The number of triangles is more when they have no common vertex

Abstract

By the theorem of Mantel [5] it is known that a graph with n vertices and n24 +1 edges must contain a triangle. A theorem of Erdos gives a strengthening: there are not only one, but at least n2 triangles. We give a further improvement: if there is no vertex contained by all triangles then there are at least n-2 of them. There are some natural generalizations when (a) complete graphs are considered (rather than triangles), (b) the graph has t extra edges (not only one) or (c) it is supposed that there are no s vertices such that every triangle contains one of them. We were not able to prove these generalizations, they are posed as conjectures.