Aaron Berger

Aaron Berger

Massachusetts Institute of Technology

H-index: 5

North America-United States

About Aaron Berger

Aaron Berger, With an exceptional h-index of 5 and a recent h-index of 4 (since 2020), a distinguished researcher at Massachusetts Institute of Technology, specializes in the field of Combinatorics.

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

Non-classical polynomials and the inverse theorem

Popular differences for matrix patterns

Popular differences for corners in abelian groups

On anti-powers in aperiodic recurrent words

Aaron Berger Information

University

Massachusetts Institute of Technology

Position

___

Citations(all)

51

Citations(since 2020)

46

Cited By

19

hIndex(all)

5

hIndex(since 2020)

4

i10Index(all)

1

i10Index(since 2020)

1

Email

University Profile Page

Massachusetts Institute of Technology

Aaron Berger Skills & Research Interests

Combinatorics

Top articles of Aaron Berger

Title

Journal

Author(s)

Publication Date

Non-classical polynomials and the inverse theorem

Mathematical Proceedings of the Cambridge Philosophical Society

Aaron Berger

Ashwin Sah

Mehtaab Sawhney

Jonathan Tidor

2022/11

Popular differences for matrix patterns

Transactions of the American Mathematical Society

Aaron Berger

Ashwin Sah

Mehtaab Sawhney

Jonathan Tidor

2022/4

Popular differences for corners in abelian groups

Mathematical Proceedings of the Cambridge Philosophical Society

Aaron Berger

2021/7

On anti-powers in aperiodic recurrent words

Advances in Applied Mathematics

Aaron Berger

Colin Defant

2020/10/1

See List of Professors in Aaron Berger University(Massachusetts Institute of Technology)

Aaron Berger FAQs

What is Aaron Berger's h-index at Massachusetts Institute of Technology?

The h-index of Aaron Berger has been 4 since 2020 and 5 in total.

What are Aaron Berger's top articles?

The articles with the titles of

Non-classical polynomials and the inverse theorem

Popular differences for matrix patterns

Popular differences for corners in abelian groups

On anti-powers in aperiodic recurrent words

are the top articles of Aaron Berger at Massachusetts Institute of Technology.

What are Aaron Berger's research interests?

The research interests of Aaron Berger are: Combinatorics

What is Aaron Berger's total number of citations?

Aaron Berger has 51 citations in total.