TY - JOUR
T1 - On Rödl’s Theorem for Cographs
AU - Gishboliner, Lior
AU - Shapira, Asaf
N1 - Publisher Copyright:
© The authors.
PY - 2023
Y1 - 2023
N2 - A theorem of Rödl states that for every fixed F and ε > 0 there is δ = δF (ε) so that every induced F-free graph contains a vertex set of size δn whose edge density is either at most ε or at least 1 − ε. Rödl’s proof relied on the regularity lemma, hence it supplied only a tower-type bound for δ. Fox and Sudakov conjectured that δ can be made polynomial in ε, and a recent result of Fox, Nguyen, Scott and Seymour shows that this conjecture holds when F = P4. In fact, they show that the same conclusion holds even if G contains few copies of P4. In this note we give a short proof of a more general statement.
AB - A theorem of Rödl states that for every fixed F and ε > 0 there is δ = δF (ε) so that every induced F-free graph contains a vertex set of size δn whose edge density is either at most ε or at least 1 − ε. Rödl’s proof relied on the regularity lemma, hence it supplied only a tower-type bound for δ. Fox and Sudakov conjectured that δ can be made polynomial in ε, and a recent result of Fox, Nguyen, Scott and Seymour shows that this conjecture holds when F = P4. In fact, they show that the same conclusion holds even if G contains few copies of P4. In this note we give a short proof of a more general statement.
UR - http://www.scopus.com/inward/record.url?scp=85174570098&partnerID=8YFLogxK
U2 - 10.37236/12189
DO - 10.37236/12189
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AN - SCOPUS:85174570098
SN - 0022-5282
VL - 30
JO - Electronic Journal of Combinatorics
JF - Electronic Journal of Combinatorics
IS - 4
M1 - #P4.13
ER -