Separating path systems in complete graphs

Abstract

We prove that in any n-vertex complete graph there is a collection P of (1 + o(1))n paths that strongly separates any pair of distinct edges e, f, meaning that there is a path in P which contains e but not f. Furthermore, for certain classes of n-vertex α n-regular graphs we find a collection of (3 α + 1 - 1 + o(1))n paths that strongly separates any pair of edges. Both results are best-possible up to the o(1) term.

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