AbstractWe answer the following question: what is the minimum number of edges of a 2-connected graph with a given diameter? This problem stems from survivable telecommunication network design with grade-of-service constraints. In this paper, we prove tight bounds for 2-connected graphs and for 2-edge-connected graphs. The bound for 2-connected graphs was a conjecture of B. Bollobás (AMH 75–80) [3]
AbstractLetGbe a 2-edge-connected graph withmedges andnvertices. The following two conjectures are p...
AbstractA graph G is diameter 2-critical if its diameter is two, and the deletion of any edge increa...
AbstractLet f(n) be the maximum possible number of edges in a graph on n vertices in which no two cy...
AbstractWe answer the following question: what is the minimum number of edges of a 2-connected graph...
We answer the following question: what is the minimum number of edges of a 2-connected graph with a ...
AbstractIt is proved that, if n is sufficiently large compared with d, then the smallest number of e...
AbstractFor given integers n and D, what is the minimum number of edges in a graph on n vertices wit...
AbstractThe problem of finding the minimum size 2-connected subgraph is a classical problem in netwo...
AbstractA simple connected graph G with diam(G) = d is said to be ‘vertex diameter-d-critical’ if di...
AbstractLet f(n) (f2(n)) be the maximum possible number of edges in a graph (2-connected simple grap...
AbstractFor a connected graph G the restricted edge-connectivity λ′(G) is defined as the minimum car...
AbstractIn 1978, Chvátal and Thomassen proved that every 2-edge-connected graph with diameter 2 has ...
AbstractA graph G is diameter 2-critical if its diameter is 2, and the deletion of any edge increase...
AbstractA graph G is diameter 2-critical if its diameter is two and the deletion of any edge increas...
AbstractA graph G is diameter k-critical if the graph has diameter k and the deletion of any edge in...
AbstractLetGbe a 2-edge-connected graph withmedges andnvertices. The following two conjectures are p...
AbstractA graph G is diameter 2-critical if its diameter is two, and the deletion of any edge increa...
AbstractLet f(n) be the maximum possible number of edges in a graph on n vertices in which no two cy...
AbstractWe answer the following question: what is the minimum number of edges of a 2-connected graph...
We answer the following question: what is the minimum number of edges of a 2-connected graph with a ...
AbstractIt is proved that, if n is sufficiently large compared with d, then the smallest number of e...
AbstractFor given integers n and D, what is the minimum number of edges in a graph on n vertices wit...
AbstractThe problem of finding the minimum size 2-connected subgraph is a classical problem in netwo...
AbstractA simple connected graph G with diam(G) = d is said to be ‘vertex diameter-d-critical’ if di...
AbstractLet f(n) (f2(n)) be the maximum possible number of edges in a graph (2-connected simple grap...
AbstractFor a connected graph G the restricted edge-connectivity λ′(G) is defined as the minimum car...
AbstractIn 1978, Chvátal and Thomassen proved that every 2-edge-connected graph with diameter 2 has ...
AbstractA graph G is diameter 2-critical if its diameter is 2, and the deletion of any edge increase...
AbstractA graph G is diameter 2-critical if its diameter is two and the deletion of any edge increas...
AbstractA graph G is diameter k-critical if the graph has diameter k and the deletion of any edge in...
AbstractLetGbe a 2-edge-connected graph withmedges andnvertices. The following two conjectures are p...
AbstractA graph G is diameter 2-critical if its diameter is two, and the deletion of any edge increa...
AbstractLet f(n) be the maximum possible number of edges in a graph on n vertices in which no two cy...