Lower Bounds on Intersection Families for Certain Graphs
Abstract
A family of graphs F is H-intersecting if the edge intersection of any two graphs in F contains a copy of a fixed graph H. A fundamental problem is to determine the maximum size of such a family. The trivial lower bound of 2n2 - e(H) is known to be not sharp for some graphs, such as the P4 graph, as shown by Christofides. This paper presents two main contributions. First, we introduce a general construction for H-intersecting families based on decompositions of complete multipartite graphs, yielding new lower bounds for H = Ks1, …, sk-1, t. We compare this construction to a result by Balogh and Linz, showing that our bound is valid for a substantially wider range of parameters (beginning at t 2Σi si) and provides a stronger numerical bound for a large interval where both constructions are applicable. Second, we conjecture the 17128 Christofides bound for P4 is optimal, which would resolve the Alon-Spencer conjecture. We computationally verify this density is optimal for families generated by connected 6-vertex host graphs with 7 or 8 edges.
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