AbstractFor 0 < γ ≤ 1 and graphs G and H, we write G[formula]H if any γ-proportion of the edges of G span at least one copy of H in G. As customary, we write Ck for a cycle of length k. We show that, for every fixed integer l ≥ 2 and real γ > 0, there exists constant C = C(l, γ) > 0 such that almost every random graph Gn, p with p = p(n) ≥ Cn−1 + 1/(2l − 1) satisfies Gn,p[formula]C2l. In particular, for any fixed l ≥ 2 and γ > 0, this result implies the existence of very sparse graphs G with G[formula]C2l
One of the cornerstones of extremal graph theory is a result of Füredi, later reproved and given due...
This dissertation lies at the intersection of extremal combinatorics and probabilistic combinatorics...
AbstractLet r be any integer ≥2. There exist absolute constants C1 and C2 such that if G(N, p) denot...
AbstractFor 0 < γ ≤ 1 and graphs G and H, we write G[formula]H if any γ-proportion of the edges of G...
We study the maximal number of edges a C 2k -free subgraph of a random graph Gn;p may have, obtainin...
We prove four separate results. These results will appear or have appeared in various papers (see [1...
The KŁR conjecture of Kohayakawa, Łuczak, and Rödl is a statement that allows one to prove that asym...
Abstract. Let H be a given finite (possibly empty) family of connected graphs, each containing a cyc...
We study several problems in extremal combinatorics, random graphs, and asymptotic convex geometry. ...
We prove three results. First, an old conjecture of Zs. Tuza says that for any graph G, the ratio of...
This thesis discusses three problems in probabilistic and extremal combinatorics. Our first result e...
AbstractLet G(n, p) be a graph on n vertices in which each possible edge is presented independently ...
AbstractLet k be a fixed positive integer. A graph H has property Mk if it contains ⌊12k⌋ edge disjo...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
We develop a new technique that allows us to show in a unified way that many well-known combinatoria...
One of the cornerstones of extremal graph theory is a result of Füredi, later reproved and given due...
This dissertation lies at the intersection of extremal combinatorics and probabilistic combinatorics...
AbstractLet r be any integer ≥2. There exist absolute constants C1 and C2 such that if G(N, p) denot...
AbstractFor 0 < γ ≤ 1 and graphs G and H, we write G[formula]H if any γ-proportion of the edges of G...
We study the maximal number of edges a C 2k -free subgraph of a random graph Gn;p may have, obtainin...
We prove four separate results. These results will appear or have appeared in various papers (see [1...
The KŁR conjecture of Kohayakawa, Łuczak, and Rödl is a statement that allows one to prove that asym...
Abstract. Let H be a given finite (possibly empty) family of connected graphs, each containing a cyc...
We study several problems in extremal combinatorics, random graphs, and asymptotic convex geometry. ...
We prove three results. First, an old conjecture of Zs. Tuza says that for any graph G, the ratio of...
This thesis discusses three problems in probabilistic and extremal combinatorics. Our first result e...
AbstractLet G(n, p) be a graph on n vertices in which each possible edge is presented independently ...
AbstractLet k be a fixed positive integer. A graph H has property Mk if it contains ⌊12k⌋ edge disjo...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
We develop a new technique that allows us to show in a unified way that many well-known combinatoria...
One of the cornerstones of extremal graph theory is a result of Füredi, later reproved and given due...
This dissertation lies at the intersection of extremal combinatorics and probabilistic combinatorics...
AbstractLet r be any integer ≥2. There exist absolute constants C1 and C2 such that if G(N, p) denot...