addition to fixing the N\mboxp^{\mbox{\scriptsize p}}LL contribution to VV, the (p+1)(p+1) order renormalization group functions also can be used to determine portions of the N\mboxp+n^{\mbox{\scriptsize p+n}}LL contributions to VV. When these contributions are summed to all orders, the singularity structure of \mcv is altered. An alternate rearrangement of the contributions to VV in powers of lnϕ\ln \phi, when the extremum condition V(ϕ=v)=0V^\prime (\phi = v) = 0 is combined with the renormalization group equation, show that either v=0v = 0 or VV is independent of ϕ\phi. This conclusion is supported by showing the LL, \cdots, N4^4LL contributions to VV become progressively less dependent on ϕ\phi.

Keywords

Cite

@article{arxiv.1005.1936,
  title  = {Summing Radiative Corrections to the Effective Potential},
  author = {F. A. Chishtie and T. Hanif and Junji Jia and 1 and D. G. C. McKeon and T. N. Sherry},
  journal= {arXiv preprint arXiv:1005.1936},
  year   = {2011}
}

Comments

16 pages; added 2 figures and 2 tables; references revised

R2 v1 2026-06-21T15:21:27.888Z