The Fisher-Hartwig Formula and Generalized Entropies in XY Spin Chain

Toeplitz matrices have applications to different problems of statistical mechanics. Recently they were used for calculation of entanglement entropy in spin chains. We use the Fisher-Hartwig formula to calculate entanglement entropy of large block of spins in the ground state of XY spin chain. We also calculate Renyi entropy and prove that the spectrum of the density matrix of a block of spins is exact geometric sequence [also different eigenvalues are degenerated differently].

[1]  E. Schrödinger Die gegenwärtige Situation in der Quantenmechanik , 2005, Naturwissenschaften.

[2]  Eytan Barouch,et al.  Statistical Mechanics of the X Y Model. II. Spin-Correlation Functions , 1971 .

[3]  J. Latorre,et al.  Universality of entanglement and quantum-computation complexity , 2003, quant-ph/0311017.

[4]  M. Rasetti,et al.  Spin network quantum simulator , 2002, quant-ph/0209016.

[5]  H. Widom Asymptotic behavior of block Toeplitz matrices and determinants. II , 1974 .

[6]  H. Widom Toeplitz Determinants with Singular Generating Functions , 1973 .

[7]  Eytan Barouch,et al.  Thermalization of a Magnetic Impurity in the Isotropic XY Model , 1970 .

[8]  A. Erdélyi,et al.  Higher Transcendental Functions , 1954 .

[9]  Paolo Zanardi,et al.  Ground state entanglement and geometric entropy in the Kitaev model , 2005 .

[10]  A. Erdélyi,et al.  Higher Transcendental Functions , 1954 .

[11]  G. Vidal,et al.  Entanglement in quantum critical phenomena. , 2002, Physical review letters.

[12]  H. Widom On the limit of block Toeplitz determinants , 1975 .

[13]  S Lloyd,et al.  A Potentially Realizable Quantum Computer , 1993, Science.

[14]  Shi-Jian Gu,et al.  Entanglement, quantum phase transition, and scaling in the XXZ chain , 2003 .

[15]  E. B. Saff,et al.  Asymptotics of orthogonal polynomials with respect to an analytic weight with algebraic singularities on the circle , 2006 .

[16]  A. Osterloh,et al.  Scaling of entanglement close to a quantum phase transition , 2002, Nature.

[17]  R.Ionicioiu,et al.  Ground state entanglement and geometric entropy in the Kitaev's model , 2004, quant-ph/0406202.

[18]  Athanassios S. Fokas,et al.  The isomonodromy approach to matric models in 2D quantum gravity , 1992 .

[19]  B. McCoy The connection between statistical mechanics and quantum field theory , 1994, hep-th/9403084.

[20]  Charles H. Bennett,et al.  Concentrating partial entanglement by local operations. , 1995, Physical review. A, Atomic, molecular, and optical physics.

[21]  Hai-Qing Lin,et al.  Entanglement of the Heisenberg chain with the next-nearest-neighbor interaction , 2004, quant-ph/0403026.

[22]  Emptiness formation probability for the anisotropic XY spin chain in a magnetic field , 2003, cond-mat/0307001.

[23]  G. Aeppli,et al.  Entangled quantum state of magnetic dipoles , 2003, Nature.

[24]  V. Roychowdhury,et al.  Entanglement in a valence-bond solid state. , 2004, Physical review letters.

[25]  George E. Andrews,et al.  Special Functions: Partitions , 1999 .

[26]  T. Wu,et al.  Theory of Toeplitz Determinants and the Spin Correlations of the Two-Dimensional Ising Model. III , 1967 .

[27]  Gap probability in the spectrum of random matrices and asymptotics of polynomials orthogonal on an arc of the unit circle , 2004, math/0401258.

[28]  Integrable Fredholm Operators and Dual Isomonodromic Deformations , 1997, solv-int/9706002.

[29]  Asymptotics for Toeplitz determinants on a circular arc , 2004, math/0401256.

[30]  E. Basor,et al.  Asymptotics of Block Toeplitz Determinants and the Classical Dimer Model , 2006, math-ph/0607065.

[31]  Martin B Plenio,et al.  Three-spin interactions in optical lattices and criticality in cluster Hamiltonians. , 2004, Physical review letters.

[32]  S. Bose,et al.  Natural thermal and magnetic entanglement in the 1D Heisenberg model. , 2000, Physical review letters.

[33]  Alexander Its,et al.  A Riemann-Hilbert approach to asymptotic problems arising in the theory of random matrix models, and also in the theory of integrable statistical mechanics , 1997 .

[34]  Paolo Zanardi,et al.  Holonomic quantum computation , 1999 .

[35]  Its,et al.  Temperature correlations of quantum spins. , 1992, Physical review letters.

[36]  Bernd Silbermann,et al.  Analysis of Toeplitz Operators , 1991 .

[37]  J. Cardy,et al.  QUANTUM INVERSE SCATTERING METHOD AND CORRELATION FUNCTIONS , 1995 .

[38]  F. Franchini,et al.  Renyi entropy of the XY spin chain , 2007, 0707.2534.

[39]  J Eisert,et al.  Entropy, entanglement, and area: analytical results for harmonic lattice systems. , 2005, Physical review letters.

[40]  Quantum entanglement and the self-trapping transition in polaronic systems , 2004, quant-ph/0407080.

[41]  J I Cirac,et al.  Diverging entanglement length in gapped quantum spin systems. , 2004, Physical review letters.

[42]  C. D. Levermore,et al.  Singular limits of dispersive waves , 1994 .

[43]  M. Jimbo,et al.  Density matrix of an impenetrable Bose gas and the fifth Painlevé transcendent , 1980 .

[44]  J. Baik,et al.  On the distribution of the length of the longest increasing subsequence of random permutations , 1998, math/9810105.

[45]  Estelle L. Basor Asymptotic formulas for Toeplitz determinants , 1978 .

[46]  Emptiness Formation Probability for the One-Dimensional Isotropic XY Model , 2001, cond-mat/0106062.

[47]  A. Böttcher,et al.  Toeplitz matrices and determinants with Fisher-Hartwig symbols , 1985 .

[48]  Michael E. Fisher,et al.  Toeplitz Determinants: Some Applications, Theorems, and Conjectures , 2007 .

[49]  J. Latorre,et al.  Entanglement entropy in the Lipkin-Meshkov-Glick model (4 pages) , 2004, cond-mat/0409611.

[50]  B. Silbermann,et al.  Toeplitz Determinants with One Fisher–Hartwig Singularity , 1997 .

[51]  Edmund Taylor Whittaker,et al.  A Course of Modern Analysis , 2021 .

[52]  P. Dirac Note on Exchange Phenomena in the Thomas Atom , 1930, Mathematical Proceedings of the Cambridge Philosophical Society.

[53]  Entropy of XY Spin Chain and Block Toeplitz Determinants , 2006, quant-ph/0606178.

[54]  V. Korepin,et al.  Universality of entropy scaling in one dimensional gapless models. , 2003, Physical Review Letters.

[55]  Alfréd Rényi,et al.  Probability Theory , 1970 .

[56]  E. Schrödinger Die gegenwärtige Situation in der Quantenmechanik , 2005, Naturwissenschaften.

[57]  P. Zanardi,et al.  Sublattice entanglement and quantum phase transitions in antiferromagnetic spin chains , 2006 .

[58]  Craig A. Tracy,et al.  Mathematical Physics © Springer-Verlag 1994 Fredholm Determinants, Differential Equations and Matrix Models , 2022 .

[59]  T. Ehrhardt A Status Report on the Asymptotic Behavior of Toeplitz Determinants with Fisher-Hartwig Singularities , 2001 .

[60]  V. S. Kapitonov,et al.  Time-Dependent Correlators of Local Spins of the One-Dimensional XY Heisenberg Chain , 2003 .

[61]  Vladimir E. Korepin,et al.  Differential Equations for Quantum Correlation Functions , 1990 .

[62]  M. Y. Mo,et al.  Entanglement Entropy in Quantum Spin Chains with Finite Range Interaction , 2007, 0708.0161.

[63]  Eytan Barouch,et al.  Statistical Mechanics of the XY Model. III , 1970 .

[64]  P. Zanardi,et al.  Entanglement and Quantum Phase Transition in Low Dimensional Spin Systems , 2004, quant-ph/0407228.

[65]  A. Lenard Some remarks on large Toeplitz determinants , 1972 .

[66]  H. Widom The Strong Szego Limit Theorem for Circular Arcs , 1971 .

[67]  P. Deift,et al.  A steepest descent method for oscillatory Riemann–Hilbert problems. Asymptotics for the MKdV equation , 1992, math/9201261.

[68]  E. Saff,et al.  Szego Orthogonal Polynomials with Respect to an Analytic Weight: Canonical Representation and Strong Asymptotics , 2005, math/0502300.

[69]  M. Nielsen,et al.  Entanglement in a simple quantum phase transition , 2002, quant-ph/0202162.

[70]  Ingo Peschel On the entanglement entropy for an XY spin chain , 2004 .

[71]  C. Tracy,et al.  The Fisher-Hartwig conjecture and generalizations☆ , 1991 .

[72]  B. McCoy,et al.  The Two-Dimensional Ising Model , 1973 .

[73]  V. Korepin,et al.  Entanglement in the XY spin chain , 2004 .

[74]  Stephanos Venakides,et al.  Strong asymptotics of orthogonal polynomials with respect to exponential weights , 1999 .

[75]  G. Szegö Recent Advances and Open Questions on the Asymptotic Expansions of Orthogonal Polynomials , 1959 .

[76]  José Ignacio Latorre,et al.  Ground state entanglement in quantum spin chains , 2004, Quantum Inf. Comput..

[77]  On the Determinant Formulas by Borodin, Okounkov, Baik, Deift and Rains , 2001, math/0101008.

[78]  F. Mezzadri,et al.  Random Matrix Theory and Entanglement in Quantum Spin Chains , 2004, quant-ph/0407047.

[79]  J. Cardy,et al.  Entanglement entropy and quantum field theory , 2004, hep-th/0405152.

[80]  P. Deift,et al.  Asymptotics of Toeplitz, Hankel, and Toeplitz+Hankel determinants with Fisher-Hartwig singularities , 2009, 0905.0443.

[81]  Ira M. Gessel,et al.  Symmetric functions and P-recursiveness , 1990, J. Comb. Theory, Ser. A.

[82]  C. H. Bennett,et al.  Quantum Information and Computation , 1995 .

[83]  E. Lieb,et al.  Two Soluble Models of an Antiferromagnetic Chain , 1961 .