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FCT
2005
Springer

Reconstructing Many Partitions Using Spectral Techniques

14 years 6 months ago
Reconstructing Many Partitions Using Spectral Techniques
A partitioning of a set of n items is a grouping of these items into k disjoint, equally sized classes. Any partition can be modeled as a graph. The items become the vertices of the graph and two vertices are connected by an edge if and only if the associated items belong to the same class. In a planted partition model a graph that models a partition is given, which is obscured by random noise, i.e., edges within a class can get removed and edges between classes can get inserted. The task is to reconstruct the planted partition from this graph. In the model that we study the number k of classes controls the difficulty of the task. We design a spectral partitioning algorithm that asymptotically almost surely reconstructs up to k = c √ n partitions, where c is a small constant, in time Ck poly(n), where C is another constant.
Joachim Giesen, Dieter Mitsche
Added 27 Jun 2010
Updated 27 Jun 2010
Type Conference
Year 2005
Where FCT
Authors Joachim Giesen, Dieter Mitsche
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