Stable Luttinger liquids and emergent U(1) symmetry in constrained quantum chains

We explore the effect of local constraints on one-dimensional bosonic and fermionic ground state phases. Motivated by recent experiments on Rydberg chains, we constrain the occupation of neighboring sites in known phases of matter. Starting from Kitaev's topological superconductor wire, we find that a soft constraint induces a stable gapless Luttinger liquid phase. While Luttinger and Fermi liquids are usually unstable to superconducting proximity effects, the constraint suppresses pair creations, allowing for an emergent $U(1)$ symmetry and gaplessness. We substantiate this intuitive picture using field theoretical and Bethe ansatz methods. In particular, in the hard constraint limit, the model is explicitly $U(1)$-symmetric and integrable. For the corresponding spin-$1/2$ chains related by a Jordan-Wigner transformation, the Luttinger liquid is stabilized by the $\mathbb Z_2$ spin flip symmetry. Longer-range constraints stabilize gapless phases even without $\mathbb Z_2$ symmetry, connecting to the seminal work by Fendley, Sengupta and Sachdev [Physical Review B 69, 075106 (2004)], clarifying how the gapless floating phase observed therein can be vastly extended.