Litcius/Paper detail

Boundary effects on symmetry resolved entanglement

Riccarda Bonsignori, Pasquale Calabrese

2020Journal of Physics A Mathematical and Theoretical61 citationsDOIOpen Access PDF

Abstract

Abstract We study the symmetry resolved entanglement entropies in one-dimensional systems with boundaries. We provide some general results for conformal invariant theories and then move to a semi-infinite chain of free fermions. We consider both an interval starting from the boundary and away from it. We derive exact formulas for the charged and symmetry resolved entropies based on theorems and conjectures about the spectra of Toeplitz+Hankel matrices. En route to characterise the interval away from the boundary, we prove a general relation between the eigenvalues of Toeplitz+Hankel matrices and block Toeplitz ones. An important aspect is that the saddle-point approximation from charged to symmetry resolved entropies introduces algebraic corrections to the scaling that are much more severe than in systems without boundaries.

Topics & Concepts

Quantum entanglementInvariant (physics)Algebraic numberEigenvalues and eigenvectorsScalingPhysicsQuantum mechanicsSymmetry (geometry)Boundary (topology)Toeplitz matrixGlobal symmetryConformal symmetryBoundary value problemMathematicsInterval (graph theory)Mathematical physicsSpectrum (functional analysis)Multipartite entanglementConformal mapSpectral lineTheoretical physicsSymmetry groupTranslational symmetryMirror symmetryQuantum many-body systemsAlgebraic structures and combinatorial modelsQuantum Information and Cryptography