In this note we confirm a conjecture raised by Benjamini et al. [BST13] on the acquaintance time of graphs, proving that for all graphs G with n vertices it holds that AC(G) = O(n3/2), which is tight up to a multi-plicative constant. This is done by proving that for all graphs G with n vertices and maximal degree ∆ it holds that AC(G) ≤ 20∆n. Com-bining this with the bound AC(G) ≤ O(n2/∆) from [BST13] gives the foregoing uniform upper bound of all n-vertex graphs. We also prove that for the n-vertex path Pn it holds that AC(Pn) = n − 2. In addition we show that the barbell graph Bn consisting of two cliques of sizes dn/2e and bn/2c connected by a single edge also has AC(Bn) = n−2. This shows that it is possible to add Ω(n2) edges to Pn ...
We prove that for k ≪4√n regular resolution requires length nΩ(k) to establish that an Erdős–Rényi g...
We present a new technique for efficiently removing almost all short cycles in a graph without unint...
Consider a simple random walk on a connected graph G = (V; E). Let C(u; v) be the expected time tak...
Abstract. In this short note, we prove a conjecture of Benjamini, Shinkar, and Tsur on the acquainta...
Abstract. Benjamini, Shinkar, and Tsur stated the following conjecture on the ac-quaintance time: as...
International audienceIn this short note, we prove a conjecture of Benjamini, Shinkar and Tsur on th...
We show that the number of potential maximal cliques for an arbitrary graph G on n vertices is O ∗ (...
AbstractA simple, finite graph G is called a time graph (equivalently, an indifference graph) if the...
| openaire: EC/H2020/715672/EU//DisDynVertex connectivity a classic extensively-studied problem. Giv...
It is easy to see that in a connected graph any 2 longest paths have a vertex in common. For k >= 7,...
In this paper, we study the acquaintance time AC(G) defined for a connected graph G. We focus on G(n...
In 1959, Erdős and Gallai proved that every graph G with average vertex degree ad(G) ≥ 2 contains a ...
Abstract. In this paper, we study the acquaintance time AC(G) defined for a connected graph G. We fo...
Karger, Motwani and Ramkumar have shown that there is no constant approximation algorithm to find a ...
International audienceWe provide new bounds for the approximation of extremal distances (the diamete...
We prove that for k ≪4√n regular resolution requires length nΩ(k) to establish that an Erdős–Rényi g...
We present a new technique for efficiently removing almost all short cycles in a graph without unint...
Consider a simple random walk on a connected graph G = (V; E). Let C(u; v) be the expected time tak...
Abstract. In this short note, we prove a conjecture of Benjamini, Shinkar, and Tsur on the acquainta...
Abstract. Benjamini, Shinkar, and Tsur stated the following conjecture on the ac-quaintance time: as...
International audienceIn this short note, we prove a conjecture of Benjamini, Shinkar and Tsur on th...
We show that the number of potential maximal cliques for an arbitrary graph G on n vertices is O ∗ (...
AbstractA simple, finite graph G is called a time graph (equivalently, an indifference graph) if the...
| openaire: EC/H2020/715672/EU//DisDynVertex connectivity a classic extensively-studied problem. Giv...
It is easy to see that in a connected graph any 2 longest paths have a vertex in common. For k >= 7,...
In this paper, we study the acquaintance time AC(G) defined for a connected graph G. We focus on G(n...
In 1959, Erdős and Gallai proved that every graph G with average vertex degree ad(G) ≥ 2 contains a ...
Abstract. In this paper, we study the acquaintance time AC(G) defined for a connected graph G. We fo...
Karger, Motwani and Ramkumar have shown that there is no constant approximation algorithm to find a ...
International audienceWe provide new bounds for the approximation of extremal distances (the diamete...
We prove that for k ≪4√n regular resolution requires length nΩ(k) to establish that an Erdős–Rényi g...
We present a new technique for efficiently removing almost all short cycles in a graph without unint...
Consider a simple random walk on a connected graph G = (V; E). Let C(u; v) be the expected time tak...