|Title||Hilbert-Space Fragmentation from Strict Confinement|
|Publication Type||Journal Article|
|Year of Publication||2020|
|Authors||Z-C. Yang, F. Liu, A. V. Gorshkov, and T. Iadecola|
|Journal||Physical Review Letters|
We study one-dimensional spin-1/2 models in which strict confinement of Ising domain walls leads to the fragmentation of Hilbert space into exponentially many disconnected subspaces. Whereas most previous works emphasize dipole moment conservation as an essential ingredient for such fragmentation, we instead require two commuting U(1) conserved quantities associated with the total domain-wall number and the total magnetization. The latter arises naturally from the confinement of domain walls. Remarkably, while some connected components of the Hilbert space thermalize, others are integrable by Bethe ansatz. We further demonstrate how this Hilbert-space fragmentation pattern arises perturbatively in the confining limit of Z2 gauge theory coupled to fermionic matter, leading to a hierarchy of timescales for motion of the fermions. This model can be realized experimentally in two complementary settings.
Submitted by Chris Flower on Fri, 05/22/2020 - 13:09