Geodesic
Faster rumor spreading with multiple calls
Konstantinos Panagiotou1 ; Ali Pourmiri2 ; Thomas Sauerwald3
1The Ludwig Maximilian University of Munich
2Max Planck Institute for Informatics
3University of Cambridge
The electronic journal of combinatorics, Tome 22 (2015) no. 1
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We consider the random phone call model introduced by Demers et al., which is a well-studied model for information dissemination on networks. One basic protocol in this model is the so-called Push protocol which proceeds in synchronous rounds. Starting with a single node which knows of a rumor, every informed node calls in each round a random neighbor and informs it of the rumor. The Push-Pull protocol works similarly, but additionally every uninformed node calls a random neighbor and may learn the rumor from it.It is well-known that both protocols need $\Theta(\log n)$ rounds to spread a rumor on a complete network with $n$ nodes. Here we are interested in how much the spread can be speeded by enabling nodes to make more than one call in each round. We propose a new model where the number of calls of a node is chosen independently according to a probability distribution $R$. We provide both lower and upper bounds on the rumor spreading time depending on statistical properties of $R$ such as the mean or the variance (if they exist). In particular, if $R$ follows a power law distribution with exponent $\beta \in (2,3)$, we show that the Push-Pull protocol spreads a rumor in $\Theta(\log \log n)$ rounds. Moreover when $\beta=3$, the Push-Pull protocol spreads a rumor in $\Theta(\frac{ \log n}{\log\log n})$ rounds.
DOI : 10.37236/4314
Classification : 68M14, 68M12, 68R10, 68W20
Mots-clés : randomized algorithm, rumor spreading, broadcast time

Konstantinos Panagiotou  1   ; Ali Pourmiri  2   ; Thomas Sauerwald  3

1 The Ludwig Maximilian University of Munich
2 Max Planck Institute for Informatics
3 University of Cambridge 
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Konstantinos Panagiotou; Ali Pourmiri; Thomas Sauerwald. Faster rumor spreading with multiple calls. The electronic journal of combinatorics, Tome 22 (2015) no. 1. doi: 10.37236/4314

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