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SAGA
2007
Springer
2007
Springer
Approximate Discovery of Random Graphs
In the layered-graph query model of network discovery, a query at a node v of an undirected graph G discovers all edges and non-edges whose endpoints have different distance from v. We study the number of queries at randomly selected nodes that are needed for approximate network discovery in Erd˝os-R´enyi random graphs Gn,p. We show that a constant number of queries is sufficient if p is a constant, while Ω(nα ) queries are needed if p = nε /n, for arbitrarily small choices of ε = 3/(6 · i + 5) with i ∈ N. Note that α > 0 is a constant depending only on ε. Our proof of the latter result yields also a somewhat surprising result on pairwise distances in random graphs which may be of independent interest: We show that for a random graph Gn,p with p = nε /n, for arbitrarily small choices of ε > 0 as above, in any constant cardinality subset of the nodes the pairwise distances are all identical with high probability.
Real-time TrafficNetwork Discovery | Nε /n | Random Graph | SAGA 2007 |
| Added | 09 Jun 2010 |
| Updated | 09 Jun 2010 |
| Type | Conference |
| Year | 2007 |
| Where | SAGA |
| Authors | Thomas Erlebach, Alexander Hall, Matús Mihalák |
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