Rooted C5-Minors
Abstract
Let G be a graph and x1, x2, …, xk be distinct vertices of G. We say (G,x1x2… xk) has a Ck-minor or G has a Ck-minor rooted at x1x2… xk, if there exist pairwise disjoint sets X1, X2, …, Xk⊂eq V(G), such that for all i∈ [k], G[Xi] is connected, xi∈ Xi, and G has an edge between Xi and Xi+1, where Xk+1=Xk. When k=3 it is easy to determine when (G,x1x2x3) contains a C3-minor. For k=4, Robertson, Seymour and Thomas gave a characterization of (G,x1x2x3x4) with no C4-minor, which, in particular, implies that such G has connectivity at most 5. In this paper, we apply a method of Thomas and Wollan to prove a result, which implies that if G is 10-connected then, for all distinct vertices x1,x2,x3,x4,x5 of G, (G,x1x2x3x4x5) has a C5-minor.
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