Affiliation:
1. Kavli Institute for the Physics and Mathematics of the Universe
2. University of Tokyo
3. University of California, San Diego
Abstract
We identify constraints in the energy spectra of quantum theories that have a global O(N)O(N) symmetry, where NN is treated as a continuous parameter. We point out that a class of evanescent states fall out of the spectrum at integer values of NN in pairs, via an annihilation mechanism. This forces the energies of the states in such a pair to approach equality as NN approaches a certain integer, with both states disappearing at precisely integer NN and the point of would-be degeneracy. These constraints occur between different irreducible representations of the analytic continuation of O(N)O(N) and hold non-perturbatively. We give examples in the spectra of the critical O(N)O(N) model.
Funder
Japan Society for the Promotion of Science
United States Department of Energy
University of Tokyo