On the breakdown of dimensional reduction and supersymmetry in random-field models

Abstract

We discuss the breakdown of the Parisi-Sourlas supersymmetry (SUSY) and of the dimensional-reduction (DR) property in the random field Ising and O(N) models as a function of space dimension d and/or number of components N. The functional renormalization group (FRG) predicts that this takes place below a critical line d DR(N). We revisit the perturbative FRG results for the RFO(N)M in d=4+ε and carry out a more comprehensive investigation of the nonperturbative FRG approximation for the RFIM. In light of this FRG description, we discuss the perturbative results in ε=6-d recently derived for the RFIM by Kaviraj, Rychkov, and Trevisani. We stress in particular that the disappearance of the SUSY/DR fixed point below d DR arises as a consequence of the nonlinearity of the FRG equations and cannot be found via the perturbative expansion in ε=6-d (nor in 1/N). We also provide an error bar on the value of the critical dimension d DR for the RFIM, which we find around 5.110.09, by studying several successive orders of the nonperturbative FRG approximation scheme.

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