Condensed Matter Theory

Shell-filling effect in the entanglement entropies of spinful fermions

Physical Review Letters 110:11 (2013)

Authors:

FHL Essler, AM Läuchli, P Calabrese

Abstract:

We consider the von Neumann and Rényi entropies of the one-dimensional quarter-filled Hubbard model. We observe that for periodic boundary conditions the entropies exhibit an unexpected dependence on system size: for L=4 mod 8 the results are in agreement with expectations based on conformal field theory, while for L=0 mod 8 additional contributions arise. We explain this observation in terms of a shell-filling effect and develop a conformal field theory approach to calculate the extra term in the entropies. Similar shell-filling effects in entanglement entropies are expected to be present in higher dimensions and for other multicomponent systems. © 2013 American Physical Society.

Landau Level Mixing in the Perturbative Limit

(2013)

Authors:

Steven H Simon, Edward H Rezayi

Loop models with crossings

(2013)

Authors:

Adam Nahum, P Serna, AM Somoza, M Ortuño

Phase transitions in three-dimensional topological lattice models with surface anyons

(2013)

Authors:

FJ Burnell, CW von Keyserlingk, SH Simon

Reduced Density Matrix after a Quantum Quench

ArXiv 1302.6944 (2013)

Authors:

Maurizio Fagotti, Fabian HL Essler

Abstract:

We consider the reduced density matrix (RDM) \rho_A(t) for a finite subsystem A after a global quantum quench in the infinite transverse-field Ising chain. It has been recently shown that the infinite time limit of \rho_A(t) is described by the RDM \rho_{GGE,A} of a generalized Gibbs ensemble. Here we present some details on how to construct this ensemble in terms of local integrals of motion, and show its equivalence to the expression in terms of mode occupation numbers widely used in the literature. We then address the question, how \rho_A(t) approaches \rho_{GGE,A} as a function of time. To that end we introduce a distance on the space of density matrices and show that it approaches zero as a universal power-law t^{-3/2} in time. As the RDM completely determines all local observables within A, this provides information on the relaxation of correlation functions of local operators. We then address the issue, of how well a truncated generalized Gibbs ensemble with a finite number of local higher conservation laws describes a given subsystem at late times. We find that taking into account only local conservation laws with a range at most comparable to the subsystem size provides a good description. However, excluding even a single one of the most local conservation laws in general completely spoils this agreement.