Consistency Relation for Fixed Point Dynamics
Abstract
We gain insight on the fixed point dynamics of d dimensional quantum field theories by exploiting the critical behavior of the d-ε sister theories. To this end we first derive a self-consistent relation between the d-ε scaling exponents and the associated d dimensional beta functions. We then demonstrate that to account for an interacting fixed point in the original theory the related d-ε scaling exponent must be multi-valued in ε. We elucidate our findings by discussing several examples such as the QCD Banks-Zaks infrared fixed point, QCD at large number of flavors, as well as the O(N) model in four dimensions. For the latter, we show that although the 1/N corrections prevent the reconstruction of the renormalization group flow, this is possible when adding the 1/N2 contributions.
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