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A lower bound for distributed averaging algorithms

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arxiv 1003.5941 v1 pith:V644EDMJ submitted 2010-03-30 math.OC

A lower bound for distributed averaging algorithms

classification math.OC
keywords averagingdistributedalgorithmslowerrunningstatewhosealgorithm
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We derive lower bounds on the convergence speed of a widely used class of distributed averaging algorithms. In particular, we prove that any distributed averaging algorithm whose state consists of a single real number and whose (possibly nonlinear) update function satisfies a natural smoothness condition has a worst case running time of at least on the order of $n^2$ on a network of $n$ nodes. Our results suggest that increased memory or expansion of the state space is crucial for improving the running times of distributed averaging algorithms.

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