English

Differential equations and exact solutions in the moving sofa problem

Differential Geometry 2016-07-12 v3 Classical Analysis and ODEs Optimization and Control

Abstract

The moving sofa problem, posed by L. Moser in 1966, asks for the planar shape of maximal area that can move around a right-angled corner in a hallway of unit width, and is conjectured to have as its solution a complicated shape derived by Gerver in 1992. We extend Gerver's techniques by deriving a family of six differential equations arising from the area-maximization property. We then use this result to derive a new shape that we propose as a possible solution to the "ambidextrous moving sofa problem," a variant of the problem previously studied by Conway and others in which the shape is required to be able to negotiate a right-angle turn both to the left and to the right. Unlike Gerver's construction, our new shape can be expressed in closed form, and its boundary is a piecewise algebraic curve. Its area is equal to X+arctanYX+\arctan Y, where XX and YY are solutions to the cubic equations x2(x+3)=8x^2(x+3)=8 and x(4x2+3)=1x(4x^2+3)=1, respectively.

Cite

@article{arxiv.1606.08111,
  title  = {Differential equations and exact solutions in the moving sofa problem},
  author = {Dan Romik},
  journal= {arXiv preprint arXiv:1606.08111},
  year   = {2016}
}

Comments

Version 2 update: added figures and expanded discussion in section 6. Version 3 update: simplified algebraic formulas in section 6

R2 v1 2026-06-22T14:34:41.574Z