1 / 34

Funded by NSF, Harvard-MIT CUA, AFOSR, DARPA, MURI

Exploration of Topological Phases with Quantum Walks. Takuya Kitagawa Harvard University Mark Rudner Harvard University Erez Berg Harvard University Yutaka Shikano Tokyo Institute of Technology/MIT

marva
Download Presentation

Funded by NSF, Harvard-MIT CUA, AFOSR, DARPA, MURI

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Exploration of Topological Phases with Quantum Walks Takuya Kitagawa Harvard University Mark Rudner Harvard University Erez Berg Harvard University Yutaka Shikano Tokyo Institute of Technology/MIT Eugene Demler Harvard University Thanks to Mikhail Lukin Funded by NSF, Harvard-MIT CUA, AFOSR, DARPA, MURI

  2. Topological states of matter Polyethethylene SSH model Integer and Fractional Quantum Hall effects Quantum Spin Hall effect Exotic properties: quantized conductance (Quantum Hall systems, Quantum Spin Hall Sysytems) fractional charges (Fractional Quantum Hall systems, Polyethethylene) Geometrical character of ground states: Example: TKKN quantization of Hall conductivity for IQHE PRL (1982)

  3. Summary of the talk: Quantum Walks can be used to realize all Topological Insulators in 1D and 2D

  4. Outline • 1. Introduction to quantum walk • What is (discrete time) quantum walk (DTQW)? • Experimental realization of quantum walk • 2. 1D Topological phase with quantum walk • Hamiltonian formulation of DTQW • Topology of DTQW • 3. 2D Topological phase with quantum walk • Quantum Hall system without Landau levels • Quantum spin Hall system

  5. Discrete quantum walks

  6. Definition of 1D discrete Quantum Walk 1D lattice, particle starts at the origin Spin rotation emphasize it’s evolution operator Spin-dependent Translation Analogue of classical random walk. Introduced in quantum information: Q Search, Q computations

  7. arXiv:0911.1876

  8. arXiv:0910.2197v1

  9. Quantum walk in 1D: Topological phase

  10. Discrete quantum walk Spin rotation around y axis emphasize it’s evolution operator Translation One step Evolution operator

  11. Effective Hamiltonian of Quantum Walk Interpret evolution operator of one step as resulting from Hamiltonian. Stroboscopic implementation of Heff Spin-orbit coupling in effective Hamiltonian

  12. From Quantum Walk to Spin-orbit Hamiltonian in 1d k-dependent “Zeeman” field Winding Number Z on the plane defines the topology! Winding number takes integer values, and can not be changed unless the system goes through gapless phase

  13. Symmetries of the effective Hamiltonian Chiral symmetry Particle-Hole symmetry For this DTQW, Time-reversal symmetry For this DTQW,

  14. Classification of Topological insulators in 1D and 2D

  15. Detection of Topological phases:localized states at domain boundaries

  16. Phase boundary of distinct topological phases has bound states! Topologically distinct, so the “gap” has to close near the boundary Bulks are insulators a localized state is expected

  17. Split-step DTQW

  18. Split-step DTQW Phase Diagram

  19. Apply site-dependent spin rotation for Split-step DTQW with site dependent rotations

  20. Split-step DTQW with site dependent rotations: Boundary State

  21. Quantum Hall like states:2D topological phase with non-zero Chern number Quantum Hall system

  22. Chern Number This is the number that characterizes the topology of the Integer Quantum Hall type states brillouin zone chern number, for example counts the number of edge modes Chern number is quantized to integers

  23. 2D triangular lattice, spin 1/2 “One step” consists of three unitary and translation operations in three directions big points

  24. Phase Diagram

  25. Chiral edge mode

  26. Integer Quantum Hall like states with Quantum Walk

  27. 2D Quantum Spin Hall-like system with time-reversal symmetry

  28. Given , time reversal symmetry with is satisfied by the choice of Introducing time reversal symmetry Introduce another index, A, B

  29. Take has zero Chern number, has non-zero Chern number, If to be the DTQW for 2D triangular lattice If the total system is in trivial phase of QSH phase the total system is in non-trivial phase of QSH phase

  30. Quantum Spin Hall states with Quantum Walk

  31. In fact... Classification of Topological insulators in 1D and 2D

  32. Eq(k) k Extension to many-body systems Can one do adiabatic switching of the Hamiltonians implemented stroboscopically? Yes Can one prepare adiabatically topologically nontrivial states starting with trivial states? Yes Topologically trivial Topologically nontrivial Gap has to close

  33. Conclusions Quantum walk can be used to realize all of the classified topological insulators in 1D and 2D. Topology of the phase is observable through the localized states at phase boundaries.

More Related