Brenier approach for optimal transportation between a quasi-discrete measure and a discrete measure

Ying Lu; Liming Chen; Alexandre Saidi; Xianfeng Gu

doi:10.1007/978-3-030-19816-9_16

Brenier approach for optimal transportation between a quasi-discrete measure and a discrete measure

Ying Lu
, Liming Chen
, Alexandre Saidi
, Xianfeng Gu

Computer Science

Stony Brook University

École centrale de Lyon

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

1 Scopus citations

Abstract

Correctly estimating the discrepancy between two data distributions has always been an important task in Machine Learning. Recently, Cuturi proposed the Sinkhorn distance [1] which makes use of an approximate Optimal Transport cost between two distributions as a distance to describe distribution discrepancy. Although it has been successfully adopted in various machine learning applications (e.g. in Natural Language Processing and Computer Vision) since then, the Sinkhorn distance also suffers from two unnegligible limitations. The first one is that the Sinkhorn distance only gives an approximation of the real Wasserstein distance, the second one is the ‘divide by zero’ problem which often occurs during matrix scaling when setting the entropy regularization coefficient to a small value. In this paper, we introduce a new Brenier approach for calculating a more accurate Wasserstein distance between two discrete distributions, this approach successfully avoids the two limitations shown above for Sinkhorn distance and gives an alternative way for estimating distribution discrepancy.

Original language	English
Title of host publication	Representations, Analysis and Recognition of Shape and Motion from Imaging Data - 7th International Workshop, RFMI 2017, Revised Selected Papers
Editors	Faouzi Ghorbel, Liming Chen, Boulbaba Ben Amor
Publisher	Springer Verlag
Pages	204-212
Number of pages	9
ISBN (Print)	9783030198152
DOIs	https://doi.org/10.1007/978-3-030-19816-9_16
State	Published - 2019
Event	7th International Workshop on Representations, Analysis and Recognition of Shape and Motion from Imaging Data, RFMI 2017 - Savoie, France Duration: Dec 17 2017 → Dec 20 2017

Publication series

Name	Communications in Computer and Information Science
Volume	842

Conference

Conference	7th International Workshop on Representations, Analysis and Recognition of Shape and Motion from Imaging Data, RFMI 2017
Country/Territory	France
City	Savoie
Period	12/17/17 → 12/20/17

Access to Document

10.1007/978-3-030-19816-9_16

Cite this

Lu, Y., Chen, L., Saidi, A., & Gu, X. (2019). Brenier approach for optimal transportation between a quasi-discrete measure and a discrete measure. In F. Ghorbel, L. Chen, & B. Ben Amor (Eds.), Representations, Analysis and Recognition of Shape and Motion from Imaging Data - 7th International Workshop, RFMI 2017, Revised Selected Papers (pp. 204-212). (Communications in Computer and Information Science; Vol. 842). Springer Verlag. https://doi.org/10.1007/978-3-030-19816-9_16

Lu, Ying ; Chen, Liming ; Saidi, Alexandre et al. / Brenier approach for optimal transportation between a quasi-discrete measure and a discrete measure. Representations, Analysis and Recognition of Shape and Motion from Imaging Data - 7th International Workshop, RFMI 2017, Revised Selected Papers. editor / Faouzi Ghorbel ; Liming Chen ; Boulbaba Ben Amor. Springer Verlag, 2019. pp. 204-212 (Communications in Computer and Information Science).

@inproceedings{30ea2280d52341bbbfbd29bc88a01b1b,

title = "Brenier approach for optimal transportation between a quasi-discrete measure and a discrete measure",

abstract = "Correctly estimating the discrepancy between two data distributions has always been an important task in Machine Learning. Recently, Cuturi proposed the Sinkhorn distance [1] which makes use of an approximate Optimal Transport cost between two distributions as a distance to describe distribution discrepancy. Although it has been successfully adopted in various machine learning applications (e.g. in Natural Language Processing and Computer Vision) since then, the Sinkhorn distance also suffers from two unnegligible limitations. The first one is that the Sinkhorn distance only gives an approximation of the real Wasserstein distance, the second one is the {\textquoteleft}divide by zero{\textquoteright} problem which often occurs during matrix scaling when setting the entropy regularization coefficient to a small value. In this paper, we introduce a new Brenier approach for calculating a more accurate Wasserstein distance between two discrete distributions, this approach successfully avoids the two limitations shown above for Sinkhorn distance and gives an alternative way for estimating distribution discrepancy.",

author = "Ying Lu and Liming Chen and Alexandre Saidi and Xianfeng Gu",

note = "Publisher Copyright: {\textcopyright} Springer Nature Switzerland AG 2019.; 7th International Workshop on Representations, Analysis and Recognition of Shape and Motion from Imaging Data, RFMI 2017 ; Conference date: 17-12-2017 Through 20-12-2017",

year = "2019",

doi = "10.1007/978-3-030-19816-9\_16",

language = "English",

isbn = "9783030198152",

series = "Communications in Computer and Information Science",

publisher = "Springer Verlag",

pages = "204--212",

editor = "Faouzi Ghorbel and Liming Chen and \{Ben Amor\}, Boulbaba",

booktitle = "Representations, Analysis and Recognition of Shape and Motion from Imaging Data - 7th International Workshop, RFMI 2017, Revised Selected Papers",

}

Lu, Y, Chen, L, Saidi, A & Gu, X 2019, Brenier approach for optimal transportation between a quasi-discrete measure and a discrete measure. in F Ghorbel, L Chen & B Ben Amor (eds), Representations, Analysis and Recognition of Shape and Motion from Imaging Data - 7th International Workshop, RFMI 2017, Revised Selected Papers. Communications in Computer and Information Science, vol. 842, Springer Verlag, pp. 204-212, 7th International Workshop on Representations, Analysis and Recognition of Shape and Motion from Imaging Data, RFMI 2017, Savoie, France, 12/17/17. https://doi.org/10.1007/978-3-030-19816-9_16

Brenier approach for optimal transportation between a quasi-discrete measure and a discrete measure. / Lu, Ying; Chen, Liming; Saidi, Alexandre et al.
Representations, Analysis and Recognition of Shape and Motion from Imaging Data - 7th International Workshop, RFMI 2017, Revised Selected Papers. ed. / Faouzi Ghorbel; Liming Chen; Boulbaba Ben Amor. Springer Verlag, 2019. p. 204-212 (Communications in Computer and Information Science; Vol. 842).

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

TY - GEN

T1 - Brenier approach for optimal transportation between a quasi-discrete measure and a discrete measure

AU - Lu, Ying

AU - Chen, Liming

AU - Saidi, Alexandre

AU - Gu, Xianfeng

N1 - Publisher Copyright: © Springer Nature Switzerland AG 2019.

PY - 2019

Y1 - 2019

N2 - Correctly estimating the discrepancy between two data distributions has always been an important task in Machine Learning. Recently, Cuturi proposed the Sinkhorn distance [1] which makes use of an approximate Optimal Transport cost between two distributions as a distance to describe distribution discrepancy. Although it has been successfully adopted in various machine learning applications (e.g. in Natural Language Processing and Computer Vision) since then, the Sinkhorn distance also suffers from two unnegligible limitations. The first one is that the Sinkhorn distance only gives an approximation of the real Wasserstein distance, the second one is the ‘divide by zero’ problem which often occurs during matrix scaling when setting the entropy regularization coefficient to a small value. In this paper, we introduce a new Brenier approach for calculating a more accurate Wasserstein distance between two discrete distributions, this approach successfully avoids the two limitations shown above for Sinkhorn distance and gives an alternative way for estimating distribution discrepancy.

AB - Correctly estimating the discrepancy between two data distributions has always been an important task in Machine Learning. Recently, Cuturi proposed the Sinkhorn distance [1] which makes use of an approximate Optimal Transport cost between two distributions as a distance to describe distribution discrepancy. Although it has been successfully adopted in various machine learning applications (e.g. in Natural Language Processing and Computer Vision) since then, the Sinkhorn distance also suffers from two unnegligible limitations. The first one is that the Sinkhorn distance only gives an approximation of the real Wasserstein distance, the second one is the ‘divide by zero’ problem which often occurs during matrix scaling when setting the entropy regularization coefficient to a small value. In this paper, we introduce a new Brenier approach for calculating a more accurate Wasserstein distance between two discrete distributions, this approach successfully avoids the two limitations shown above for Sinkhorn distance and gives an alternative way for estimating distribution discrepancy.

UR - https://www.scopus.com/pages/publications/85065886024

U2 - 10.1007/978-3-030-19816-9_16

DO - 10.1007/978-3-030-19816-9_16

M3 - Conference contribution

SN - 9783030198152

T3 - Communications in Computer and Information Science

SP - 204

EP - 212

BT - Representations, Analysis and Recognition of Shape and Motion from Imaging Data - 7th International Workshop, RFMI 2017, Revised Selected Papers

A2 - Ghorbel, Faouzi

A2 - Chen, Liming

A2 - Ben Amor, Boulbaba

PB - Springer Verlag

T2 - 7th International Workshop on Representations, Analysis and Recognition of Shape and Motion from Imaging Data, RFMI 2017

Y2 - 17 December 2017 through 20 December 2017

ER -

Lu Y, Chen L, Saidi A, Gu X. Brenier approach for optimal transportation between a quasi-discrete measure and a discrete measure. In Ghorbel F, Chen L, Ben Amor B, editors, Representations, Analysis and Recognition of Shape and Motion from Imaging Data - 7th International Workshop, RFMI 2017, Revised Selected Papers. Springer Verlag. 2019. p. 204-212. (Communications in Computer and Information Science). doi: 10.1007/978-3-030-19816-9_16

Brenier approach for optimal transportation between a quasi-discrete measure and a discrete measure

Abstract

Publication series

Conference

Access to Document

Other files and links

Fingerprint

Cite this