Bi- and tetracritical phase diagrams in three dimensions

TL;DR

This paper investigates the complex phase diagrams involving two competing order parameters in three-dimensional systems, analyzing the critical behavior near bicritical and tetracritical points using renormalization-group methods.

Contribution

It provides detailed renormalization-group flow trajectories and crossover exponents for multicritical points with two competing order parameters in three dimensions.

Findings

Identification of universality classes at multicritical points

Renormalization-group flow trajectories near criticality

Effective crossover exponents for phase transitions

Abstract

The critical behavior of many physical systems involves two competing $n^{}_1-$ and $n^{}_2-$component order-parameters, ${\bf S}^{}_1$ and ${\bf S}^{}_2$, respectively, with $n=n^{}_1+n^{}_2$. Varying an external control parameter $g$, %(e.g. uniaxial stress or magnetic field), one encounters ordering of ${\bf S}^{}_1$ below a critical (second-order) line for $g<0$ and of ${\bf S}^{}_2$ below another critical line for $g>0$. These two ordered phases are separated by a first-order line, which meets the above critical lines at a bicritical point, or by an intermediate (mixed) phase, bounded by two critical lines, which meet the above critical lines at a tetracritical point. For $n=1+2=3$, the critical behavior around the (bi- or tetra-) multicritical point either belongs to the universality class of a non-rotationally invariant (cubic or biconical) fixed point, or it has a fluctuation driven first-order transition. These asymptotic behaviors arise only very close to the transitions. We present accurate renormalization-group flow trajectories yielding the effective crossover exponents near multicriticality.