Non-local scaling operators with entanglement renormalization

Abstract

The multi-scale entanglement renormalization ansatz (MERA) can be used, in its scale invariant version, to describe the ground state of a lattice system at a quantum critical point. From the scale invariant MERA one can determine the local scaling operators of the model. Here we show that, in the presence of a global symmetry G, it is also possible to determine a class of non-local scaling operators. Each operator consist, for a given group element g∈G, of a semi-infinite string g with a local operator φ attached to its open end. In the case of the quantum Ising model, G= Z2, they correspond to the disorder operator μ, the fermionic operators and , and all their descendants. Together with the local scaling operators identity I, spin σ and energy ε, the fermionic and disorder scaling operators , and μ are the complete list of primary fields of the Ising CFT. Thefore the scale invariant MERA allows us to characterize all the conformal towers of this CFT.