Six-loop expansion of three-dimensional U(n)× U(m) models

Abstract

We analyze the Landau-Wilson field theory with U(n)×U(m) symmetry which describes the finite-temperature phase transition in QCD in the limit of vanishing quark masses with n=m=Nf flavors and unbroken anomaly at the critical temperature. The six-loop expansions of the renormalization group functions are calculated within the Minimal Subtraction scheme in 4 - dimensions. The series for the upper marginal dimensionality n+(m,4-) -- the key quantity of the theory -- are obtained and resummed by means of different approaches. The numbers found are compared with their counterparts obtained earlier within lower perturbative orders and the pseudo- analysis of massive six-loop three-dimensional expansions. In particular, using an increase in the accuracy of numerical results for n+(m,3) by one order of magnitude, we strengthen the conclusions obtained within previous order in perturbation theory about fairness of the inequality n+(m,3)>m. This, in turn, indicates the absence of a stable three-dimensional fixed point for n=m, and as a consequence a first-order kind of finite-temperature phase transition in light QCD.