Long Distance Entanglement of Purification and Reflected Entropy in Conformal Field Theory

Quantifying entanglement properties of mixed states in quantum field theory via entanglement of purification is a new and challenging subject. In this work, we study entanglement of purification for two intervals far away from each other in the vacuum of a conformal field theory on a lattice. Our main finding is that the decay of the entanglement of purification is enhanced with respect to the one for the mutual information by a logarithm of the distance between the intervals. We explicitly derive this behaviour in the critical Ising spin chain as well as for free fermions. Furthermore, we corroborate it with a general argument valid for any conformal field theory with a gapped spectrum of operators arising as a continuum description of a lattice model