Litcius/Paper detail

From the XXZ chain to the integrable Rydberg-blockade ladder via non-invertible duality defects

Luisa Eck, Paul Fendley

2024SciPost Physics27 citationsDOIOpen Access PDF

Abstract

Strongly interacting models often possess “dualities” subtler than a one-to-one mapping of energy levels. The maps can be non-invertible, as apparent in the canonical example of Kramers and Wannier. We analyse an algebraic structure common to the XXZ spin chain and three other models: Rydberg-blockade bosons with one particle per square of a ladder, a three-state antiferromagnet, and two Ising chains coupled in a zigzag fashion. The structure yields non-invertible maps between the four models while also guaranteeing all are integrable. We construct these maps explicitly utilising topological defects coming from fusion categories and the lattice version of the orbifold construction, and use them to give explicit conformal-field-theory partition functions describing their critical regions. The Rydberg and Ising ladders also possess interesting non-invertible symmetries, with the spontaneous breaking of one in the former resulting in an unusual ground-state degeneracy.

Topics & Concepts

Integrable systemInvertible matrixDuality (order theory)Chain (unit)MathematicsBlockadePure mathematicsPhysicsMathematical physicsChemistryQuantum mechanicsReceptorBiochemistryNonlinear Waves and SolitonsAlgebraic structures and combinatorial modelsBlack Holes and Theoretical Physics