Three-dimensional tricritical spins and polymers

Abstract

We consider two intimately related statistical mechanical problems on Z3: (i) the tricritical behaviour of a model of classical unbounded n-component continuous spins with a triple-well single-spin potential (the ||6 model), and (ii) a random walk model of linear polymers with a three-body repulsion and two-body attraction at the tricritical theta point (critical point for the collapse transition) where repulsion and attraction effectively cancel. The polymer model is exactly equivalent to a supersymmetric spin model which corresponds to the n=0 version of the ||6 model. For the spin and polymer models, we identify the tricritical point, and prove that the tricritical two-point function has Gaussian long-distance decay, namely |x|-1. The proof is based on an extension of a rigorous renormalisation group method that has been applied previously to analyse the ||4 and weakly self-avoiding walk models on Z4.