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David Pekker (U. Pitt) Gil Refael (Caltech) Vadim Oganesyan (CUNY) Ehud Altman (Weizmann)

The Hilbert-glass transition: Figuring out excited states in strongly disordered systems. David Pekker (U. Pitt) Gil Refael (Caltech) Vadim Oganesyan (CUNY) Ehud Altman (Weizmann) Eugene Demler (Harvard). Outline. Quantum criticality in the quantum Ising model. + preview of punchline.

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David Pekker (U. Pitt) Gil Refael (Caltech) Vadim Oganesyan (CUNY) Ehud Altman (Weizmann)

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  1. The Hilbert-glass transition: Figuring out excited states in strongly disordered systems David Pekker (U. Pitt) Gil Refael (Caltech) Vadim Oganesyan (CUNY) Ehud Altman (Weizmann) Eugene Demler (Harvard)

  2. Outline • Quantum criticality in the quantum Ising model + preview of punchline • Disordered Quantum Ising model and real-space RG • Extending to excited states – the RSRG-X method • The Hilbert-glass transition

  3. Standard model of Quantum criticality • Quantum Ising model: z z z z z x

  4. Standard model of Quantum criticality • Quantum Ising model: z z z z z x • Phase diagram Quantum critical regime Ferro- magnet Para- magnet QCP

  5. Disordered Quantum Ising model • Quantum Ising model: z z z z z z z z z z x • Phase diagram: Quantum critical regime Ferro- magnet Para- magnet QCP

  6. Surprise: Transition in all excited states • Quantum Ising model: z z z z z z x Hilbert glass transition • Phase diagram: [All eigenstates doubly degenerate] Or: PM FM QCP

  7. Surprise: Transition in all excited states • Quantum Ising model: z z z z z z x x x x x x • Phase diagram: Hilbert glass transition [All eigenstates doubly degenerate] Or: PM FM QCP

  8. Surprise: Transition in all excited states • Dynamical quantum phase transition. • Temperature tuned, but with no Thermodynamic signatures. • Accessible example for an MBL like transition. Hilbert glass transition • Phase diagram: Hilbert glass phase x-phase Or: PM FM QCP

  9. Disarming disorder: Real space RG [Ma, Dasgupta, Hu (1979), Bhatt, Lee (1979), DS Fisher (1995)] • Isolate the strongest bond (or field) in the chain. • Choose ground-state manifold. • neighboring fields: quantum fluctuations. Domain-wall excitations 1 2 1 2 Cluster ground state:

  10. Disarming disorder: Real space RG [Ma, Dasgupta, Hu (1979), Bhatt, Lee (1979), DS Fisher (1995)] • Isolate the strongest bond (or field) in the chain. • Choose ground-state manifold. • neighboring fields: quantum fluctuations. Anti-aligned: X 2 3 2 1 3 1 Field aligned:

  11. RG sketch • Ferromagnetic phase: X • Paramagnetic phase: X X X X

  12. Universal coupling distributions and RG flow • Initially, h and J have some coupling distributions:

  13. Universal coupling distributions and RG flow • As renormalization proceeds, universal distributions emerge: flow with RG • These functions are attractors for all initial distributions. Ferro- magnet Para- magnet RG-flow • gh and gJflow: QCP

  14. What about excited states? Pekker, GR, VO, Altman, Demler; Huse, Nandkishore, VO, Sondhi, Pal (2013) • Put domain walls in strongest bonds: • neighboring fields: quantum fluctuations. Domain-wall excitations 1 2 1 2 Cluster ground state: No effect on coupling magnitude!

  15. What about excited states? Pekker, GR, VO, Altman, Demler; Huse, Nandkishore, VO, Sondhi, Pal (2013) • Make spins antialigned with strong fields: Anti-aligned: X 2 2 3 1 Field aligned: 3 1 • No effect on coupling magnitude!

  16. RSRG-X Tree of states • At each RG step, choose ground state or excitation: [six sites with large disorder]

  17. RG sketch • Hilbert-glass phase: X • Paramagnetic phase: X X X X

  18. Excited state flow • Universal distribution functions independent of choice: flow with RG • Transition persists: Random-domain clusters Hilbert-glass X-phase RG-flow HGT

  19. Order in the Hilbert glass vs. T=0 Ferromagnet • Symmetry-broken T=0 Ferromagnetic state: or Order parameter: • Typical Hilbert-Glass excited state: Order parameter: • Temporal correlations:

  20. Order in the Hilbert glass vs. T=0 Ferromagnet Hilbert Glass transition HGT PM FM QCP QCP

  21. T-tuned Hilbert glass transition: hJJ’ model • Quantum Ising model+J’: z z z z 1 2 3 4 5 x x x x • J’>0increases h for low-energy states. Hilbert glass X-states • T (or energy-density) tuned transition • But: No thermodynamic signatures

  22. RSRG-X Tree of states Color code: inverse T Energy RG step • Sampling method: Branch changing Monte Carlo steps.

  23. RSRG-X results for the Hilbert glass transition Flows for different temperatures: Complete phase diagram:

  24. Thermal conductivity • No thermodynamic signatures – only dynamical signatures exist. • Only energy is conserved: Signatures in heat conductivity? Engineering Dimension: • assume scaling form:

  25. Numerical tests

  26. Summary + odds and ends • New universality: -T-tuned dynamical quantum transition. • - No thermodynamic signatures. • Developed the RSRG-X • - access to excitations and thermal averaging of L~5000 chains. • Excited states entanglement entropy: - ‘area law’ in both phases - log(L) at the Hilbert glass transition (Follows from GR, Moore, 2004) • Other Hilbert glass like transitions?

  27. Edwards-Anderson order parameter

  28. Lifshitz localization – a subtle example Pure chain: Random J: • Tight-binding electrons on an irregular lattice. • Density of states: Dyson singularity

  29. Method of attack: Real space RG Ma, Dasgupta, Hu (1979), Bhatt, Lee (1979) • Reduced the largest bond • Eliminated two sites. • New Heisenberg chain resulting with new suppressed effective coupling. J 2 4 3 1

  30. J Universality of emerging distribution functions D.S. Fisher (1994) 5 6 7 8 2 3 4 1 • Functional flow and universal coupling distributions:

  31. Universality of emerging distribution functions D.S. Fisher (1994) 5 6 7 8 2 3 4 1 • Functional flow and universal coupling distributions: 0

  32. Random singlet phase D.S. Fisher (1995) 5 6 7 8 2 3 4 1 • Low lying excitations: excited long-range singlets: • Susceptibility: Dyson singularity again!

  33. Engtanglement entropy in the Heisenberg model number of singlets entering region A. A B B (QFT Central charge, c=1) L How many qubitsin A determined by B • Pure chain: Holzhey, Larsen, Wilczek (1994). Vidal, Latorre, Rico, Kitaev (2002). • Random singlet phase: Every singlet connecting A to B → entanglement entropy 1.

  34. Engtanglement entropy in the Heisenberg model Effective central charge A B B (CFT Central charge, c=1) L How many qubitsin A determined by B • Pure chain: Holzhey, Larsen, Wilczek (1994). Vidal, Latorre, Rico, Kitaev (2002). • Random singlet phase: GR, Moore (2004). For the experts:Does the effective c obey a c-theorem? No… Examples of enropy increasingtransitions in random non-abelian anyon chains. Fidkowski, GR, Bonesteel, Moore (2008).

  35. Universality at the transition? MG BG RSG Insulator superfluid 1 Altman, Kafri, Polkovnikov, GR (2009) g=1 Mechanical analogy Average effectivespring constant = 0 when g=1. Stiffness ~ (ave of inverse J)

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