An EKR Theorem for the Cartesian Product of Complete Graphs
Abstract
The Erdos-Ko-Rado theorem states that for r ≤ n2, the largest intersecting family of r-subsets of [n] is given by fixing a common element in all subsets, which trivially ensures pairwise intersection. We investigate this property for families of independent sets in the Cartesian product of complete graphs, Kn × Km. Using a novel extension of Katona's cycle method, we prove Kn × Km is r-EKR when 1 ≤ r ≤ (m,n)2, demonstrating the Holroyd--Talbot conjecture holds for this class of well-covered graphs.
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