An Index for Quantum Integrability

Abstract

The existence of higher-spin quantum conserved currents in two dimensions guarantees quantum integrability. We revisit the question of whether classically-conserved local higher-spin currents in two-dimensional sigma models survive quantization. We define an integrability index I(J) for each spin J, with the property that I(J) is a lower bound on the number of quantum conserved currents of spin J. In particular, a positive value for the index establishes the existence of quantum conserved currents. For a general coset model, with or without extra discrete symmetries, we derive an explicit formula for a generating function that encodes the indices for all spins. We apply our techniques to the CPN-1 model, the O(N) model, and the flag sigma model U(N)U(1)N. For the O(N) model, we establish the existence of a spin-6 quantum conserved current, in addition to the well-known spin-4 current. The indices for the CPN-1 model for N>2 are all non-positive, consistent with the fact that these models are not integrable. The indices for the flag sigma model U(N)U(1)N for N>2 are all negative. Thus, it is unlikely that the flag sigma models are integrable.