Analytic and Numerical Bootstrap of CFTs with O(m)× O(n) Global Symmetry in 3D

Abstract

Motivated by applications to critical phenomena and open theoretical questions, we study conformal field theories with O(m)× O(n) global symmetry in d=3 spacetime dimensions. We use both analytic and numerical bootstrap techniques. Using the analytic bootstrap, we calculate anomalous dimensions and OPE coefficients as power series in =4-d and in 1/n, with a method that generalizes to arbitrary global symmetry. Whenever comparison is possible, our results agree with earlier results obtained with diagrammatic methods in the literature. Using the numerical bootstrap, we obtain a wide variety of operator dimension bounds, and we find several islands (isolated allowed regions) in parameter space for O(2)× O(n) theories for various values of n. Some of these islands can be attributed to fixed points predicted by perturbative methods like the and large-n expansions, while others appear to arise due to fixed points that have been claimed to exist in resummations of perturbative beta functions.