Entropy accumulation with improved second-order term
Abstract
The entropy accumulation theorem states that the smooth min-entropy of an -partite system is lower-bounded by the sum of the von Neumann entropies of suitably chosen conditional states up to corrections that are sublinear in . This theorem is particularly suited to proving the security of quantum cryptographic protocols, and in particular so-called device-independent protocols for randomness expansion and key distribution, where the devices can be built and preprogrammed by a malicious supplier. However, while the bounds provided by this theorem are optimal in the first order, the second-order term is bounded more crudely, in such a way that the bounds deteriorate significantly when the theorem is applied directly to protocols where parameter estimation is done by sampling a small fraction of the positions, as is done in most QKD protocols. The objective of this paper is to improve this second-order sublinear term and remedy this problem. On the way, we prove various bounds on the divergence variance, which might be of independent interest.
Cite
@article{arxiv.1805.11652,
title = {Entropy accumulation with improved second-order term},
author = {Frédéric Dupuis and Omar Fawzi},
journal= {arXiv preprint arXiv:1805.11652},
year = {2019}
}
Comments
v2: added comparison to blocking method of 1607.01797. Same as the published version modulo formatting