Exact Strongly Coupled Fixed Point in g4 Theory

Abstract

We show explicitly how a strongly coupled fixed point can be constructed in scalar g4 theory from the solutions to a non-linear eigenvalue problem. The fixed point exists only for d< 4, is unstable and characterized by =2/d (correlation length exponent), η=1/2-d/8 (anomalous dimension). For d=2, these exponents reproduce to those of the Ising model which can be understood from the codimension of the critical point. At this fixed point, 2i terms with i>2 are all irrelevant. The testable prediction of this fixed point is that the specific heat exponent vanishes. 2d critical Mott systems are well described by this new fixed point.