On the relative isoperimetric problem for the cube

Abstract

In this article, we solve the relative isoperimetric problem in [0,1]3 for orthogonal polyhedra. Up to isometries of the cube or sets of measure 0, the minimizers are of the form [0,ε]3, [0,ε]2 × [0,1], or [0,ε] × [0,1]2 for some ε > 0. This should be compared to the conjectured minimizers for the unconstrained relative isoperimetric problem in [0,1]3, which are (up to isometries and sets of measure 0) of the form ( B3(ε) ) [0,1]3, ( B2(ε) × [0,1] ) [0,1]3, or [0,ε] × [0,1]2 for some ε > 0. Here, Bk(ε) is the closed ball in Rk of radius ε centered at the origin.