Phase estimation using an approximate eigenstate

Abstract

A basic building block of many quantum algorithms is the Phase Estimation algorithm (PEA). It estimates an eigenphase φ of a unitary operator U using a copy of the corresponding eigenstate |φ. Suppose, in place of |φ, we have a copy of an approximate eigenstate | whose overlap magnitude with |φ is at least 2/3. Then PEA fails with a constant probability. However, using multiple copies of |, the failure probaility can be made to decrease exponentially with the number of copies. In this paper, we show that as long as we can perform a selective inversion of |, a single copy is sufficient to estimate φ. An important application is to improve the spatial complexity of eigenpath traversal algorithm, a "digital" analogue of quantum adiabatic evolution, having applications ranging from quantum physics simulation to optimization. Here the goal is to travel a path of eigenstates of n different unitary operators satisfying some conditions. The fastest algorithm is due to Boixo, Knill and Somma (BKS) which needs ( n) copies of the eigenstate. Using our algorithm, BKS algorithm can work using just a single copy of the eigenstate.