Quantum Dimension as Entanglement Entropy in 2D CFTs
arXiv:1403.0702 · doi:10.1103/PhysRevD.90.041701
Abstract
We study entanglement entropy of excited states in two dimensional conformal field theories (CFTs). Especially we consider excited states obtained by acting primary operators on a vacuum. We show that under its time evolution, entanglement entropy increases by a finite constant when the causality condition is satisfied. Moreover, in rational CFTs, we prove that this increased amount of (both Renyi and von-Neumann) entanglement entropy always coincides with the log of quantum dimension of the primary operator.
5 pages, 3 eps figures, Revtex