Summing Radiative Corrections to the Effective Potential

Abstract

When one uses the Coleman-Weinberg renormalization condition, the effective potential V in the massless φ44 theory with O(N) symmetry is completely determined by the renormalization group functions. It has been shown how the (p+1) order renormalization group function determine the sum of all the N pLL order contribution to V to all orders in the loop expansion. We discuss here how, in addition to fixing the N pLL contribution to V, the (p+1) order renormalization group functions also can be used to determine portions of the N p+nLL contributions to V. When these contributions are summed to all orders, the singularity structure of is altered. An alternate rearrangement of the contributions to V in powers of φ, when the extremum condition V (φ = v) = 0 is combined with the renormalization group equation, show that either v = 0 or V is independent of φ. This conclusion is supported by showing the LL, ·s, N4LL contributions to V become progressively less dependent on φ.