Add to ORKGIn 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)k induced k-cycles. This bound is larger by a multiplicative factor of 2e than the simple lower bound obtained by a blow-up construction. Pippenger and Golumbic conjectured that the latter lower bound is essentially tight. In the present paper we establish a better upper bound of (128e/81) · (n/k)k. This constitutes the first progress towards proving the aforementioned conjecture since it was posed
In this paper we show that if G is a 2-connected graph having minimum degree n such that |V(G)|;≥2n+...
The Erdős-Gyárfás conjecture (EGC) states that every graph with minimum vertex degree of at least 3 ...
In 1959, Erdős and Gallai proved that every graph G with average vertex degree ad(G) ≥ 2 contains a ...
In 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)k induced k...
In 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)k induced k...
In 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)k induced k...
In the area of extremal graph theory, there exists a problem that investigates the maximum induced d...
We determine the maximum number of induced cycles that can be contained in a graph on n ≥ n0 vertice...
We determine the maximum number of induced cycles that can be contained in a graph on n ≥ n0 vertice...
We investigate the maximum number of ways in which a k-vertex graph G can appear as an induced subgr...
AbstractWe investigate the maximum number of ways in which a k-vertex graph G can appear as an induc...
AbstractWe investigate the maximum number of ways in which a k-vertex graph G can appear as an induc...
AbstractLet Gn be a class of graphs on n vertices. For an integer c, let ex(Gn,c) be the smallest in...
AbstractLet G be a graph of order at least 3k, where k is a positive integer. Justesen (Ann. Disc. M...
Let Gn be a class of graphs on n vertices.For an integer c, let ex(Gn,c) be the smallest integer suc...
In this paper we show that if G is a 2-connected graph having minimum degree n such that |V(G)|;≥2n+...
The Erdős-Gyárfás conjecture (EGC) states that every graph with minimum vertex degree of at least 3 ...
In 1959, Erdős and Gallai proved that every graph G with average vertex degree ad(G) ≥ 2 contains a ...
In 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)k induced k...
In 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)k induced k...
In 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)k induced k...
In the area of extremal graph theory, there exists a problem that investigates the maximum induced d...
We determine the maximum number of induced cycles that can be contained in a graph on n ≥ n0 vertice...
We determine the maximum number of induced cycles that can be contained in a graph on n ≥ n0 vertice...
We investigate the maximum number of ways in which a k-vertex graph G can appear as an induced subgr...
AbstractWe investigate the maximum number of ways in which a k-vertex graph G can appear as an induc...
AbstractWe investigate the maximum number of ways in which a k-vertex graph G can appear as an induc...
AbstractLet Gn be a class of graphs on n vertices. For an integer c, let ex(Gn,c) be the smallest in...
AbstractLet G be a graph of order at least 3k, where k is a positive integer. Justesen (Ann. Disc. M...
Let Gn be a class of graphs on n vertices.For an integer c, let ex(Gn,c) be the smallest integer suc...
In this paper we show that if G is a 2-connected graph having minimum degree n such that |V(G)|;≥2n+...
The Erdős-Gyárfás conjecture (EGC) states that every graph with minimum vertex degree of at least 3 ...
In 1959, Erdős and Gallai proved that every graph G with average vertex degree ad(G) ≥ 2 contains a ...