On the distributed complexity of the semi-matching problem
作者:
Highlights:
•
摘要
We consider the problem of matching clients with servers, each of which can process a subset of clients. It is known as the semi-matching or load balancing problem in a bipartite graph G=(V,U,E), where U corresponds to the clients and V to the servers. The goal is to find a set of edges M⊆E such that every vertex in U is incident to exactly one edge in M. The load of a server v∈V is defined as (degM(v)+12), and the problem is to find a semi-matching M that minimizes the sum of the loads of the servers. We show that to find an optimal solution in a distributed setting Ω(|V|) rounds are needed and propose distributed deterministic approximation algorithms for the problem. It yields 2-approximation and has time complexity O(Δ5), where Δ is the maximum degree in V. We also give some greedy algorithms.
论文关键词:Distributed algorithms,Semi-matching
论文评审过程:Received 30 January 2013, Revised 20 February 2014, Accepted 18 June 2014, Available online 11 June 2016, Version of Record 15 July 2016.
论文官网地址:https://doi.org/10.1016/j.jcss.2016.05.001