Abstract
For a given finite graph G of minimum degree at least k, let Gp be a random subgraph of G obtained by taking each edge independently with probability p. We prove that (i) if p≥ω/k for a function ω=ω(k) that tends to infinity as k does, then Gp asymptotically almost surely contains a cycle (and thus a path) of length at least (1-o(1))k, and (ii) if p≥(1+o(1))lnk/k, then Gp asymptotically almost surely contains a path of length at least k. Our theorems extend classical results on paths and cycles in the binomial random graph, obtained by taking G to be the complete graph on k + 1 vertices.
| Original language | English |
|---|---|
| Pages (from-to) | 320-345 |
| Number of pages | 26 |
| Journal | Random Structures and Algorithms |
| Volume | 46 |
| Issue number | 2 |
| DOIs | |
| State | Published - 1 Mar 2015 |
Keywords
- Cycle
- Path
- Random graphs
All Science Journal Classification (ASJC) codes
- Software
- Applied Mathematics
- General Mathematics
- Computer Graphics and Computer-Aided Design