Breeding Grid States From Schrödinger Cat States without Post-Selection
ORAL
Abstract
Grid (or comb) states are an interesting class of bosonic states introduced by Gottesman, Kitaev and Preskill to encode a qubit into an oscillator. A method to generate or `breed' a grid state from Schrödinger cat states using beam splitters and homodyne measurements is known but this method requires post-selection. We show how post-processing of the measurement data can be used to entirely remove the need for post-selection, making the scheme much more viable.
Bounding the asymptotic behavior of the breeding procedure is challenging. We show how a new class of approximate grid states that is invariant under the breeding operation can be used to obtain such bounds.
Finally, we demonstrate the efficacy of the method numerically.
Bounding the asymptotic behavior of the breeding procedure is challenging. We show how a new class of approximate grid states that is invariant under the breeding operation can be used to obtain such bounds.
Finally, we demonstrate the efficacy of the method numerically.
*We acknowledge support through the EU via the ERC GRANT EQEC. This research was supported in part by Perimeter Institute for Theoretical Physics.
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Presenters
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Daniel Weigand
- TU Delft