Abstract
Given integers k ≥ 2 and n ≥ k, let c(n, k) denote the maximum possible number of edges in an n-vertex graph which has no k-connected subgraph. It is immediate that c(n, 2) = n -1. Mader [2] conjectured that for every k ≥ 2, if n is sufficiently large then c(n, k) ≤ (1.5k -2)(n -k + 1), where equality holds whenever k -1 divides n. In this note we prove that when n is sufficiently large then c(n, k) ≤ 193/120(k - 1)(n - k + 1) < 1.61(k - 1)(n - k + 1), thereby coming rather close to the conjectured bound.
Original language | English |
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Pages (from-to) | 231-235 |
Number of pages | 5 |
Journal | Ars Combinatoria |
Volume | 67 |
State | Published - Apr 2003 |
ASJC Scopus subject areas
- General Mathematics