Two new results about quantum exact learning
Abstract
We present two new results about exact learning by quantum computers. First, we show how to exactly learn a -Fourier-sparse -bit Boolean function from uniform quantum examples for that function. This improves over the bound of uniformly random \emph{classical} examples (Haviv and Regev, CCC'15). Additionally, we provide a possible direction to improve our upper bound by proving an improvement of Chang's lemma for -Fourier-sparse Boolean functions. Second, we show that if a concept class can be exactly learned using quantum membership queries, then it can also be learned using \emph{classical} membership queries. This improves the previous-best simulation result (Servedio and Gortler, SICOMP'04) by a -factor.
Cite
@article{arxiv.1810.00481,
title = {Two new results about quantum exact learning},
author = {Srinivasan Arunachalam and Sourav Chakraborty and Troy Lee and Manaswi Paraashar and Ronald de Wolf},
journal= {arXiv preprint arXiv:1810.00481},
year = {2021}
}
Comments
v4: 22 pages. We have corrected an error in the previous version of the paper. All the main results still hold