Some exact and asymptotic results for hypergraph Tur\'an problems in 2-norm
Abstract
For a k-uniform hypergraph H, the codegree squared sum co2(H) is the square of the 2-norm of the codegree vector of H, and for a family F of k-uniform hypergraphs, the codegree squared extremal number exco2(n, F) is the maximum codegree squared sum of a hypergraph on n vertices which does not contain any hypergraph in F. Balogh, Clemen and Lidick\'y recently introduced the codegree squared extremal number and determined it for a number of 3-uniform hypergraphs, including the complete graphs K43 and K53. In this paper, we give a number of exact or asymptotic results for hypergraph Tur\'an problems in the 2-norm, including the first exact results for arbitrary k. Namely, we prove a version of the classical Erdos-Ko-Rado theorem for the codegree squared extremal number: if F ⊂ [n]k is intersecting and n 2k, then \[co2(F) n-1k-1(1+(n-k+1)(k-1)),\] with equality only for the star for n > 2k. Our main tool is an inequality of Bey, which also gives a general upper bound on exco2(n, F). We also prove versions of the Erdos Matching Conjecture and the t-intersecting Erdos-Ko-Rado theorem for the codegree squared extremal number for large n, determine the exact codegree squared extremal number of minimal and linear 3-paths and 3-cycles, and determine asymptotically the codegree squared extremal number of minimal and linear s-paths and s-cycles for s 4. Lastly, we derive a number of exact or asymptotic results for graph Tur\'an-type problems in the 2-norm from spectral extremal results for certain forbidden subgraph problems and the well-known Hofmeister's inequality.
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