Paper Info
Title
Geometric and combinatorial tiles in 0-1 data
Abstract
In this paper we introduce a simple probabilistic model, hierarchical tiles, for 0-1 data. A basic tile (X,Y,p) specifies a subset X of the rows and a subset Y of the columns of the data, i.e., a rectangle, and gives a probability p for the occurrence of 1s in the cells of X × Y. A hierarchical tile has additionally a set of exception tiles that specify the probabilities for subrectangles of the original rectangle. If the rows and columns are ordered and X and Y consist of consecutive elements in those orderings, then the tile is geometric; otherwise it is combinatorial. We give a simple randomized algorithm for finding good geometric tiles. Our main result shows that using spectral ordering techniques one can find good orderings that turn combinatorial tiles into geometric tiles. We give empirical results on the performance of the methods.
Year
DOI
Venue
2004
10.1007/b100704
PKDD
Keywords
Field
DocType
randomized algorithm,probabilistic model
Row,Row and column spaces,Discrete mathematics,Randomized algorithm,Combinatorics,Rectangle,Computational geometry,Spectral method,Statistical model,Tile,Mathematics
Conference
Volume
ISSN
ISBN
3202
0302-9743
3-540-23108-0
Citations 
PageRank 
References 
34
1.53
21
Authors
3
Name
Order
Citations
PageRank
Aristides Gionis16808386.81
Heikki Mannila265951495.69
Jouni K. Seppänen31249.09