Reconstructing geometric objects from the measures of their intersections with test sets
Abstract
Let us say that an element of a given family of subsets of can be reconstructed using test sets if there exist such that whenever and the Lebesgue measures of and agree for each then . Our goal will be to find the least such . We prove that if consists of the translates of a fixed reasonably nice subset of then this minimum is . In order to obtain this result we reconstruct a translate of a fixed function using test sets as well, and also prove that under rather mild conditions the measure function of the sections of is absolutely continuous for almost every direction . These proofs are based on techniques of harmonic analysis. We also show that if consists of the magnified copies of a fixed reasonably nice set , where , then test sets reconstruct an element of . This fails in : we prove that an interval, and even an interval of length at least 1 cannot be reconstructed using 2 test sets. Finally, using randomly constructed test sets, we prove that an element of a reasonably nice -dimensional family of geometric objects can be reconstructed using test sets. A example from algebraic topology shows that is sharp in general.
Keywords
Cite
@article{arxiv.1109.6169,
title = {Reconstructing geometric objects from the measures of their intersections with test sets},
author = {Márton Elekes and Tamás Keleti and András Máthé},
journal= {arXiv preprint arXiv:1109.6169},
year = {2014}
}