Efficient Probabilistic Inference with Partial Ranking Queries

Distributions over rankings are used to model data in various settings such as preference analysis and political elections. The factorial size of the space of rankings, however, typically forces one to make structural assumptions, such as smoothness, sparsity, or probabilistic independence about these underlying distributions. We approach the modeling problem from the computational principle that one should make structural assumptions which allow for efficient calculation of typical probabilistic queries. For ranking models, "typical" queries predominantly take the form of partial ranking queries (e.g., given a user's top-k favorite movies, what are his preferences over remaining movies?). In this paper, we argue that riffled independence factorizations proposed in recent literature [7, 8] are a natural structural assumption for ranking distributions, allowing for particularly efficient processing of partial ranking queries.

[1]  Nir Friedman,et al.  The Bayesian Structural EM Algorithm , 1998, UAI.

[2]  John D. Lafferty,et al.  Conditional Models on the Ranking Poset , 2002, NIPS.

[3]  Devavrat Shah,et al.  Inferring rankings under constrained sensing , 2008, NIPS.

[4]  Jeff A. Bilmes,et al.  Consensus ranking under the exponential model , 2007, UAI.

[5]  Carlos Guestrin,et al.  Uncovering the riffled independence structure of ranked data , 2012 .

[6]  Jonathan Huang Learning Hierarchical Ri e Independent Groupings from Rankings: Supplemental Material , 2010 .

[7]  Carlos Guestrin,et al.  Riffled Independence for Ranked Data , 2009, NIPS.

[8]  Nir Friedman,et al.  Learning Belief Networks in the Presence of Missing Values and Hidden Variables , 1997, ICML.

[9]  Joachim M. Buhmann,et al.  Cluster analysis of heterogeneous rank data , 2007, ICML '07.

[10]  Nir Ailon,et al.  Aggregation of Partial Rankings, p-Ratings and Top-m Lists , 2007, SODA '07.

[11]  Yi Mao,et al.  Non-parametric Modeling of Partially Ranked Data , 2007, NIPS.

[12]  Leonidas J. Guibas,et al.  Fourier Theoretic Probabilistic Inference over Permutations , 2009, J. Mach. Learn. Res..

[13]  Ryen W. White,et al.  WWW 2007 / Track: Browsers and User Interfaces Session: Personalization Investigating Behavioral Variability in Web Search , 2022 .

[14]  M. Fligner,et al.  Distance Based Ranking Models , 1986 .

[15]  Thomas Brendan Murphy,et al.  A Latent Space Model for Rank Data , 2006, SNA@ICML.

[16]  I. Kondor,et al.  Group theoretical methods in machine learning , 2008 .