Seeing asymptotic freedom in an exact correlator of a large-N matrix field theory

Abstract

Exact expressions for correlation functions are known for the large-N (planar) limit of the (1+1)-dimensional SU(N)× SU(N) principal chiral sigma model. These were obtained with the form-factor bootstrap, an entirely nonperturbative method. The large-N solution of this asymptotically-free model is far less trivial than that of O(N) sigma model (or other isovector models). Here we study the Euclidean two-point correlation function N-1< Tr\,(0) (x)>, where (x) Z-1/2U(x) is the scaling field and U(x)∈ SU(N) is the bare field. We express the two-point function in terms of the spectrum of the operator -d2/du2, where u∈ (-1,1). At short distances, this expression perfectly matches the result from the perturbative renormalization group.