Minimal graph in which the intersection of two longest paths is not a separator
Abstract
We prove that for a connected simple graph G with n 10 vertices, and two longest paths C and D in G, the intersection of vertex sets V(C) V(D) is a separator. This shows that the graph found previously with n=11, in which the complement of the intersection of vertex sets V(C) V(D) of two longest paths is connected, is minimal.
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