CRITICAL (Phi43,ε)
Abstract
The Euclidean (φ4)3,ε model in R3 corresponds to a perturbation by a φ4 interaction of a Gaussian measure on scalar fields with a covariance depending on a real parameter ε in the range 0 ε 1. For ε =1 one recovers the covariance of a massless scalar field in R3. For ε =0 φ4 is a marginal interaction. For 0 ε < 1 the covariance continues to be Osterwalder-Schrader and pointwise positive. After introducing cutoffs we prove that for ε > 0, sufficiently small, there exists a non-gaussian fixed point (with one unstable direction) of the Renormalization Group iterations. These iterations converge to the fixed point on its stable (critical) manifold which is constructed.
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