Resummation of the Two Distinct Large Logarithms in the Broken O(N)-symmetric φ4-model

Abstract

The loop-expansion of the effective potential in the O(N)-symmetric φ4-model contains generically two types of large logarithms. To resum those systematically a new minimal two-scale subtraction scheme is introduced in an O(N)-invariant generalization of . As the beta functions depend on the renormalization scale-ratio a large logarithms resummation is performed on them. Two partial renormalization group equations are derived to turn the beta functions into running parameters. With the use of standard perturbative boundary conditions, which become applicable in , the leading logarithmic effective potential is computed. The calculation indicates that there is no stable vacuum in the broken phase of the theory for 1<N≤ 4.

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