Robust reductions from ranking to classification

被引：28

作者：

Balcan, Maria-Florina ^{[2
]}

Bansal, Nikhil ^{[3
]}

Beygelzimer, Alina ^{[1
]}

Coppersmith, Don ^{[4
]}

Langford, John ^{[5
]}

Sorkin, Gregory B. ^{[3
]}

机构：

[1] IBM Thomas J Watson Res Ctr, Hawthorne, NY USA

[2] Carnegie Mellon Univ, Pittsburgh, PA 15213 USA

[3] IBM Thomas J Watson Res Ctr, Yorktown Hts, NY USA

[4] IDA Ctr Communicat Res, Princeton, NJ USA

[5] Yahoo Res, New York, NY USA

来源：

MACHINE LEARNING | 2008年 / 72卷 / 1-2期

关键词：

Ranking; Classification; Reductions;

D O I：

10.1007/s10994-008-5058-6

中图分类号：

TP18 [人工智能理论];

学科分类号：

081104 [模式识别与智能系统]; 0812 [计算机科学与技术]; 0835 [软件工程]; 1405 [智能科学与技术];

摘要：

We reduce ranking, as measured by the Area Under the Receiver Operating Characteristic Curve (AUC), to binary classification. The core theorem shows that a binary classification regret of r on the induced binary problem implies an AUC regret of at most 2r. This is a large improvement over approaches such as ordering according to regressed scores, which have a regret transform of r bar right arrow nr where n is the number of elements.

引用

页码：139 / 153

页数：15

共 15 条

[1]

Stability and generalization of bipartite ranking algorithms [J].

Agarwal, S ;

Niyogi, P .

LEARNING THEORY, PROCEEDINGS, 2005, 3559 :32-47

[2]

AGARWAL S, 2005, P 10 INT WORKSH ART

[3]

Ailon N, 2007, TR2007903 NEW YORK U

[4]

Ranking tournaments [J].

Alon, N .

SIAM JOURNAL ON DISCRETE MATHEMATICS, 2006, 20 (01) :137-142

[5]

[Anonymous], 1979, MATH SCI ENG

[6]

[Anonymous], 2003, Journal of machine learning research

[7]

[Anonymous], 2004, ADV NEURAL INFORM PR

[8]

[Anonymous], P 10 INT WORKSH ART

[9]

BANSAL N, 2006, RC24107 IBM

[10]

Ranking and scoring using empirical risk minimization [J].

Clémençon, S ;

Lugosi, G ;

Vayatis, N .

LEARNING THEORY, PROCEEDINGS, 2005, 3559 :1-15

← 1 2 →