Quantum Distance Calculation for $\epsilon$-Graph Construction
Abstract
In machine learning and particularly in topological data analysis, -graphs are important tools but are generally hard to compute as the distance calculation between n points takes time O(n^2) classically. Recently, quantum approaches for calculating distances between n quantum states have been proposed, taking advantage of quantum superposition and entanglement. We investigate the potential for quantum advantage in the case of quantum distance calculation for computing -graphs. We show that, relying on existing quantum multi-state SWAP test based algorithms, the query complexity for correctly identifying (with a given probability) that two points are not -neighbours is at least O(n^3 / ln n), showing that this approach, if used directly for -graph construction, does not bring a computational advantage when compared to a classical approach.
Cite
@article{arxiv.2306.04290,
title = {Quantum Distance Calculation for $\epsilon$-Graph Construction},
author = {Naomi Mona Chmielewski and Nina Amini and Paulin Jacquot and Joseph Mikael},
journal= {arXiv preprint arXiv:2306.04290},
year = {2023}
}