ProfessorsProfessors of Massachusetts Institute of TechnologyGil Kur

Gil Kur

Massachusetts Institute of Technology

H-index: 8

North America-United States

About Gil Kur

Gil Kur, With an exceptional h-index of 8 and a recent h-index of 8 (since 2020), a distinguished researcher at Massachusetts Institute of Technology, specializes in the field of Nonparametric statistics, high dimensional statistics, convex geometry, learning theory.

His recent articles reflect a diverse array of research interests and contributions to the field:

Debiased LASSO under Poisson-Gauss Model

On the Variance, Admissibility, and Stability of Empirical Risk Minimization

Tyler’s and Maronna’s M-estimators: Non-asymptotic concentration results

On The Performance Of The Maximum Likelihood Over Large Models

A bounded-noise mechanism for differential privacy

An Efficient Minimax Optimal Estimator For Multivariate Convex Regression

Intrinsic and dual volume deviations of convex bodies and polytopes

On the minimal error of empirical risk minimization

Gil Kur Information

University	Massachusetts Institute of Technology
Position	PhD student
Citations(all)	205
Citations(since 2020)	203
Cited By	67
hIndex(all)	8
hIndex(since 2020)	8
i10Index(all)	7
i10Index(since 2020)	7
Email	Access Email
University Profile Page	Massachusetts Institute of Technology
Google Scholar	View Google Scholar Profile

Gil Kur Skills & Research Interests

Nonparametric statistics

high dimensional statistics

convex geometry

learning theory

Top articles of Gil Kur

Title	Journal	Author(s)	Publication Date
Debiased LASSO under Poisson-Gauss Model	arXiv preprint arXiv:2402.16764	Pedro Abdalla Gil Kur	2024/2/26
On the Variance, Admissibility, and Stability of Empirical Risk Minimization	Advances in Neural Information Processing Systems	Gil Kur Eli Putterman Alexander Rakhlin	2024/2/13
Tyler’s and Maronna’s M-estimators: Non-asymptotic concentration results	Journal of Multivariate Analysis	Elad Romanov Gil Kur Boaz Nadler	2023/7/1
On The Performance Of The Maximum Likelihood Over Large Models		Gil Kur	2023
A bounded-noise mechanism for differential privacy		Yuval Dagan Gil Kur	2022/6/28
An Efficient Minimax Optimal Estimator For Multivariate Convex Regression		Gil Kur Eli Putterman	2022/6/28
Intrinsic and dual volume deviations of convex bodies and polytopes	International Mathematics Research Notices	Florian Besau Steven Hoehner Gil Kur	2021/11
On the minimal error of empirical risk minimization		Gil Kur Alexander Rakhlin	2021/7/21
A concentration inequality for random polytopes, Dirichlet–Voronoi tiling numbers and the geometric balls and bins problem	Discrete & Computational Geometry	Steven Hoehner Gil Kur	2021/4
Convex regression in multidimensions: Suboptimality of least squares estimators	arXiv preprint arXiv:2006.02044	Gil Kur Fuchang Gao Adityanand Guntuboyina Bodhisattva Sen	2020/6/3
On suboptimality of least squares with application to estimation of convex bodies		Gil Kur Alexander Rakhlin Adityanand Guntuboyina	2020/7/15