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134
Voted
COLT
2005
Springer
2005
Springer
Learnability of Bipartite Ranking Functions
The problem of ranking, in which the goal is to learn a real-valued ranking function that induces a ranking or ordering over an instance space, has recently gained attention in machine learning. We define a model of learnability for ranking functions in a particular setting of the ranking problem known as the bipartite ranking problem, and derive a number of results in this model. Our first main result provides a sufficient condition for the learnability of a class of ranking functions F: we show that F is learnable if its bipartite rank-shatter coefficients, which measure the richness of a ranking function class in the same way as do the standard VC-dimension related shatter coefficients (growth function) for classes of classification functions, do not grow too quickly. Our second main result gives a necessary condition for learnability: we define a new combinatorial parameter for a class of ranking functions F that we term the rank dimension of F, and show that F is learnable ...
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| Added | 26 Jun 2010 |
| Updated | 26 Jun 2010 |
| Type | Conference |
| Year | 2005 |
| Where | COLT |
| Authors | Shivani Agarwal, Dan Roth |
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