Quantum search by the nonlinear Schrodinger equation with a generalized cubic-quintic nonlinearity
POSTER
Abstract
Continuous-time quantum walks, a quantum analog to the continuous-time
Markov chain, allow the efficient solution to some spatial search problems. At
low temperatures and a high number of atoms, two- and three-body interac-
tions cause Bose-Einstein condensates to evolve according to an effective, non-
linear Schr ¨odinger equation. These effective nonlinearities can be exploited to
solve a search problem faster than the linear case. This speedup comes at the
cost of increased precision needed in the timing of the search, as well as a lower
bound on the number of bosonic walkers necessary to observe this speedup.
We will present our work analyzing the computational speedups afforded by
continuous-time quantum walks with effective nonlinearities for search prob-
lems with multiple correct answers.
Markov chain, allow the efficient solution to some spatial search problems. At
low temperatures and a high number of atoms, two- and three-body interac-
tions cause Bose-Einstein condensates to evolve according to an effective, non-
linear Schr ¨odinger equation. These effective nonlinearities can be exploited to
solve a search problem faster than the linear case. This speedup comes at the
cost of increased precision needed in the timing of the search, as well as a lower
bound on the number of bosonic walkers necessary to observe this speedup.
We will present our work analyzing the computational speedups afforded by
continuous-time quantum walks with effective nonlinearities for search prob-
lems with multiple correct answers.
Presenters
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Benjamin D DalFavero
Creighton University
Authors
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Benjamin D DalFavero
Creighton University
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Alexander Meill
Department of Mathematics, Univeristy of California, San Diego
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David Meyer
Department of Mathematics, University of California, San Diego
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Thomas Wong
Creighton University
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Jonathan P Wrubel
Creighton University