论文信息 - H-Free Graphs of Large Minimum Degree

H-Free Graphs of Large Minimum Degree

We prove the following extension of an old result of Andrasfai, Erdős and Sos. For every fixed graph $H$ with chromatic number $r+1 \geq 3$, and for every fixed $\epsilon>0$, there are $n_0=n_0(H,\epsilon)$ and $\rho=\rho(H) >0$, such that the following holds. Let $G$ be an $H$-free graph on $n>n_0$ vertices with minimum degree at least $\left(1-{1\over r-1/3}+\epsilon\right)n$. Then one can delete at most $n^{2-\rho}$ edges to make $G$ $r$-colorable.

Noga Alon | Benny Sudakov | N. Alon | B. Sudakov

[1] Paul Erdös,et al. On the connection between chromatic number, maximal clique and minimal degree of a graph , 1974, Discret. Math..

[2] P. Erdös. On extremal problems of graphs and generalized graphs , 1964 .

[3] P. Erdös,et al. On the structure of linear graphs , 1946 .

[4] Miklós Simonovits,et al. On a valence problem in extremal graph theory , 1973, Discret. Math..

[5] P. Erdos,et al. A LIMIT THEOREM IN GRAPH THEORY , 1966 .

[6] M. Simonovits,et al. Szemeredi''s Regularity Lemma and its applications in graph theory , 1995 .

[7] P. Erdös. On the structure of linear graphs , 1946 .

[8] V. Sós,et al. On a problem of K. Zarankiewicz , 1954 .

[9] E. Szemerédi. Regular Partitions of Graphs , 1975 .

[10] Noga Alon,et al. Additive approximation for edge-deletion problems , 2005, 46th Annual IEEE Symposium on Foundations of Computer Science (FOCS'05).