Phase transition of degenerate Tur\'an problems in p-norms
Abstract
For a positive real number p, the p-norm G p of a graph G is the sum of the p-th powers of all vertex degrees. We study the maximum p-norm exp(n,F) of F-free graphs on n vertices. F\"uredi and K\"undgen FK06 show that for every bipartite graph F, there exists a threshold pF such that for p< pF, the order of exp(n,F) is governed by pseudorandom constructions, while for p > pF, it is governed by star-like constructions, assuming a mild assumption on the growth rate of ex(n,F). The main contribution of our paper is extending this result to hypergraph. Moreover, in the case of graph, our proof differs from that in FK06, offering the advantage of producing the correct constant factor when p > pF. When p = pF, F\"uredi and K\"undgen proved a general upper bound on exp(n,F), tight up to a n factor, and conjectured that this factor is unnecessary. We confirm this conjecture for several well-studied bipartite graphs, including one-side degree-bounded graphs and families of short even cycles.
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