Linear spectral Turan problems for expansions of graphs with given chromatic number
Abstract
An r-uniform hypergraph is linear if every two edges intersect in at most one vertex. The r-expansion Fr of a graph F is the r-uniform hypergraph obtained from F by enlarging each edge of F with a vertex subset of size r-2 disjoint from the vertex set of F such that distinct edges are enlarged by disjoint subsets. Let exrlin(n,Fr) and spexrlin(n,Fr) be the maximum number of edges and the maximum spectral radius of all Fr-free linear r-uniform hypergraphs with n vertices, respectively. In this paper, we present the sharp (or asymptotic) bounds of exrlin( n,Fr) and spexrlin(n,Fr) by establishing the connection between the spectral radii of linear hypergraphs and those of their shadow graphs, where F is a (k+1)-color critical graph or a graph with chromatic number k.
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