Distributed Quantum-classical Hybrid Shor's Algorithm

Shor's algorithm, which was proposed by Peter Shor [Proceedings of the 35th Annual Symposium on Foundations of Computer Science, 1994, pp. 124--134], is considered as one of the most significant quantum algorithms. Shor's algorithm can factor large integers with a certain probability of success in polynomial time. However, Shor's algorithm requires an unbearable amount of qubits and circuit depth in the NISQ (Noisy Intermediate-scale Quantum) era. To reduce the resources required for Shor's algorithm, we propose a new distributed quantum-classical hybrid order-finding algorithm for Shor's algorithm. The traditional order-finding algorithm needs to obtain an estimation of some $\dfrac{s}{r}$, where $r$ is the ``order'' and $s\in\{0,1,\cdots,r-1\}$. In our distributed algorithm, we use $k$ computers to estimate partial bits of $\dfrac{s}{r}$ separately. In order to reduce the errors of measuring results of these computers, we use classical programs to correct the measuring results of each computer to a certain extent. Compared with the traditional Shor's algorithm, our algorithm reduces nearly $(1-\dfrac{1}{k})L-\log_2k$ qubits for each computer when factoring an $L$-bit integer. Also, our algorithm reduces gate complexity and circuit depth to some extent for each computer. The communication complexity of our algorithm is $O(kL)$.