Generalized comparison trees for point-location problems
Abstract
Let be an arbitrary family of hyper-planes in -dimensions. We show that the point-location problem for can be solved by a linear decision tree that only uses a special type of queries called \emph{generalized comparison queries}. These queries correspond to hyperplanes that can be written as a linear combination of two hyperplanes from ; in particular, if all hyperplanes in are -sparse then generalized comparisons are -sparse. The depth of the obtained linear decision tree is polynomial in and logarithmic in , which is comparable to previous results in the literature that use general linear queries. This extends the study of comparison trees from a previous work by the authors [Kane {et al.}, FOCS 2017]. The main benefit is that using generalized comparison queries allows to overcome limitations that apply for the more restricted type of comparison queries. Our analysis combines a seminal result of Forster regarding sets in isotropic position [Forster, JCSS 2002], the margin-based inference dimension analysis for comparison queries from [Kane {et al.}, FOCS 2017], and compactness arguments.
Cite
@article{arxiv.1804.08237,
title = {Generalized comparison trees for point-location problems},
author = {Daniel M Kane and Shachar Lovett and Shay Moran},
journal= {arXiv preprint arXiv:1804.08237},
year = {2018}
}