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Main Authors: Tsurumaru, Toyohiro, Ichikawa, Tsubasa, Takubo, Yosuke, Sasaki, Toshihiko, Lee, Jaeha, Tsutsui, Izumi
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2309.11117
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author Tsurumaru, Toyohiro
Ichikawa, Tsubasa
Takubo, Yosuke
Sasaki, Toshihiko
Lee, Jaeha
Tsutsui, Izumi
author_facet Tsurumaru, Toyohiro
Ichikawa, Tsubasa
Takubo, Yosuke
Sasaki, Toshihiko
Lee, Jaeha
Tsutsui, Izumi
contents We present a no-go theorem for the distinguishability between quantum random numbers (i.e., random numbers generated quantum mechanically) and pseudo-random numbers (i.e., random numbers generated algorithmically). The theorem states that one cannot distinguish these two types of random numbers if the quantum random numbers are efficiently classically simulatable and the randomness measure used for the distinction is efficiently computable. We derive this theorem by using the properties of cryptographic pseudo-random number generators, which are believed to exist in the field of cryptography. Our theorem is found to be consistent with the analyses on the actual data of quantum random numbers generated by the IBM Quantum and also those obtained in the Innsbruck experiment for the Bell test, where the degrees of randomness of these two set of quantum random numbers turn out to be essentially indistinguishable from those of the corresponding pseudo-random numbers. Previous observations on the algorithmic randomness of quantum random numbers are also discussed and reinterpreted in terms of our theorems and data analyses.
format Preprint
id arxiv_https___arxiv_org_abs_2309_11117
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Indistinguishability between quantum randomness and pseudo-randomness under efficiently calculable randomness measures
Tsurumaru, Toyohiro
Ichikawa, Tsubasa
Takubo, Yosuke
Sasaki, Toshihiko
Lee, Jaeha
Tsutsui, Izumi
Quantum Physics
We present a no-go theorem for the distinguishability between quantum random numbers (i.e., random numbers generated quantum mechanically) and pseudo-random numbers (i.e., random numbers generated algorithmically). The theorem states that one cannot distinguish these two types of random numbers if the quantum random numbers are efficiently classically simulatable and the randomness measure used for the distinction is efficiently computable. We derive this theorem by using the properties of cryptographic pseudo-random number generators, which are believed to exist in the field of cryptography. Our theorem is found to be consistent with the analyses on the actual data of quantum random numbers generated by the IBM Quantum and also those obtained in the Innsbruck experiment for the Bell test, where the degrees of randomness of these two set of quantum random numbers turn out to be essentially indistinguishable from those of the corresponding pseudo-random numbers. Previous observations on the algorithmic randomness of quantum random numbers are also discussed and reinterpreted in terms of our theorems and data analyses.
title Indistinguishability between quantum randomness and pseudo-randomness under efficiently calculable randomness measures
topic Quantum Physics
url https://arxiv.org/abs/2309.11117