Area law in one dimension: Degenerate ground states and Renyi entanglement entropy

An area law is proved for the Renyi entanglement entropy of possibly degenerate ground states in one-dimensional gapped quantum systems. Suppose in a chain of $n$ spins the ground states of a local Hamiltonian with energy gap $\epsilon$ are constant-fold degenerate. Then, the Renyi entanglement entropy $R_\alpha(0<\alpha<1)$ of any ground state across any cut is upper bounded by $\tilde O(\alpha^{-3}/\epsilon)$, and any ground state can be well approximated by a matrix product state of subpolynomial bond dimension $2^{\tilde O(\epsilon^{-1/4}\log^{3/4}n)}$.

[1]  Fernando G. S. L. Brandão,et al.  Exponential Decay of Correlations Implies Area Law , 2012, Communications in Mathematical Physics.

[2]  M. B. Hastings,et al.  Lieb-Schultz-Mattis in higher dimensions , 2004 .

[3]  F. Verstraete,et al.  Matrix product states represent ground states faithfully , 2005, cond-mat/0505140.

[4]  White,et al.  Density matrix formulation for quantum renormalization groups. , 1992, Physical review letters.

[5]  M. Hastings,et al.  An area law for one-dimensional quantum systems , 2007, 0705.2024.

[6]  Umesh Vazirani,et al.  An area law and sub-exponential algorithm for 1D systems , 2013, 1301.1162.

[7]  Sandy Irani,et al.  Ground state entanglement in one-dimensional translationally invariant quantum systems , 2009, 0901.1107.

[8]  White,et al.  Density-matrix algorithms for quantum renormalization groups. , 1993, Physical review. B, Condensed matter.

[9]  Maarten Van den Nest,et al.  Universal quantum computation with little entanglement. , 2012, Physical review letters.

[10]  Zeph Landau,et al.  Connecting global and local energy distributions in quantum spin models on a lattice , 2014, 1406.3898.

[11]  Norbert Schuch,et al.  Entropy scaling and simulability by matrix product states. , 2007, Physical review letters.

[12]  U. Vazirani,et al.  Improved one-dimensional area law for frustration-free systems , 2011, 1111.2970.

[13]  J. Eisert,et al.  Area laws for the entanglement entropy - a review , 2008, 0808.3773.

[14]  Daniel Gottesman,et al.  Entanglement versus gap for one-dimensional spin systems , 2009, 0901.1108.

[15]  A. Winter,et al.  Aspects of Generic Entanglement , 2004, quant-ph/0407049.