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SIGAL
1990
1990
Randomized Broadcast in Networks
We propose and analyse a quasirandom analogue to the classical push model for disseminating information in networks ("randomized rumor spreading"). In the classical model, in each round each informed node chooses a neighbor at random and informs it. Results of Frieze and Grimmett (Discrete Appl. Math. 1985) show that this simple protocol succeeds in spreading a rumor from one node of a complete graph to all others within O(log n) rounds. For the network being a hypercube or a random graph G(n, p) with p (1+)(log n)/n, also O(log n) rounds suffice (Feige, Peleg, Raghavan, and Upfal, Random Struct. Algorithms 1990). In the quasirandom model, we assume that each node has a (cyclic) list of its neighbors. Once informed, it starts at a random position of the list, but from then on informs its neighbors in the order of the list. Surprisingly, irrespective of the orders of the lists, the above mentioned bounds still hold. In addition, we also show a O(log n) bound for sparsely con...
Real-time TrafficAlgorithms | Classical Model | Random | Random Graphs | SIGAL 1990 |
| Added | 11 Aug 2010 |
| Updated | 11 Aug 2010 |
| Type | Conference |
| Year | 1990 |
| Where | SIGAL |
| Authors | Uriel Feige, David Peleg, Prabhakar Raghavan, Eli Upfal |
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