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Balls into Bins via Local Search: Cover Time and Maximum Load

MPS-Authors
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Bringmann,  Karl       
Algorithms and Complexity, MPI for Informatics, Max Planck Society;

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Sauerwald,  Thomas
Algorithms and Complexity, MPI for Informatics, Max Planck Society;

/persons/resource/persons45576

Sun,  He
Algorithms and Complexity, MPI for Informatics, Max Planck Society;

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1310.0801.pdf
(Preprint), 975KB

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Citation

Bringmann, K., Sauerwald, T., Stauffer, A., & Sun, H. (2014). Balls into Bins via Local Search: Cover Time and Maximum Load. Retrieved from http://arxiv.org/abs/1310.0801.


Cite as: https://hdl.handle.net/11858/00-001M-0000-0024-48E3-9
Abstract
We study a natural process for allocating m balls into n bins that are organized as the vertices of an undirected graph G. Balls arrive one at a time. When a ball arrives, it first chooses a vertex u in G uniformly at random. Then the ball performs a local search in G starting from u until it reaches a vertex with local minimum load, where the ball is finally placed on. Then the next ball arrives and this procedure is repeated. For the case m = n, we give an upper bound for the maximum load on graphs with bounded degrees. We also propose the study of the cover time of this process, which is defined as the smallest m so that every bin has at least one ball allocated to it. We establish an upper bound for the cover time on graphs with bounded degrees. Our bounds for the maximum load and the cover time are tight when the graph is transitive or sufficiently homogeneous. We also give upper bounds for the maximum load when m > n.