Add to ORKGWe study graphs on n vertices which have 2n−2 edges and no proper induced subgraphs of minimum degree 3. Erdős, Faudree, Gyárfás, and Schelp conjectured that such graphs always have cycles of lengths 3,4,5,...,C(n) for some function C(n) tending to in finity. We disprove this conjecture, resolve a related problem about leaf-to-leaf path lengths in trees, and characterize graphs with n vertices and 2n−2 edges, containing no proper subgraph of minimum degree 3
AbstractWe determine the minimum number of edges a graph needs in order to ensure that the subgraph ...
AbstractIn this paper, we will prove that every graph G with minimum degree δ(G) ≥ 3 contains a cycl...
AbstractIn this paper, we prove that every 3-connected claw-free graph G on n vertices contains a cy...
We study graphs on n vertices which have 2n−2 edges and no proper induced subgraphs of minimum degre...
We study graphs on n vertices which have 2n−2 edges and no proper induced subgraphs of minimum degre...
We study graphs on n vertices which have 2n−2 edges and no proper induced subgraphs of minimum degre...
AbstractIf a graph G has n vertices and 2n−1 edges, it must contain some proper subgraph of minimal ...
AbstractWe investigate the following question proposed by Erdős: Is there a constant c such that, fo...
AbstractIf a graph G has n vertices and 2n−1 edges, it must contain some proper subgraph of minimal ...
If a graph G has n vertices and 2n – 1 edges, it must contain some proper subgraph of minimal degree...
AbstractWe investigate the following question proposed by Erdős: Is there a constant c such that, fo...
AbstractFor k ⩾ 2, any graph G with n vertices and (k−1)(n−k+2)+(2k−2) edges has a subrgraph of mini...
AbstractWe show that for all positive ε, an integer N(ε) exists such that if G is any graph of order...
AbstractS.C. Locke proposed a question: If G is a 3-connected graph with minimum degree d and X is a...
AbstractWe show that for each ℓ⩾4 every sufficiently large oriented graph G with δ+(G),δ−(G)⩾⌊|G|/3⌋...
AbstractWe determine the minimum number of edges a graph needs in order to ensure that the subgraph ...
AbstractIn this paper, we will prove that every graph G with minimum degree δ(G) ≥ 3 contains a cycl...
AbstractIn this paper, we prove that every 3-connected claw-free graph G on n vertices contains a cy...
We study graphs on n vertices which have 2n−2 edges and no proper induced subgraphs of minimum degre...
We study graphs on n vertices which have 2n−2 edges and no proper induced subgraphs of minimum degre...
We study graphs on n vertices which have 2n−2 edges and no proper induced subgraphs of minimum degre...
AbstractIf a graph G has n vertices and 2n−1 edges, it must contain some proper subgraph of minimal ...
AbstractWe investigate the following question proposed by Erdős: Is there a constant c such that, fo...
AbstractIf a graph G has n vertices and 2n−1 edges, it must contain some proper subgraph of minimal ...
If a graph G has n vertices and 2n – 1 edges, it must contain some proper subgraph of minimal degree...
AbstractWe investigate the following question proposed by Erdős: Is there a constant c such that, fo...
AbstractFor k ⩾ 2, any graph G with n vertices and (k−1)(n−k+2)+(2k−2) edges has a subrgraph of mini...
AbstractWe show that for all positive ε, an integer N(ε) exists such that if G is any graph of order...
AbstractS.C. Locke proposed a question: If G is a 3-connected graph with minimum degree d and X is a...
AbstractWe show that for each ℓ⩾4 every sufficiently large oriented graph G with δ+(G),δ−(G)⩾⌊|G|/3⌋...
AbstractWe determine the minimum number of edges a graph needs in order to ensure that the subgraph ...
AbstractIn this paper, we will prove that every graph G with minimum degree δ(G) ≥ 3 contains a cycl...
AbstractIn this paper, we prove that every 3-connected claw-free graph G on n vertices contains a cy...