Difference between revisions of "Xufei Wang, ICDM, 2010"

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Given notations above, the overlapping co-clustering problem can be stated formally as follows:
 
Given notations above, the overlapping co-clustering problem can be stated formally as follows:
  
Input:
+
'''Input:'''
 +
* A user-tag subscription matrix <math>M_{N_{\mu }\times N_{t},</math> where <math>N_{\mu }</math> and <math>N_{t}</math> are the numbers of users and tags.
 +
 
 +
* The number of communities k.
 +
 
 +
'''Output:'''
 +
* k overlapping communities which consist of both users and tags.
  
 
== Brief description of the method ==
 
== Brief description of the method ==

Revision as of 22:44, 27 March 2011

Citation

Xufei Wang. 2010. Discovering Overlapping Groups in Social Media, the 10th IEEE International Conference on Data Mining (ICDM 2010).

Online Version

http://dmml.asu.edu/users/xufei/Papers/ICDM2010.pdf

Databases

BlogCatalog [1]

Delicious [2]

Summary

In this paper, the authors propose a novel co-clustering framework, which takes advantage of networking information between users and tags in social media, to discover these overlapping communities. The basic ideas are:

  • To discover overlapping communities in social media. Diverse interests and interactions that human beings can have in online social life suggest that one person often belongs more than one community.
  • To use user-tag subscription information instead of user-user links. Metadata such as tags become an important source in measuring the user-user similarity. The paper shows that more accurate community structures can be obtained by scrutinizing tag information.
  • To obtain clusters containing users and tags simultaneously. Existing co-clustering methods cluster users/tags separately. Thus, it is not clear which user cluster corresponds to which tag cluster. But the proposed method is able to find out user/tag group structure and their correspondence

Problem Statement

In this paper, the concept of community is generalized to include both users and tags. Tags of a community imply the major concern of people within it.

Let denote the user set, the tay set. A community is a subset of user and tags, where k is the number of communities. As mentioned above, communities usually overlap, i.e., .On the other hand, users and their subscribed tags form a user-tag matrix M, in which each entry indicates whether user subscribes to tag . So it is reasonable to view a user as a sparse vector of tags, and each tag as a sparse vector of users.

Given notations above, the overlapping co-clustering problem can be stated formally as follows:

Input:

  • A user-tag subscription matrix Failed to parse (syntax error): {\displaystyle M_{N_{\mu }\times N_{t},} where and are the numbers of users and tags.
  • The number of communities k.

Output:

  • k overlapping communities which consist of both users and tags.

Brief description of the method

Experimental Result

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