The sum-capture problem for abelian groups
Abstract
Let be a finite abelian group, let , and let be a random set of size . We let The issue is to determine upper bounds on that hold with high probability over the random choice of . Mennink and Preneel \cite{BM} conjecture that should be close to (up to possible logarithmic factors in ) for and that should not much exceed for . We prove the second half of this conjecture by showing that with high probability, for all . We note that for . In previous work, Alon et al have shown that with high probability for while Kiltz, Pietrzak and Szegedy show that with high probability for . Current bounds on are essentially sharp for the range . Finding better bounds remains an open problem for the range and especially for the range in which the bound of Kiltz et al doesn't improve on the bound given in this paper (even if that bound applied). Moreover the conjecture of Mennink and Preneel for remains open.
Cite
@article{arxiv.1309.5582,
title = {The sum-capture problem for abelian groups},
author = {John P Steinberger},
journal= {arXiv preprint arXiv:1309.5582},
year = {2014}
}