Critical \((\Phi^4)_{3,\epsilon}\)

DOI10.1007/S00220-003-0895-4zbMATH Open1053.81065arXivhep-th/0206040OpenAlexW2773602843MaRDI QIDQ1416924

Author name not available (Why is that?)

Publication date: 16 December 2003

Published in: (Search for Journal in Brave)

Abstract: The Euclidean

model in

R^{3}

corresponds to a perturbation by a

p h i^{4}

interaction of a Gaussian measure on scalar fields with a covariance depending on a real parameter

e p s i l o n

in the range

0 l e e p s i l o n l e 1

. For

e p s i l o n = 1

one recovers the covariance of a massless scalar field in

R^{3}

. For

e p s i l o n = 0

p h i^{4}

is a marginal interaction. For

0 l e e p s i l o n < 1

the covariance continues to be Osterwalder-Schrader and pointwise positive. After introducing cutoffs we prove that for

e p s i l o n > 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.

Full work available at URL: https://arxiv.org/abs/hep-th/0206040

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