Measuring Distance in Quantum Many-body Wave Functions

POSTER

Abstract

We study quantum chaos by investigating the growing distance of two slightly different initial states under unitary evolution. The distance $d(t)$ is defined to be that of the reduced density matrices, which undergoes a rapid growth from small initial value to the value of independent random states. A clear exponential growing regime is observed in the Floquet spin model when we turn on the non-local power law decay interactions. The operator spreading picture shows that $d(t)$ captures the same physics as the out-of-time-ordered correlator.

Presenters

  • Tianci Zhou

    • Univ of Illinois - Urbana
    • Department of physics, University of Illinois at Urbana-Champaign
    • Physics, Univ of Illinois - Urbana

Authors

  • Tianci Zhou

    • Univ of Illinois - Urbana
    • Department of physics, University of Illinois at Urbana-Champaign
    • Physics, Univ of Illinois - Urbana

  • Xiao Chen

    • Kavli Institute for Theoretical Physics
    • Kavli Institute of Theoretical Physics
    • University of California, Santa Barbara

  • Cenke Xu

    • Physics, University of California, Santa Barbara
    • University of California, Santa Barbara
    • Univ of California - Santa Barbara
    • UCSB