On the Turán properties of infinite graphs
The electronic journal of combinatorics, Tome 15 (2008)
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Let $G^{(\infty)}$ be an infinite graph with the vertex set corresponding to the set of positive integers ${\Bbb N}$. Denote by $G^{(l)}$ a subgraph of $G^{(\infty)}$ which is spanned by the vertices $\{1,\dots,l\}$. As a possible extension of Turán's theorem to infinite graphs, in this paper we will examine how large $\liminf_{l\rightarrow \infty} {|E(G^{(l)})|\over l^2}$ can be for an infinite graph $G^{(\infty)}$, which does not contain an increasing path $I_k$ with $k+1$ vertices. We will show that for sufficiently large $k$ there are $I_k$–free infinite graphs with ${1\over 4}+{1\over 200} < \liminf_{l\rightarrow \infty} {|E(G^{(l)})|\over l^2}$. This disproves a conjecture of J. Czipszer, P. Erdős and A. Hajnal. On the other hand, we will show that $\liminf_{l\rightarrow \infty} {|E(G^{(l)})|\over l^2}\le{1\over 3}$ for any $k$ and such $G^{(\infty)}$.
Andrzej Dudek; Vojtěch Rödl. On the Turán properties of infinite graphs. The electronic journal of combinatorics, Tome 15 (2008). doi: 10.37236/771
@article{10_37236_771,
author = {Andrzej Dudek and Vojt\v{e}ch R\"odl},
title = {On the {Tur\'an} properties of infinite graphs},
journal = {The electronic journal of combinatorics},
year = {2008},
volume = {15},
doi = {10.37236/771},
zbl = {1181.05054},
url = {http://geodesic.mathdoc.fr/articles/10.37236/771/}
}
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