PIRSA:07090002

Simulating unitary dynamical maps on a quantum computer.

APA

Milburn, G. (2007). Simulating unitary dynamical maps on a quantum computer.. Perimeter Institute for Theoretical Physics. https://pirsa.org/07090002

MLA

Milburn, Gerard. Simulating unitary dynamical maps on a quantum computer.. Perimeter Institute for Theoretical Physics, Sep. 12, 2007, https://pirsa.org/07090002

BibTex

          @misc{ scivideos_PIRSA:07090002,
            doi = {10.48660/07090002},
            url = {https://pirsa.org/07090002},
            author = {Milburn, Gerard},
            keywords = {},
            language = {en},
            title = {Simulating unitary dynamical maps on a quantum computer.},
            publisher = {Perimeter Institute for Theoretical Physics},
            year = {2007},
            month = {sep},
            note = {PIRSA:07090002 see, \url{https://scivideos.org/index.php/pirsa/07090002}}
          }
          

Gerard Milburn University of Queensland

Talk numberPIRSA:07090002
Source RepositoryPIRSA
Collection
Talk Type Scientific Series

Abstract

I will discuss an alternative approach to simulating Hamiltonian flows with a quantum computer. A Hamiltonian system is a continuous time dynamical system represented as a flow of points in phase space. An alternative dynamical system, first introduced by Poincare, is defined in terms of an area preserving map. The dynamics is not continuous but discrete and successive dynamical states are labeled by integers rather than a continuous time variable. Discrete unitary maps are naturally adapted to the quantum computing paradigm. Grover's algorithm, for example, is an iterated unitary map. In this talk I will discuss examples of nonlinear dynamical maps which are well adapted to simple ion trap quantum computers, including a transverse field Ising map, a non linear rotor map and a Jahn-Teller map. I will show how a good understanding of the quantum phase transitions and entanglement exhibited in these models can be gained by first describing the classical bifurcation structure of fixed points.