Asymptotic Behavior of the Function in the 4 Theory: A Scheme Without Complex Parameters

Abstract

The previously obtained analytical asymptotic expressions for the Gell-Mann - Low function β(g) and anomalous dimensions of φ4 theory in the limit g∞ are based on the parametric representation of the form g = f(t), β(g) = f1(t) (where t g0-1/2 is the running parameter related to the bare charge g0), which is simplified in the complex t plane near a zero of one of the functional integrals. In the present paper, it is shown that the parametric representation has a singularity at t 0; for this reason, similar results can be obtained for real values of g0. The problem of the correct transition to the strong coupling regime is simultaneously solved; in particular, the constancy of the bare or renormalized mass is not a correct condition of this transition. A partial proof is given for the theorem of the renormalizability in the strong coupling region.