Kernel constrained covariance for dependence measurement

Arthur Gretton; Alexander Smola; Olivier Bousquet; Ralf Herbrich; Andrei Belitski; Mark Augath; Yusuke Murayama; Jon Pauls; Bernhard Schölkopf; Nikos Logothetis

Kernel constrained covariance for dependence measurement

Arthur Gretton^*, Alexander Smola, Olivier Bousquet, Ralf Herbrich, Andrei Belitski, Mark Augath, Yusuke Murayama, Jon Pauls, Bernhard Schölkopf, Nikos Logothetis

^*Corresponding author for this work

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

47 Citations (Scopus)

Abstract

We discuss reproducing kernel Hilbert space (RKHS)-based measures of statistical dependence, with emphasis on constrained covariance (COCO), a novel criterion to test dependence of random variables. We show that COCO is a test for independence if and only if the associated RKHSs are universal. That said, no independence test exists that can distinguish dependent and independent random variables in all circumstances. Dependent random variables can result in a COCO which is arbitrarily close to zero when the source densities are highly non-smooth. All current kernel-based independence tests share this behaviour. We demonstrate exponential convergence between the population and empirical COCO. Finally, we use COCO as a measure of joint neural activity between voxels in MRI recordings of the macaque monkey, and compare the results to the mutual information and the correlation. We also show the effect of removing breathing artefacts from the MRI recording.

Original language	English
Title of host publication	AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics
Pages	112-119
Number of pages	8
Publication status	Published - 2005
Externally published	Yes
Event	10th International Workshop on Artificial Intelligence and Statistics, AISTATS 2005 - Hastings, Christ Church, Barbados Duration: 6 Jan 2005 → 8 Jan 2005

Publication series

Name	AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics

Conference

Conference	10th International Workshop on Artificial Intelligence and Statistics, AISTATS 2005
Country/Territory	Barbados
City	Hastings, Christ Church
Period	6/01/05 → 8/01/05

Cite this

Gretton, A., Smola, A., Bousquet, O., Herbrich, R., Belitski, A., Augath, M., Murayama, Y., Pauls, J., Schölkopf, B., & Logothetis, N. (2005). Kernel constrained covariance for dependence measurement. In AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics (pp. 112-119). (AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics).

@inproceedings{1303c6b13ca54ac0903fd5e7304e4665,

title = "Kernel constrained covariance for dependence measurement",

abstract = "We discuss reproducing kernel Hilbert space (RKHS)-based measures of statistical dependence, with emphasis on constrained covariance (COCO), a novel criterion to test dependence of random variables. We show that COCO is a test for independence if and only if the associated RKHSs are universal. That said, no independence test exists that can distinguish dependent and independent random variables in all circumstances. Dependent random variables can result in a COCO which is arbitrarily close to zero when the source densities are highly non-smooth. All current kernel-based independence tests share this behaviour. We demonstrate exponential convergence between the population and empirical COCO. Finally, we use COCO as a measure of joint neural activity between voxels in MRI recordings of the macaque monkey, and compare the results to the mutual information and the correlation. We also show the effect of removing breathing artefacts from the MRI recording.",

author = "Arthur Gretton and Alexander Smola and Olivier Bousquet and Ralf Herbrich and Andrei Belitski and Mark Augath and Yusuke Murayama and Jon Pauls and Bernhard Sch{\"o}lkopf and Nikos Logothetis",

year = "2005",

language = "English",

isbn = "097273581X",

series = "AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics",

pages = "112--119",

booktitle = "AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics",

note = "10th International Workshop on Artificial Intelligence and Statistics, AISTATS 2005 ; Conference date: 06-01-2005 Through 08-01-2005",

}

Gretton, A, Smola, A, Bousquet, O, Herbrich, R, Belitski, A, Augath, M, Murayama, Y, Pauls, J, Schölkopf, B & Logothetis, N 2005, Kernel constrained covariance for dependence measurement. in AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics. AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics, pp. 112-119, 10th International Workshop on Artificial Intelligence and Statistics, AISTATS 2005, Hastings, Christ Church, Barbados, 6/01/05.

Kernel constrained covariance for dependence measurement. / Gretton, Arthur; Smola, Alexander; Bousquet, Olivier et al.
AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics. 2005. p. 112-119 (AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics).

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

TY - GEN

T1 - Kernel constrained covariance for dependence measurement

AU - Gretton, Arthur

AU - Smola, Alexander

AU - Bousquet, Olivier

AU - Herbrich, Ralf

AU - Belitski, Andrei

AU - Augath, Mark

AU - Murayama, Yusuke

AU - Pauls, Jon

AU - Schölkopf, Bernhard

AU - Logothetis, Nikos

PY - 2005

Y1 - 2005

N2 - We discuss reproducing kernel Hilbert space (RKHS)-based measures of statistical dependence, with emphasis on constrained covariance (COCO), a novel criterion to test dependence of random variables. We show that COCO is a test for independence if and only if the associated RKHSs are universal. That said, no independence test exists that can distinguish dependent and independent random variables in all circumstances. Dependent random variables can result in a COCO which is arbitrarily close to zero when the source densities are highly non-smooth. All current kernel-based independence tests share this behaviour. We demonstrate exponential convergence between the population and empirical COCO. Finally, we use COCO as a measure of joint neural activity between voxels in MRI recordings of the macaque monkey, and compare the results to the mutual information and the correlation. We also show the effect of removing breathing artefacts from the MRI recording.

AB - We discuss reproducing kernel Hilbert space (RKHS)-based measures of statistical dependence, with emphasis on constrained covariance (COCO), a novel criterion to test dependence of random variables. We show that COCO is a test for independence if and only if the associated RKHSs are universal. That said, no independence test exists that can distinguish dependent and independent random variables in all circumstances. Dependent random variables can result in a COCO which is arbitrarily close to zero when the source densities are highly non-smooth. All current kernel-based independence tests share this behaviour. We demonstrate exponential convergence between the population and empirical COCO. Finally, we use COCO as a measure of joint neural activity between voxels in MRI recordings of the macaque monkey, and compare the results to the mutual information and the correlation. We also show the effect of removing breathing artefacts from the MRI recording.

UR - http://www.scopus.com/inward/record.url?scp=29144505110&partnerID=8YFLogxK

M3 - Conference contribution

SN - 097273581X

SN - 9780972735810

T3 - AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics

SP - 112

EP - 119

BT - AISTATS 2005 - Proceedings of the 10th International Workshop on Artificial Intelligence and Statistics

T2 - 10th International Workshop on Artificial Intelligence and Statistics, AISTATS 2005

Y2 - 6 January 2005 through 8 January 2005

ER -

Kernel constrained covariance for dependence measurement

Abstract

Publication series

Conference

Other files and links

Fingerprint

Cite this