A Menger-type theorem for two induced paths

Abstract

We give an approximate Menger-type theorem for when a graph G contains two X-Y paths P1 and P2 such that P1 P2 is an induced subgraph of G. More generally, we prove that there exists a function f(d) ∈ O(d), such that for every graph G and X,Y ⊂eq V(G), either there exist two X-Y paths P1 and P2 such that the distance between P1 and P2 is at least d, or there exists v ∈ V(G) such that the ball of radius f(d) centered at v intersects every X-Y path.