The Muffin Problem
Abstract
You have muffins and students. You want to divide the muffins into pieces and give the shares to students such that every student has muffins. Find a divide-and-distribute protocol that maximizes the minimum piece. Let be the minimum piece in the optimal protocol. We prove that exists, is rational, and finding it is computable (though possibly difficult). We show that can be derived from ; hence we need only consider . We give a function such that, for , . It is often the case that . More formally, for all , for all but a finite number of , . This leads to a nice formula for , though there are exceptions to it. We give a formula , which has 6 parts, such that for many of the exceptional , . This works for most of the exceptional where ceil. There are still some exceptional with ceil (if its then the problem is trivial). For these cases we have a way to {\it generate theorems}. For we have generated formulas for . We do not have a theorem here but we do have a methodology which leads to, for some of the , a value such that often . So far it seems like, for , , though we have not prove this. For and we have obtained for all but 20 values.
Cite
@article{arxiv.1709.02452,
title = {The Muffin Problem},
author = {Guangiqi Cui and John Dickerson and Naveen Durvasula and William Gasarch and Erik Metz and Jacob Prinz and Naveen Raman and Daniel Smolyak and Sung Hyun Yoo},
journal= {arXiv preprint arXiv:1709.02452},
year = {2019}
}
Comments
Paper is outdated and some parts are wrong. There will be a book on this topic soon which will be THE place to get this information!