An Improved Algorithm for Quantum Principal Component Analysis

Abstract

Principal component analysis is an important dimension reduction technique in machine learning. In [S. Lloyd, M. Mohseni and P. Rebentrost, Nature Physics 10, 631-633, (2014)], a quantum algorithm to implement principal component analysis on quantum computer was obtained by computing the Hamiltonian simulation of unknown density operators. The complexity is O(( d)t2/ε), where d is the dimension, t is the evolution time and ε is the precision. We improve this result into O(( d)t1+1k/ε1k) for arbitrary constant integer k≥ 1. As a result, we show that the Hamiltonian simulation of low-rank dense Hermitian matrices can be implemented in the same time.