ProfessorsProfessors of Bar-Ilan UniversityNaomi Dvora Feldheim

Naomi Dvora Feldheim

Bar-Ilan University

H-index: 7

Asia-Israel

About Naomi Dvora Feldheim

Naomi Dvora Feldheim, With an exceptional h-index of 7 and a recent h-index of 6 (since 2020), a distinguished researcher at Bar-Ilan University, specializes in the field of Probability, Analysis.

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

An asymptotic formula for the variance of the number of zeroes of a stationary Gaussian process

Typical Height of the (2+ 1)-D Solid-on-Solid surface with pinning above a wall in the delocalized phase

Efficient computation of the zeros of the Bargmann transform under additive white noise

Persistence of Gaussian stationary processes: a spectral perspective

Persistence and Ball Exponents for Gaussian Stationary Processes

Mean and minimum of independent random variables

On the probability that a stationary Gaussian process with spectral gap remains non-negative on a long interval

Exponential concentration for zeroes of stationary Gaussian processes

Naomi Dvora Feldheim Information

University	Bar-Ilan University
Position	___
Citations(all)	139
Citations(since 2020)	98
Cited By	92
hIndex(all)	7
hIndex(since 2020)	6
i10Index(all)	6
i10Index(since 2020)	5
Email	Access Email
University Profile Page	Bar-Ilan University
Google Scholar	View Google Scholar Profile

Naomi Dvora Feldheim Skills & Research Interests

Probability

Analysis

Top articles of Naomi Dvora Feldheim

Title	Journal	Author(s)	Publication Date
An asymptotic formula for the variance of the number of zeroes of a stationary Gaussian process	Probability Theory and Related Fields	Eran Assaf Jeremiah Buckley Naomi Feldheim	2023/12
Typical Height of the (2+ 1)-D Solid-on-Solid surface with pinning above a wall in the delocalized phase	arXiv preprint arXiv:2301.09197	Naomi Feldheim Shangjie Yang	2023/1/22
Efficient computation of the zeros of the Bargmann transform under additive white noise	Foundations of Computational Mathematics	Luis Alberto Escudero Naomi Feldheim Günther Koliander José Luis Romero	2022/9/27
Persistence of Gaussian stationary processes: a spectral perspective	Annals of Probability	Naomi Feldheim Ohad Feldheim Shahaf Nitzan	2021
Persistence and Ball Exponents for Gaussian Stationary Processes	arXiv preprint arXiv:2112.04820	Naomi Feldheim Ohad Feldheim Sumit Mukherjee	2021/12/9
Mean and minimum of independent random variables	Israel Journal of Mathematics	Naomi Dvora Feldheim Ohad Noy Feldheim	2021/9/1
On the probability that a stationary Gaussian process with spectral gap remains non-negative on a long interval	International Mathematics Research Notices	Naomi Feldheim Ohad Feldheim Benjamin Jaye Fedor Nazarov Shahaf Nitzan	2020/11
Exponential concentration for zeroes of stationary Gaussian processes	International Mathematics Research Notices	Riddhipratim Basu Amir Dembo Naomi Feldheim Ofer Zeitouni	2020/11
Convergence of the quantile admission process with veto power	Stochastic Processes and their Applications	Naomi Dvora Feldheim Ohad Noy Feldheim	2020/7/1