| Dynamic Matchings in Convex Bipartite Graphs (2008) | |||||||||||||||
Abstract | |||||||||||||||
| Abstract. We consider the problem of maintaining a maximum matching in a convex bipartite graph G = (V, E) under a set of update operations which includes insertions and deletions of vertices and edges. It is not hard to show that it is impossible to maintain an explicit representation of a maximum matching in sub-linear time per operation, even in the amortized sense. Despite this difficulty, we develop a data structure which maintains the set of vertices that participate in a maximum matching in O(log 2 |V |) amortized time per update and reports the status of a vertex (matched or unmatched) in constant worst-case time. Our structure can report the mate of a matched vertex in the maximum matching in worst-case O(min{k log 2 |V |+log |V |, |V | log |V |}) time, where k is the number of update operations since the last query for the same pair of vertices was made. In addition, we give an O ( � |V | log 2 |V |)-time amortized bound for this pair query. 1 | |||||||||||||||
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