Six-loop renormalization group analysis of the φ4 + φ6 model

Abstract

We investigate the λ4+g6 model using the renormalization group method and the expansion. This model is used in a situation where the coefficients λ, g and the coefficient τ of the term τ 2 depend on two parameters T and P, and there is a point (Tc,Pc) at which τ and λ are zero. This point is named the tricritical point. The description of a system depends on a trajectory that leads to the tricritical point on the plane (T,P). In the trajectories, when λ goes to zero fast enough, the description is defined by the 6 interaction and then the 4 term can be considered as a composite operator. In this case, the logarithmic dimension is d=3, and the expansion is carried out in the dimension d=3-2. The main exponents of the tricritical model have been calculated in the third order of the expansion. Taking into account the 4 interaction, we were able to calculate the value of the parameter that determines the required decrease rate in λ to implement the tricritical behavior. The tricritical dimensions of the composite operators k for k=1, 2, 4, 6 have been computed. The resulting values are compared to those known from a conformal field theory and non-perturbative renormalization group.