Entanglement and Area

Imperial College London Cambridge, 25th August 2004 Entanglement and Area On work with K. Audenaert, M. Cramer, J. Dreißig, J. Eisert, R.F. Werner Martin Plenio Imperial College London Sponsored by: Royal Society Senior Research Fellowship QUPRODIS

Imperial College London Cambridge, 25th August 2004 The three basic questions of a theory of entanglement Provide efficient methods to • decide which states are entangled and which are disentangled(Characterize) • decide which LOCC entanglement manipulations are possible and provide the protocols to implement them(Manipulate) • decide how much entanglement is in a state and how efficient entanglement manipulations can be(Quantify) Mathematical characterization of all multi-party states

Imperial College London Cambridge, 25th August 2004 Consider natural states of interacting quantum systems instead.

Imperial College London Cambridge, 25th August 2004 Entanglement in Quantum Many-Body Systems • Entanglement in infinite interacting harmonic systems • Static Properties: Entanglement and Area • Dynamics of entanglement and long-range entanglement K. Audenaert, J. Eisert, M.B. Plenio and R.F. Werner, Phys. Rev. A 66, 042327 (2002) M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142 M. Cramer, J. Dreissig, J. Eisert and M.B. Plenio, in preparation J. Eisert, M.B. Plenio and J. Hartley, quant-ph/0311113, to appear in Phys. Rev. Lett. (2004) M.B. Plenio, J. Hartley and J. Eisert, New J. Physics. 6, 36 (2004) F. Semião and M.B. Plenio, quant-ph/0407034 • Entanglement in infinite interacting spin systems • Entanglement and phase transitions J.K. Pachos and M.B. Plenio, Phys. Rev. Lett. 93, 056402 (2004) A. Key, D.K.K. Lee, J.K. Pachos, M.B. Plenio, M. E. Reuter, and E. Rico, quant-ph/0407121

Imperial College London Cambridge, 25th August 2004 Entanglement and Area • Entanglement in infinite interacting harmonic systems • Static Properties: Entanglement and Area • Dynamics of entanglement and long-range entanglement K. Audenaert, J. Eisert, M.B. Plenio and R.F. Werner, Phys. Rev. A 66, 042327 (2002) M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142 M. Cramer, J. Dreissig, J. Eisert and M.B. Plenio, in preparation J. Eisert, M.B. Plenio and J. Hartley, quant-ph/0311113, to appear in Phys. Rev. Lett. (2004) M.B. Plenio, J. Hartley and J. Eisert, New J. Physics. 6, 36 (2004) F. Semião and M.B. Plenio, quant-ph/0407034 • Entanglement in infinite interacting spin systems • Entanglement and phase transitions J.K. Pachos and M.B. Plenio, Phys. Rev. Lett. 93, 056402 (2004) A. Key, D.K.K. Lee, J.K. Pachos, M.B. Plenio, M. E. Reuter, and E. Rico, quant-ph/0407121

Imperial College London Cambridge, 25th August 2004 Entanglement properties of the harmonic chain Arrange n harmonic oscillators on a ring and let them interact harmonically by springs. . . . n - 1 n . . . 1 2 . . . K. Audenaert, J. Eisert, M.B. Plenio and R.F. Werner, Phys. Rev. A 66, 042327 (2002)

Imperial College London Cambridge, 25th August 2004 Entanglement properties of the harmonic chain Arrange n harmonic oscillators on a ring and let them interact harmonically by springs. . . . n - 1 n . . . 1 2 . . . } V K. Audenaert, J. Eisert, M.B. Plenio and R.F. Werner, Phys. Rev. A 66, 042327 (2002)

Imperial College London Cambridge, 25th August 2004 Basic Techniques • Characteristic function

Imperial College London Cambridge, 25th August 2004 Basic Techniques • Characteristic function • A state is called Gaussian, if and only if its characteristic function (or its Wigner function) is a Gaussian

Imperial College London Cambridge, 25th August 2004 Basic Techniques • Characteristic function • A state is called Gaussian, if and only if its characteristic function (or its Wigner function) is a Gaussian • Ground states of Hamiltonians quadratic in X and P are Gaussian

Imperial College London Cambridge, 25th August 2004 Basic Techniques • Characteristic function • A Gaussian with vanishing firstmoments • Ground states of Hamiltonians quadratic in X and P are Gaussian

Imperial College London Cambridge, 25th August 2004 Entanglement Measures Entropy of Entanglement: with Logarithmic Negativity:

Imperial College London Cambridge, 25th August 2004 Ground State Entanglement in the Harmonic Chain . . . n/2 + 2 n - 1 n n/2 + 1 n/2 1 n/2 - 1 2 . . .

Imperial College London Cambridge, 25th August 2004 Ground State Entanglement in the Harmonic Chain Even versus odd oscillators.

Imperial College London Cambridge, 25th August 2004 Ground State Entanglement in the Harmonic Chain Even versus odd oscillators. Entanglement proportionalto number of contact points.

Imperial College London Cambridge, 25th August 2004 D-dimensional lattices: Entanglement and Area Entanglement per unit length of boundary red square and environment versus length of side of inner square on a 30x30 lattice of oscillators.

Imperial College London Cambridge, 25th August 2004 D-dimensional lattices: Entanglement and Area Can prove: • Upper and lower bound on entropy of entanglement that are proportional to the number of oscillators on the surface • For ground state for general interactions • For thermal states for ‘squared interaction’ • General shape of the regions • Classical harmonic oscillators in thermal state: • Valence bond-solids obey entanglement area law M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Why should this be true: An Intuition Can prove this exactly: Intuition from squared interaction.

Imperial College London Cambridge, 25th August 2004 Why should this be true: An Intuition Obtain a simple normal form Decouple oscillators except on surface M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Why should this be true: An Intuition Obtain a simple normal form Disentangle oscillators except on surface Disentangle ViaGLOCC M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Why should this be true: An Intuition Can prove this exactly: Intuition from amended interaction. V= M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Why should this be true: An Intuition Can prove this exactly: Intuition from amended interaction. … V= … M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Why should this be true: An Intuition # of independent columns in B proportional to # of oscillators on the surface of A. A B … B C V = t … M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Why should this be true: An Intuition # of independent columns in B proportional to # of oscillators on the surface of A. Entropy of entanglement from by eigenvalues of which has at most # nonzero eigenvalues A B … B C V = t … M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Why should this be true: An Intuition # of independent columns in B proportional to # of oscillators on the surface of A. Entropy of entanglement from by eigenvalues of which has at most # nonzero eigenvalues A B … Only need to bound eigenvalues B C V = t … M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Disentangling also works for thermal states! Disentangle ViaGLOCC Now decoupled oscillators are in mixed state, but they are NOT entangled to any other oscillator (only to environment). Then make eigenvalue estimates to find bounds on entanglement. M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 D-dimensional lattices: Entanglement and Area Can prove: • Upper and lower bound on entropy of entanglement that are proportional to the number of oscillators on the surface • For ground state for general interactions • For thermal states for ‘squared interaction’ • General shape of the regions a • Classical harmonic oscillators in thermal state: • Valence bond-solids obey entanglement area law M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 D-dimensional lattices: Entanglement and Area For general interaction: Entanglement decreases exponentially with distance, contribution bounded Disentangle ViaGLOCC M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004

Imperial College London Cambridge, 25th August 2004 k = (3,2) s(k,l) =

Imperial College London Cambridge, 25th August 2004 k = (3,2) l = (5,6) s(k,l) = (5-3) + (6-2)

Imperial College London Cambridge, 25th August 2004 The upper bound: Outline M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 The upper bound: Outline Number of oscillators with distance r from surface is proportional to surface  Area theorem Summation gives finite result because M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 D-dimensional lattices: Entanglement and Area Can prove: • Upper and lower bound on entropy of entanglement that are proportional to the number of oscillators on the surface • For ground state for general interactions • For thermal states for ‘squared interaction’ • General shape of the regions a a a • Classical harmonic oscillators in thermal state: • Valence bond-solids obey entanglement area law M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Correlations and Area in Classical Systems g denotes phase space point M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Correlations and Area in Classical Systems g denotes phase space point Entropy depends on fine-graining in phase space but mutual information is independent of fine-graining M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Correlations and Area in Classical Systems Nearest neighbour interaction • Expression equivalent to quantum system with ‘squared interaction’ • Get correlation-area connection for free • Connection between correlation and area is independent of quantum mechanics and relativity M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 D-dimensional lattices: Entanglement and Area Can prove: • Upper and lower bound on entropy of entanglement that are proportional to the number of oscillators on the surface • For ground state for general interactions • For thermal states for ‘squared interaction’ • General shape of the regions a a a • Classical harmonic oscillators in thermal state: Classical correlations are bounded from above and below by expressions proportional to number of oscillators on surface. • Proof via quantum systems with ‘squared interactions’ a • Valence bond-solids obey entanglement area law M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Imperial College London Cambridge, 25th August 2004 Valence bond states

Imperial College London Cambridge, 25th August 2004 D-dimensional lattices: Entanglement and Area Can prove: • Upper and lower bound on entropy of entanglement that are proportional to the number of oscillators on the surface • For ground state for general interactions • For thermal states for ‘squared interaction’ • General shape of the regions a a a • Classical harmonic oscillators in thermal state: Classical correlations are bounded from above and below by expressions proportional to number of oscillators on surface. • Proof via quantum systems with ‘squared interactions’ a a • Valence bond-solids obey entanglement area law M.B. Plenio, J. Eisert, J. Dreißig and M. Cramer, quant-ph/0405142

Entanglement and Area