Renormalization Group Patterns and C-Theorem in More Than Two Dimensions

Abstract

We elaborate on a previous attempt to prove the irreversibility of the renormalization group flow above two dimensions. This involves the construction of a monotonically decreasing c-function using a spectral representation. The missing step of the proof is a good definition of this function at the fixed points. We argue that for all kinds of perturbative flows the c-function is well-defined and the c-theorem holds in any dimension. We provide examples in multicritical and multicomponent scalar theories for dimension 2<d<4. We also discuss the non-perturbative flows in the yet unsettled case of the O(N) sigma-model for 2≤ d≤ 4 and large N.

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