Email this article Independence Numbers of Random Subgraphs of Some Distance Graph
- Authors: Derevyanko N.M.1, Kiselev S.G.1
-
Affiliations:
- Moscow Institute of Physics and Technology (State University)
- Issue: Vol 53, No 4 (2017)
- Pages: 307-318
- Section: Coding Theory
- URL: https://journal-vniispk.ru/0032-9460/article/view/166444
- DOI: https://doi.org/10.1134/S0032946017040019
- ID: 166444
Cite item
Open Access
Access granted
Subscription Access
Abstract
The distance graph G(n, 2, 1) is a graph where vertices are identified with twoelement subsets of {1, 2,..., n}, and two vertices are connected by an edge whenever the corresponding subsets have exactly one common element. A random subgraph Gp(n, 2, 1) in the Erd˝os–Rényi model is obtained by selecting each edge of G(n, 2, 1) with probability p independently of other edges. We find a lower bound on the independence number of the random subgraph G1/2(n, 2, 1).
About the authors
N. M. Derevyanko
Moscow Institute of Physics and Technology (State University)
Author for correspondence.
Email: nikitaderevyanko@gmail.com
Russian Federation, Moscow
S. G. Kiselev
Moscow Institute of Physics and Technology (State University)
Email: nikitaderevyanko@gmail.com
Russian Federation, Moscow
Supplementary files
