Modeling and recovering non-transitive pairwise comparison matrices

Dehui Yang; Michael B. Wakin

doi:10.1109/SAMPTA.2015.7148846

Modeling and recovering non-transitive pairwise comparison matrices

Dehui Yang, Michael B. Wakin

Colorado School of Mines

Research output: Chapter in Book or Report/Conference proceeding › Conference Proceeding › peer-review

1 Citation (Scopus)

Abstract

Pairwise comparison matrices arise in numerous applications including collaborative filtering, elections, economic exchanges, etc. In this paper, we propose a new low-rank model for pairwise comparison matrices that accommodates non-transitive pairwise comparisons. Based on this model, we consider the regime where one has limited observations of a pairwise comparison matrix and wants to reconstruct the whole matrix from these observations using matrix completion. To do this, we adopt a recently developed alternating minimization algorithm to this particular matrix completion problem and derive a theoretical guarantee for its performance. Numerical simulations using synthetic data support our proposed approach.

Original language	English
Title of host publication	2015 International Conference on Sampling Theory and Applications, SampTA 2015
Publisher	Institute of Electrical and Electronics Engineers Inc.
Pages	39-43
Number of pages	5
ISBN (Electronic)	9781467373531
DOIs	https://doi.org/10.1109/SAMPTA.2015.7148846
Publication status	Published - 2 Jul 2015
Externally published	Yes
Event	11th International Conference on Sampling Theory and Applications, SampTA 2015 - Washington, United States Duration: 25 May 2015 → 29 May 2015

Publication series

Name	2015 International Conference on Sampling Theory and Applications, SampTA 2015

Conference

Conference	11th International Conference on Sampling Theory and Applications, SampTA 2015
Country/Territory	United States
City	Washington
Period	25/05/15 → 29/05/15

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10.1109/SAMPTA.2015.7148846

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Yang, D., & Wakin, M. B. (2015). Modeling and recovering non-transitive pairwise comparison matrices. In 2015 International Conference on Sampling Theory and Applications, SampTA 2015 (pp. 39-43). Article 7148846 (2015 International Conference on Sampling Theory and Applications, SampTA 2015). Institute of Electrical and Electronics Engineers Inc.. https://doi.org/10.1109/SAMPTA.2015.7148846

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title = "Modeling and recovering non-transitive pairwise comparison matrices",

abstract = "Pairwise comparison matrices arise in numerous applications including collaborative filtering, elections, economic exchanges, etc. In this paper, we propose a new low-rank model for pairwise comparison matrices that accommodates non-transitive pairwise comparisons. Based on this model, we consider the regime where one has limited observations of a pairwise comparison matrix and wants to reconstruct the whole matrix from these observations using matrix completion. To do this, we adopt a recently developed alternating minimization algorithm to this particular matrix completion problem and derive a theoretical guarantee for its performance. Numerical simulations using synthetic data support our proposed approach.",

author = "Dehui Yang and Wakin, {Michael B.}",

note = "Publisher Copyright: {\textcopyright} 2015 IEEE.; 11th International Conference on Sampling Theory and Applications, SampTA 2015 ; Conference date: 25-05-2015 Through 29-05-2015",

year = "2015",

month = jul,

day = "2",

doi = "10.1109/SAMPTA.2015.7148846",

language = "English",

series = "2015 International Conference on Sampling Theory and Applications, SampTA 2015",

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Yang, D & Wakin, MB 2015, Modeling and recovering non-transitive pairwise comparison matrices. in 2015 International Conference on Sampling Theory and Applications, SampTA 2015., 7148846, 2015 International Conference on Sampling Theory and Applications, SampTA 2015, Institute of Electrical and Electronics Engineers Inc., pp. 39-43, 11th International Conference on Sampling Theory and Applications, SampTA 2015, Washington, United States, 25/05/15. https://doi.org/10.1109/SAMPTA.2015.7148846

Modeling and recovering non-transitive pairwise comparison matrices. / Yang, Dehui; Wakin, Michael B.
2015 International Conference on Sampling Theory and Applications, SampTA 2015. Institute of Electrical and Electronics Engineers Inc., 2015. p. 39-43 7148846 (2015 International Conference on Sampling Theory and Applications, SampTA 2015).

Research output: Chapter in Book or Report/Conference proceeding › Conference Proceeding › peer-review

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N2 - Pairwise comparison matrices arise in numerous applications including collaborative filtering, elections, economic exchanges, etc. In this paper, we propose a new low-rank model for pairwise comparison matrices that accommodates non-transitive pairwise comparisons. Based on this model, we consider the regime where one has limited observations of a pairwise comparison matrix and wants to reconstruct the whole matrix from these observations using matrix completion. To do this, we adopt a recently developed alternating minimization algorithm to this particular matrix completion problem and derive a theoretical guarantee for its performance. Numerical simulations using synthetic data support our proposed approach.

AB - Pairwise comparison matrices arise in numerous applications including collaborative filtering, elections, economic exchanges, etc. In this paper, we propose a new low-rank model for pairwise comparison matrices that accommodates non-transitive pairwise comparisons. Based on this model, we consider the regime where one has limited observations of a pairwise comparison matrix and wants to reconstruct the whole matrix from these observations using matrix completion. To do this, we adopt a recently developed alternating minimization algorithm to this particular matrix completion problem and derive a theoretical guarantee for its performance. Numerical simulations using synthetic data support our proposed approach.

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T2 - 11th International Conference on Sampling Theory and Applications, SampTA 2015

Y2 - 25 May 2015 through 29 May 2015

ER -

Modeling and recovering non-transitive pairwise comparison matrices

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