Percolating paths through random points :
arXiv:math/0509492
Abstract
We prove consistency of four different approaches to formalizing the idea of minimum average edge-length in a path linking some infinite subset of points of a Poisson process. The approaches are (i) shortest path from origin through some $m$ distinct points; (ii) shortest average edge-length in paths across the diagonal of a large cube; (iii) shortest path through some specified proportion $δ$ of points in a large cube; (iv) translation-invariant measures on paths in $\Reals^d$ which contain a proportion $δ$ of the Poisson points. We develop basic properties of a normalized average length function $c(δ)$ and pose challenging open problem
28 pages