Abstract
Chvátal and Erdős proved a well-known result that every graph G with connectivity κ(G) not less than its independence number α(G) is Hamiltonian. Han et al. (in Discret Math 310:2082–2090, 2003) showed that every 2-connected graph G with α(G)≤κ(G)+1 is supereulerian with some exceptional graphs. In this paper, we investigate the similar conditions and show that every 2-connected graph G with α(G)≤κ(G)+3 has a spanning trail. We also show that every connected graph G with α(G)≤κ(G)+2 has a spanning trail or G is the graph obtained from K1,3 by replacing at most two vertices of degree 1 in K1,3 with a complete graph or G is the graph obtained from K3 by adding a pendent edge to each vertex of K3. As a byproduct, we obtain that the line graph of a connected graph G with α(G)≤κ(G)+2 is traceable. These results are all best possible.
| Original language | English |
|---|---|
| Pages (from-to) | 1739-1754 |
| Number of pages | 16 |
| Journal | Graphs and Combinatorics |
| Volume | 31 |
| Issue number | 5 |
| DOIs | |
| Publication status | Published - 24 Sept 2015 |
Keywords
- Chvátal–Erdős condition
- Connectivity
- Independence number
- Line graph
- Spanning trail