3D loop models and the CPn-1 sigma model

Abstract

Many statistical mechanics problems can be framed in terms of random curves; we consider a class of three-dimensional loop models that are prototypes for such ensembles. The models show transitions between phases with infinite loops and short-loop phases. We map them to CPn-1 sigma models, where n is the loop fugacity. Using Monte Carlo simulations, we find continuous transitions for n=1,2,3, and first order transitions for n≥ 5. The results are relevant to line defects in random media, as well as to Anderson localization and (2+1)-dimensional quantum magnets.