A Conditional Upper Bound for the Moving Sofa Problem
Abstract
The moving sofa problem asks for the connected shape with the largest area that can move around the right-angled corner of a hallway with unit width. The best bounds currently known on are summarized as . The lower bound comes from Gerver's sofa of area . The upper bound was proved by Kallus and Romik using extensive computer assistance. It is conjectured that the equality holds at the lower bound. We develop a new approach to the moving sofa problem by approximating it as an infinite-dimensional convex quadratic optimization problem. The problem is then explicitly solved using a calculus of variation based on the Brunn-Minkowski theory. Consequently, we prove that any moving sofa satisfying a property named the injectivity condition has an area of at most . The new conditional bound does not rely on any computer assistance, yet it is much closer to the lower bound of Gerver than the computer-assisted upper bound of Kallus and Romik. Gerver's sofa , the conjectured optimum, satisfies the injectivity condition in particular.
Cite
@article{arxiv.2406.10725,
title = {A Conditional Upper Bound for the Moving Sofa Problem},
author = {Jineon Baek},
journal= {arXiv preprint arXiv:2406.10725},
year = {2024}
}
Comments
This work has been superseded by arXiv:2411.19826 that resolves the moving sofa problem completely. Do not cite this work