Tunable quantum chaos in the Sachdev-Ye-Kitaev model coupled to a thermal bath

A bstractThe Sachdev-Ye-Kitaev (SYK) model describes Majorana fermions with random interaction, which displays many interesting properties such as non-Fermi liquid behavior, quantum chaos, emergent conformal symmetry and holographic duality. Here we consider a SYK model or a chain of SYK models with N Majorana fermion modes coupled to another SYK model with N2 Majorana fermion modes, in which the latter has many more degrees of freedom and plays the role as a thermal bath. For a single SYK model coupled to the thermal bath, we show that although the Lyapunov exponent is still proportional to temperature, it monotonically decreases from 2π/β (β = 1/(kBT), T is temperature) to zero as the coupling strength to the thermal bath increases. For a chain of SYK models, when they are uniformly coupled to the thermal bath, we show that the butterfly velocity displays a crossover from a T$$ \sqrt{T} $$-dependence at relatively high temperature to a linear T-dependence at low temperature, with the crossover temperature also controlled by the coupling strength to the thermal bath. If only the end of the SYK chain is coupled to the thermal bath, the model can introduce a spatial dependence of both the Lyapunov exponent and the butterfly velocity. Our models provide canonical examples for the study of thermalization within chaotic models.

[1]  Tian-Jun Li,et al.  Supersymmetric SYK model and random matrix theory , 2017, 1702.01738.

[2]  T. Mertens,et al.  Solving the Schwarzian via the conformal bootstrap , 2017, 1705.08408.

[3]  Tokiro Numasawa,et al.  Out-of-time-ordered correlators and purity in rational conformal field theories , 2016 .

[4]  D. Gross,et al.  The bulk dual of SYK: cubic couplings , 2017, 1702.08016.

[5]  E. Witten An SYK-like model without disorder , 2016, Journal of Physics A: Mathematical and Theoretical.

[6]  Yan Liu,et al.  Spatially modulated instabilities of holographic gauge-gravitational anomaly , 2016, 1612.00470.

[7]  J. Maldacena,et al.  Conformal symmetry and its breaking in two dimensional Nearly Anti-de-Sitter space , 2016, 1606.01857.

[8]  S. Shenker,et al.  Stringy effects in scrambling , 2014, 1412.6087.

[9]  Daniel A. Roberts,et al.  Diagnosing Chaos Using Four-Point Functions in Two-Dimensional Conformal Field Theory. , 2015, Physical review letters.

[10]  Daniel A. Roberts,et al.  Chaos in quantum channels , 2015, 1511.04021.

[11]  D. Huse,et al.  Out‐of‐time‐order correlations in many‐body localized and thermal phases , 2016, 1610.00220.

[12]  Junggi Yoon,et al.  Bi-local holography in the SYK model , 2016, 1603.06246.

[13]  S. Sachdev,et al.  Thermal diffusivity and chaos in metals without quasiparticles , 2017, 1705.07896.

[14]  Mike Blake Universal diffusion in incoherent black holes , 2016, 1604.01754.

[15]  C. Peng,et al.  A supersymmetric SYK-like tensor model , 2016, Journal of High Energy Physics.

[16]  D. Stamper-Kurn,et al.  Interferometric Approach to Probing Fast Scrambling , 2016, 1607.01801.

[17]  A. Kamenev,et al.  Sachdev–Ye–Kitaev model as Liouville quantum mechanics , 2016, 1607.00694.

[18]  Yichen Huang,et al.  Out‐of‐time‐ordered correlators in many‐body localized systems , 2016, 1608.01091.

[19]  S. Wadia,et al.  Coadjoint orbit action of Virasoro group and two-dimensional quantum gravity dual to SYK/tensor models , 2017, Journal of High Energy Physics.

[20]  R. Gurau The complete 1/N expansion of a SYK–like tensor model , 2016, 1611.04032.

[21]  M. L. Wall,et al.  Measuring out-of-time-order correlations and multiple quantum spectra in a trapped-ion quantum magnet , 2016, Nature Physics.

[22]  A. Georges,et al.  Thermoelectric transport in disordered metals without quasiparticles: The Sachdev-Ye-Kitaev models and holography , 2016, 1612.00849.

[23]  M. Nowak,et al.  Disorder in the Sachdev–Ye–Kitaev model , 2016, 1612.05233.

[24]  S. Sachdev,et al.  Numerical study of fermion and boson models with infinite-range random interactions , 2016, 1603.05246.

[25]  J. Verbaarschot,et al.  Analytical spectral density of the Sachdev-Ye-Kitaev model at finite N , 2017, 1701.06593.

[26]  Jordan S. Cotler,et al.  Black holes and random matrices , 2016, 1611.04650.

[27]  P. Narayan,et al.  SYK-like tensor models on the lattice , 2017, 1705.01554.

[28]  S. Hartnoll,et al.  Holographic Quantum Matter , 2016, 1612.07324.

[29]  H. Yao,et al.  Solvable SYK models in higher dimensions: a new type of many-body localization transition , 2017 .

[30]  A Note on Sachdev-Ye-Kitaev Like Model without Random Coupling , 2016, 1611.10290.

[31]  J. Maldacena,et al.  Supersymmetric Sachdev-Ye-Kitaev models , 2017 .

[32]  I. A. Monroy,et al.  Search for excited Bc+ states , 2017, 1712.04094.

[33]  D. Gross,et al.  A generalization of Sachdev-Ye-Kitaev , 2016, 1610.01569.

[34]  C. Krishnan,et al.  Quantum chaos and holographic tensor models , 2016, Journal of High Energy Physics.

[35]  Zhong-Yi Lu,et al.  Characterizing Many-Body Localization by Out-of-Time-Ordered Correlation , 2016, 1608.03586.

[36]  Zhenbin Yang,et al.  Diving into traversable wormholes , 2017, 1704.05333.

[37]  T. Sagawa,et al.  Scrambling of quantum information in quantum many-body systems , 2017, 1704.04850.

[38]  A. Kamenev,et al.  Power-law out of time order correlation functions in the SYK model , 2017, 1702.08902.

[39]  X. Qi,et al.  Energy diffusion and the butterfly effect in inhomogeneous Sachdev-Ye-Kitaev chains , 2017, 1702.08462.

[40]  Huitao Shen,et al.  Out-of-Time-Order Correlation at a Quantum Phase Transition , 2016, 1608.02438.

[41]  S. Shenker,et al.  Black holes and the butterfly effect , 2013, Journal of High Energy Physics.

[42]  J. Polchinski,et al.  Four-point function in the IOP matrix model , 2016, 1602.06422.

[43]  Hong Yao,et al.  Solvable Sachdev-Ye-Kitaev Models in Higher Dimensions: From Diffusion to Many-Body Localization. , 2017, Physical review letters.

[44]  Sumit R. Das,et al.  Three dimensional view of the SYK/AdS duality , 2017, 1704.07208.

[45]  J. Polchinski,et al.  The spectrum in the Sachdev-Ye-Kitaev model , 2016, 1601.06768.

[46]  Yu Chen Universal Logarithmic Scrambling in Many Body Localization , 2016, 1608.02765.

[47]  A. Jevicki,et al.  Bi-local holography in the SYK model: perturbations , 2016, 1608.07567.

[48]  P. Hayden,et al.  Measuring the scrambling of quantum information , 2016, 1602.06271.

[49]  Mike Blake,et al.  Universal Charge Diffusion and the Butterfly Effect in Holographic Theories. , 2016, Physical review letters.

[50]  Chao-Ming Jian,et al.  Model for continuous thermal metal to insulator transition , 2017, 1703.07793.

[51]  R. Moessner,et al.  Out-of-Time-Ordered Density Correlators in Luttinger Liquids. , 2016, Physical review letters.

[52]  L. Ioffe,et al.  Microscopic model of quantum butterfly effect: out-of-time-order correlators and traveling combustion waves , 2016, 1609.01251.

[53]  E. Kiritsis,et al.  Higher derivative corrections to incoherent metallic transport in holography , 2016, 1612.05500.

[54]  C. Peng Vector models and generalized SYK models , 2017, 1704.04223.

[55]  L. Lionni,et al.  Diagrammatics of a colored SYK model and of an SYK-like tensor model, leading and next-to-leading orders , 2017, 1702.06944.

[56]  K. Jensen Chaos in AdS_{2} Holography. , 2016, Physical review letters.

[57]  S. Shenker,et al.  Multiple shocks , 2013, 1312.3296.

[58]  E. Altman,et al.  Solvable model for a dynamical quantum phase transition from fast to slow scrambling , 2016, 1610.04619.

[59]  G. Turiaci,et al.  Towards a 2d QFT analog of the SYK model , 2017, 1701.00528.

[60]  C. Krishnan,et al.  Random matrices and holographic tensor models , 2017, Journal of High Energy Physics.

[61]  B. Swingle,et al.  Slow scrambling in disordered quantum systems , 2016, 1608.03280.

[62]  Mike Blake,et al.  Diffusion and chaos from near AdS2 horizons , 2016, 1611.09380.

[63]  J. Maldacena,et al.  Remarks on the Sachdev-Ye-Kitaev model , 2016, 1604.07818.

[64]  X. Qi,et al.  Local criticality, diffusion and chaos in generalized Sachdev-Ye-Kitaev models , 2016, 1609.07832.

[65]  S. Sachdev,et al.  Quantum chaos on a critical Fermi surface , 2016, Proceedings of the National Academy of Sciences.

[66]  Hui Zhai,et al.  Out-of-time-order correlation for many-body localization. , 2016, Science bulletin.

[67]  Javier M. Magán De Finetti theorems and entanglement in large-N theories and gravity , 2017, 1705.03048.

[68]  R. Gurau Quenched equals annealed at leading order in the colored SYK model , 2017, 1702.04228.

[69]  D. Khveshchenko Thickening and sickening the SYK model , 2017, SciPost Physics.

[70]  Kelly Ann Pawlak,et al.  Instability of the non-Fermi liquid state of the Sachdev-Ye-Kitaev Model , 2017, 1701.07081.

[71]  Hui Zhai,et al.  Competition between Chaotic and Nonchaotic Phases in a Quadratically Coupled Sachdev-Ye-Kitaev Model. , 2017, Physical review letters.

[72]  X. Qi,et al.  Fractional statistics and the butterfly effect , 2016, 1602.06543.

[73]  S. Hartnoll,et al.  Theory of universal incoherent metallic transport , 2014, Nature Physics.

[74]  J. Verbaarschot,et al.  Spectral and thermodynamic properties of the Sachdev-Ye-Kitaev model , 2016, 1610.03816.

[75]  P. Narayan,et al.  Higher dimensional generalizations of the SYK model , 2016, Journal of High Energy Physics.

[76]  L. Balents,et al.  Strongly Correlated Metal Built from Sachdev-Ye-Kitaev Models. , 2017, Physical review letters.

[77]  Keiju Murata,et al.  Out-of-time-order correlators in quantum mechanics , 2017, 1703.09435.

[78]  I. Klebanov,et al.  Uncolored random tensors, melon diagrams, and the Sachdev-Ye-Kitaev models , 2016, 1611.08915.

[79]  Ye,et al.  Gapless spin-fluid ground state in a random quantum Heisenberg magnet. , 1992, Physical review letters.

[80]  B. Zeng,et al.  Measuring out-of-time-order correlators on a nuclear magnetic resonance quantum simulator , 2016, 1609.01246.

[81]  Jordan S. Cotler,et al.  Out-of-time-order operators and the butterfly effect , 2017, Annals of Physics.

[82]  S. Forste,et al.  Nearly AdS 2 sugra and the super-Schwarzian , 2017, 1703.10969.

[83]  J. Maldacena,et al.  A bound on chaos , 2015, Journal of High Energy Physics.