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Auteurs principaux: Acton, Reed, Petersen, T. Kyle, Shirman, Blake, Tenner, Bridget Eileen
Format: Preprint
Publié: 2024
Sujets:
Accès en ligne:https://arxiv.org/abs/2401.11680
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author Acton, Reed
Petersen, T. Kyle
Shirman, Blake
Tenner, Bridget Eileen
author_facet Acton, Reed
Petersen, T. Kyle
Shirman, Blake
Tenner, Bridget Eileen
contents In this paper we study a variant of the Malicious Maître d' problem. This problem, attributed to computer scientist Rob Pike in Peter Winkler's book "Mathematical Puzzles: A Connoisseur's Collection", involves seating diners around a circular table with napkins placed between each pair of adjacent settings. The goal of the maître d' is to seat the diners in a way that maximizes the number of diners who arrive at the table to find the napkins on both the left and right of their place already taken by their neighbors. Previous work described a seating algorithm in which the maître d' expects to force about 18% of the diners to be napkinless. In this paper, we show that if the maître d' learns each diner's preference for the right or left napkin before they are placed at the table, this expectation jumps to nearly $1/3$ (and converges to $1/3$ as the table size gets large). Moreover, our strategy is optimal for every sequence of diners' preferences.
format Preprint
id arxiv_https___arxiv_org_abs_2401_11680
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle The clairvoyant maître d'
Acton, Reed
Petersen, T. Kyle
Shirman, Blake
Tenner, Bridget Eileen
Combinatorics
In this paper we study a variant of the Malicious Maître d' problem. This problem, attributed to computer scientist Rob Pike in Peter Winkler's book "Mathematical Puzzles: A Connoisseur's Collection", involves seating diners around a circular table with napkins placed between each pair of adjacent settings. The goal of the maître d' is to seat the diners in a way that maximizes the number of diners who arrive at the table to find the napkins on both the left and right of their place already taken by their neighbors. Previous work described a seating algorithm in which the maître d' expects to force about 18% of the diners to be napkinless. In this paper, we show that if the maître d' learns each diner's preference for the right or left napkin before they are placed at the table, this expectation jumps to nearly $1/3$ (and converges to $1/3$ as the table size gets large). Moreover, our strategy is optimal for every sequence of diners' preferences.
title The clairvoyant maître d'
topic Combinatorics
url https://arxiv.org/abs/2401.11680