A plurality problem with three colors and query size three
Abstract
The Plurality problem - introduced by Aigner \cite{A2004} - has many variants. In this article we deal with the following version: suppose we are given balls, each of them colored by one of three colors. A \textit{plurality ball} is one such that its color class is strictly larger than any other color class. Questioner wants to find a plurality ball as soon as possible or state there is no, by asking triplets (or -sets, in general), while Adversary partition the triplets into color classes as an answer for the queries and wants to postpone the possibility of determining a plurality ball (or stating there is no). We denote by the largest number of queries needed to ask if both play optimally (and Questioner asks triplets). We provide an almost precise result in case of even by proving that for even we have and for odd we have We also prove some bounds on the number of queries needed to ask for larger .
Cite
@article{arxiv.1708.05864,
title = {A plurality problem with three colors and query size three},
author = {Dániel Gerbner and Dániel Lenger and Máté Vizer},
journal= {arXiv preprint arXiv:1708.05864},
year = {2017}
}
Comments
29 pages