论文信息 - Consistent multilabel ranking through univariate loss minimization

Consistent multilabel ranking through univariate loss minimization

We consider the problem of rank loss minimization in the setting of multilabel classification, which is usually tackled by means of convex surrogate losses defined on pairs of labels. Very recently, this approach was put into question by a negative result showing that commonly used pairwise surrogate losses, such as exponential and logistic losses, are inconsistent. In this paper, we show a positive result which is arguably surprising in light of the previous one: the simpler univariate variants of exponential and logistic surrogates (i.e., defined on single labels) are consistent for rank loss minimization. Instead of directly proving convergence, we give a much stronger result by deriving regret bounds and convergence rates. The proposed losses suggest efficient and scalable algorithms, which are tested experimentally.

E. Hüllermeier | K. Dembczynski | Wojciech Kotlowski | W. Kotłowski

[1] Yoram Singer,et al. Learning to Order Things , 1997, NIPS.

[2] Jason Weston,et al. A kernel method for multi-labelled classification , 2001, NIPS.

[3] Yoram Singer,et al. Log-Linear Models for Label Ranking , 2003, NIPS.

[4] Yoram Singer,et al. BoosTexter: A Boosting-based System for Text Categorization , 2000, Machine Learning.

[5] G. Lugosi,et al. Ranking and empirical minimization of U-statistics , 2006, math/0603123.

[6] Michael I. Jordan,et al. Convexity, Classification, and Risk Bounds , 2006 .

[7] Eyke Hüllermeier,et al. Bayes Optimal Multilabel Classification via Probabilistic Classifier Chains , 2010, ICML.

[8] Michael I. Jordan,et al. On the Consistency of Ranking Algorithms , 2010, ICML.

[9] Eyke Hüllermeier,et al. Bipartite Ranking through Minimization of Univariate Loss , 2011, ICML.

[10] Zhi-Hua Zhou,et al. On the Consistency of Multi-Label Learning , 2011, COLT.