Renormalized coupling constants for 3D scalar λφ4 field theory and pseudo-ε-expansion

Abstract

Renormalized coupling constants g2k that enter the critical equation of state and determine nonlinear susceptibilities of the system possess universal values g*2k at the Curie point. They are calculated, along with the ratios R2k = g2k/g4k-1, for the three-dimensional scalar λφ4 field theory within the pseudo-ε-expansion approach. Pseudo-ε-expansions for g*6, g*8, R*6, and R*8 are derived in the five-loop approximation, numerical estimates are presented for R*6 and R*8. The higher-order coefficients of the pseudo-ε-expansions for the sextic coupling are so small that simple Pade approximants turn out to be sufficient to yield very good numerical results. Their use gives R*6 = 1.650 while the most recent lattice estimate is R*6 = 1.649(2). For the octic coupling pseudo-ε-expansions are less favorable from the numerical point of view. Nevertheless, Pade-Borel resummation leads in this case to R*8 = 0.890, the number differing only slightly from the values R*8 = 0.871, R*8 = 0.857 extracted from the lattice and field-theoretical calculations.