Stability Analysis of a Non-Unitary CFT

Abstract

We study instability of the lowest dimension operator ( i.e., the imaginary part of its operator dimension) in the rank-Q traceless symmetric representation of the O(N) Wilson-Fisher fixed point in D=4+ε. We find a new semi-classical bounce solution, which gives an imaginary part to the operator dimension of order O(ε-1/2[-N+83εF(ε Q)]) in the double-scaling limit where ε Q ≤ N+863 is fixed. The form of F(ε Q), normalised as F(0)=1, is also computed. This non-perturbative correction continues to give the leading effect even when Q is finite, indicating the instability of operators for any values of Q. We also observe a phase transition at ε Q=N+863 associated with the condensation of bounces, similar to the Gross-Witten-Wadia transition.