We consider the problem of nding deterministically a large independent set of guaranteed size in a hypergraph on n vertices and with m edges. With respect to the Turan bound, the quality of our solutions is for hypergraphs with not too many small cycles by a logarithmic factor in the input size better. The algorithms are fast; they often have a running time of O(m) + o(n 3). Indeed, the denser the hypergraphs are the more close are the running times to the linear ones. This gives for the rst time for some combinatorial problems algorithmic solutions with state-of-the-art quality, solutions of which so far only the existence was known. In some cases, the corresponding upper bounds match the lower bounds up to constant factors. The involved c...
Szemerédi’s Regularity Lemma [22, 23] is one of the most powerful tools in combinatorics. It assert...
In this paper, we study r-uniform hypergraphs H without cycles of length less than ve, employing the...
We study problems in extremal combinatorics motivated by Turan's Theorem and Ramsey Theory. In Chapt...
We consider the problem of nding deterministically a large independent set of guaranteed size in a h...
We consider the problem of finding deterministically a large independent set of guaranteed size in a...
z Abstract. The problem of nding a large independent set in a hyper-graph by an online algorithm is ...
Let r be a fixed constant and let H be an r-uniform, D-regular hypergraph on N vertices. Assume furt...
In this dissertation, we study problems concerning independent sets in hypergraphs. We try to determ...
The paper considers the problem of computing a maximal independent set in a hypergraph (see [3] and ...
Whether or not the problem of finding maximal indepen-dent sets (MIS) in hypergraphs is in (R)NC is ...
One of the earliest results in Extremal Combinatorics is Mantel's theorem from 1907 which says that ...
The following very natural problem was raised by Chung and Erdős in the early 80’s and has since bee...
Abstract. Szemerédi’s Regularity Lemma is a powerful tools in graph theory. It asserts that all lar...
Turán's Theorem gives an upper bound on the number of edges of n-node, K_r-free graphs, or equivalen...
In this thesis, we study several generalizations of Turan type problems in graphs and hypergraphs. I...
Szemerédi’s Regularity Lemma [22, 23] is one of the most powerful tools in combinatorics. It assert...
In this paper, we study r-uniform hypergraphs H without cycles of length less than ve, employing the...
We study problems in extremal combinatorics motivated by Turan's Theorem and Ramsey Theory. In Chapt...
We consider the problem of nding deterministically a large independent set of guaranteed size in a h...
We consider the problem of finding deterministically a large independent set of guaranteed size in a...
z Abstract. The problem of nding a large independent set in a hyper-graph by an online algorithm is ...
Let r be a fixed constant and let H be an r-uniform, D-regular hypergraph on N vertices. Assume furt...
In this dissertation, we study problems concerning independent sets in hypergraphs. We try to determ...
The paper considers the problem of computing a maximal independent set in a hypergraph (see [3] and ...
Whether or not the problem of finding maximal indepen-dent sets (MIS) in hypergraphs is in (R)NC is ...
One of the earliest results in Extremal Combinatorics is Mantel's theorem from 1907 which says that ...
The following very natural problem was raised by Chung and Erdős in the early 80’s and has since bee...
Abstract. Szemerédi’s Regularity Lemma is a powerful tools in graph theory. It asserts that all lar...
Turán's Theorem gives an upper bound on the number of edges of n-node, K_r-free graphs, or equivalen...
In this thesis, we study several generalizations of Turan type problems in graphs and hypergraphs. I...
Szemerédi’s Regularity Lemma [22, 23] is one of the most powerful tools in combinatorics. It assert...
In this paper, we study r-uniform hypergraphs H without cycles of length less than ve, employing the...
We study problems in extremal combinatorics motivated by Turan's Theorem and Ramsey Theory. In Chapt...