Quantum Factoring Algorithm using Grover Search

Abstract

We present a quantum algorithm for factoring products of prime numbers which exploits Grover search to factor any $n$-bit biprime using $2n-5$ qubits or less. The algorithm doesn't depend on any properties of the number to be factored, has guaranteed convergence, and doesn't require complex classical pre or post-processing. Large scale simulations confirm a success probability asymptotically reaching 100% for $>800$ random biprimes with $5\leq n\leq 35$ (corresponding to $5 - 65$ qubits) with the largest being $30398263859 = 7393\times 4111763$. We also present a variant of the algorithm based on digital adiabatic quantum computing and show that Grover based factorization requires quadratically fewer iteration steps in most cases.