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Joseph O'Rourke
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This does not fit your non-geometric requirement, but nevertheless "might appeal to a group of applied mathematicians":

If you cut the cut locus of a point $x$ on the surface of a convex polyhedron $P$ in $\mathbb{R}^3$, then $P$ unfolds to the plane without self-overlap.


[![CutLocus][1]][1]
*Left*: The cut locus (red) w.r.t. $x$ on a box. *Right*: Unfolding resulting from cutting the cut locus.

This result generalizes to $\mathbb{R}^d$ for $d > 3$, unfolding without overlap to dimension $d-1$.

Joseph O'Rourke
  • 150.9k
  • 36
  • 358
  • 958