The effective potential in the presence of several mass scales

Abstract

We consider the problem of improving the effective potential in mass independent schemes, as e.g. the or renormalization scheme, in the presence of an arbitrary number of fields with φ-dependent masses Mi(φc). We use the decoupling theorem at the scales μi=Mi(φc) such that the matching between the effective (low energy) and complete (high energy) one-loop theories contains no thresholds. We find that for any value of φc, there is a convenient scale μ*i\Mi(φc)\, at which the loop expansion has the best behaviour and the effective potential has the least μ-dependence. Furthermore, at this scale the effective potential coincides with the (improved) tree-level one in the effective field theory. The decoupling method is explicitly illustrated with a simple Higgs-Yukawa model, along with its relationship with other decoupling prescriptions and with proposed multi-scale renormalization approaches. The procedure leads to a nice suppression of potentially large logarithms and can be easily adapted to include higher-loop effects, which is explicitly shown at the two-loop level.

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