Berge Sorting
摘要
In 1966, Claude Berge proposed the following sorting problem. Given a string of alternating white and black pegs on a one-dimensional board consisting of an unlimited number of empty holes, rearrange the pegs into a string consisting of white pegs followed immediately by black pegs (or vice versa) using only moves which take 2 adjacent pegs to 2 vacant adjacent holes. Avis and Deza proved that the alternating string can be sorted in such {\em Berge 2-moves} for . Extending Berge's original problem, we consider the same sorting problem using {\em Berge -moves}, i.e., moves which take adjacent pegs to vacant adjacent holes. We prove that the alternating string can be sorted in Berge 3-moves for and in Berge 3-moves for , for . In general, we conjecture that, for any and large enough , the alternating string can be sorted in Berge -moves. This estimate is tight as is a lower bound for the minimum number of required Berge -moves for and .
引用
@article{arxiv.math/0512612,
title = {Berge Sorting},
author = {Antoine Deza and William Hua},
journal= {arXiv preprint arXiv:math/0512612},
year = {2007}
}
备注
10 pages, 2 figures