Entropy, gap and a multi-parameter deformation of the Fredkin spin chain

Abstract

We introduce a multi-parameter deformation of the Fredkin spin 1/2 chain whose ground state is a weighted superposition of Dyck paths, depending on a set of parameters ti along the chain. The parameters are introduced in such a way to maintain the system frustration-free while allowing to explore a range of possible phases. In the case where the parameters are uniform, and a color degree of freedom is added we establish a phase diagram with a transition between an area law and a volume low. The volume entropy obtained for half a chain is n s where n is the half-chain length and s is the number of colors. Next, we prove an upper bound on the spectral gap of the t>1, s>1 phase, scaling as =O((4s)nt-n2/2), similar to a recent a result about the deformed Motzkin model, albeit derived in a different way. Finally, using an additional variational argument we prove an exponential lower bound on the gap of the model for t>1, s=1, which provides an example of a system with bounded entanglement entropy and a vanishing spectral gap.