Smooth strongly convex regression

Andrea Simonetto

doi:10.23919/Eusipco47968.2020.9287715

Smooth strongly convex regression

Andrea Simonetto

IBM Research Ireland

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

Abstract

Convex regression (CR) is the problem of fitting a convex function to a finite number of noisy observations of an underlying convex function. CR is important in many domains and one of its workhorses is the non-parametric least square estimator (LSE). Currently, LSE delivers only non-smooth non-strongly convex function estimates. In this paper, leveraging recent results in convex interpolation, we generalize LSE to smooth strongly convex regression problems. The resulting algorithm relies on a convex quadratically constrained quadratic program. We also propose a parallel implementation, which leverages ADMM, that lessens the overall computational complexity to a tight Opn²q for n observations. Numerical results support our findings.

Original language	English
Title of host publication	28th European Signal Processing Conference, EUSIPCO 2020 - Proceedings
Publisher	European Signal Processing Conference, EUSIPCO
Pages	2130-2134
Number of pages	5
ISBN (Electronic)	9789082797053
DOIs	https://doi.org/10.23919/Eusipco47968.2020.9287715
Publication status	Published - 24 Jan 2021
Externally published	Yes
Event	28th European Signal Processing Conference, EUSIPCO 2020 - Amsterdam, Netherlands Duration: 24 Aug 2020 → 28 Aug 2020

Publication series

Name	European Signal Processing Conference
Volume	2021-January
ISSN (Print)	2219-5491

Conference

Conference	28th European Signal Processing Conference, EUSIPCO 2020
Country/Territory	Netherlands
City	Amsterdam
Period	24/08/20 → 28/08/20

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10.23919/Eusipco47968.2020.9287715

Cite this

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title = "Smooth strongly convex regression",

abstract = "Convex regression (CR) is the problem of fitting a convex function to a finite number of noisy observations of an underlying convex function. CR is important in many domains and one of its workhorses is the non-parametric least square estimator (LSE). Currently, LSE delivers only non-smooth non-strongly convex function estimates. In this paper, leveraging recent results in convex interpolation, we generalize LSE to smooth strongly convex regression problems. The resulting algorithm relies on a convex quadratically constrained quadratic program. We also propose a parallel implementation, which leverages ADMM, that lessens the overall computational complexity to a tight Opn2q for n observations. Numerical results support our findings.",

author = "Andrea Simonetto",

note = "Publisher Copyright: {\textcopyright} 2021 European Signal Processing Conference, EUSIPCO. All rights reserved.; 28th European Signal Processing Conference, EUSIPCO 2020 ; Conference date: 24-08-2020 Through 28-08-2020",

year = "2021",

month = jan,

day = "24",

doi = "10.23919/Eusipco47968.2020.9287715",

language = "English",

series = "European Signal Processing Conference",

publisher = "European Signal Processing Conference, EUSIPCO",

pages = "2130--2134",

booktitle = "28th European Signal Processing Conference, EUSIPCO 2020 - Proceedings",

}

Simonetto, A 2021, Smooth strongly convex regression. in 28th European Signal Processing Conference, EUSIPCO 2020 - Proceedings., 9287715, European Signal Processing Conference, vol. 2021-January, European Signal Processing Conference, EUSIPCO, pp. 2130-2134, 28th European Signal Processing Conference, EUSIPCO 2020, Amsterdam, Netherlands, 24/08/20. https://doi.org/10.23919/Eusipco47968.2020.9287715

TY - GEN

T1 - Smooth strongly convex regression

AU - Simonetto, Andrea

PY - 2021/1/24

Y1 - 2021/1/24

N2 - Convex regression (CR) is the problem of fitting a convex function to a finite number of noisy observations of an underlying convex function. CR is important in many domains and one of its workhorses is the non-parametric least square estimator (LSE). Currently, LSE delivers only non-smooth non-strongly convex function estimates. In this paper, leveraging recent results in convex interpolation, we generalize LSE to smooth strongly convex regression problems. The resulting algorithm relies on a convex quadratically constrained quadratic program. We also propose a parallel implementation, which leverages ADMM, that lessens the overall computational complexity to a tight Opn2q for n observations. Numerical results support our findings.

AB - Convex regression (CR) is the problem of fitting a convex function to a finite number of noisy observations of an underlying convex function. CR is important in many domains and one of its workhorses is the non-parametric least square estimator (LSE). Currently, LSE delivers only non-smooth non-strongly convex function estimates. In this paper, leveraging recent results in convex interpolation, we generalize LSE to smooth strongly convex regression problems. The resulting algorithm relies on a convex quadratically constrained quadratic program. We also propose a parallel implementation, which leverages ADMM, that lessens the overall computational complexity to a tight Opn2q for n observations. Numerical results support our findings.

U2 - 10.23919/Eusipco47968.2020.9287715

DO - 10.23919/Eusipco47968.2020.9287715

M3 - Conference contribution

AN - SCOPUS:85099297721

T3 - European Signal Processing Conference

SP - 2130

EP - 2134

BT - 28th European Signal Processing Conference, EUSIPCO 2020 - Proceedings

PB - European Signal Processing Conference, EUSIPCO

T2 - 28th European Signal Processing Conference, EUSIPCO 2020

Y2 - 24 August 2020 through 28 August 2020

ER -

Smooth strongly convex regression

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