Spectral Radius Conditions for 3-Uniform Intersecting Families
Abstract
Let Mk denote a matching of size k. The classical Erdős matching conjecture asks for the maximum number of edges of an intersecting r-graph without Mk. The csae for k=2, which is known as intersecting r-graph, is established by Erdős, Ko and Rado. Hilton and Milner further determine the maximum number of edges of a non-trivial intersecting r-graph, where the intersecting r-graph H is called non-trivial if e∈ E(H)e=. In this paper, we investigate the spectral analogues of the hpergraph matching problems and intersecting family problems. More precisely, for sufficiently large n, we determine respectively the maximum spectral radius of Mk+1-free and non-trivial intersecting 3-graphs on n vertices, and characterize the extremal hypergraphs.
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