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Abstract We consider Shor’s quantum factoring algorithm in the setting of noisy quantum gates. Under a generic model of random noise for (controlled) rotation gates, we prove that the algorithm does not factor integers of the form pq when the noise exceeds a vanishingly small level in terms of n —the number of bits of the integer to be factored, where p and q are from a well-defined set of primes of positive density. We further prove that with probability 1 − o (1) over random prime pairs ( p, q ), Shor’s factoring algorithm does not factor numbers of the form pq , with the same level of random noise present.
Jin‐Yi Cai (Tue,) studied this question.