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Mohamed Slim Kammoun

About Mohamed Slim Kammoun

Mohamed Slim Kammoun, With an exceptional h-index of 3 and a recent h-index of 3 (since 2020), a distinguished researcher at Lancaster University, specializes in the field of Random permutations, Random matrices, Probability.

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

Asymptotic normality of pattern counts in conjugacy classes

A new perspective on positivity in (consecutive) permutation patterns

About universality of large deviation principles for conjugacy invariant permutations

Estimation of large covariance matrices via free deconvolution: computational and statistical aspects

A note on monotone subsequences and the RS image of invariant random permutations with macroscopic number of fixed points

Universality for random permutations and some other groups

Small cycle structure for words in conjugation invariant random permutations

Universalité pour les permutations aléatoires

Mohamed Slim Kammoun Information

University

Position

___

Citations(all)

38

Citations(since 2020)

38

Cited By

7

hIndex(all)

3

hIndex(since 2020)

3

i10Index(all)

2

i10Index(since 2020)

2

Email

University Profile Page

Google Scholar

Mohamed Slim Kammoun Skills & Research Interests

Random permutations

Random matrices

Probability

Top articles of Mohamed Slim Kammoun

Asymptotic normality of pattern counts in conjugacy classes

Electronic Journal of Probability

2024

Valentin Féray
Valentin Féray

H-Index: 15

Mohamed Slim Kammoun
Mohamed Slim Kammoun

H-Index: 1

A new perspective on positivity in (consecutive) permutation patterns

2023/2/14

About universality of large deviation principles for conjugacy invariant permutations

arXiv preprint arXiv:2312.00402

2023/12/1

Estimation of large covariance matrices via free deconvolution: computational and statistical aspects

arXiv preprint arXiv:2305.05646

2023/5/9

Mauricio Velasco
Mauricio Velasco

H-Index: 10

A note on monotone subsequences and the RS image of invariant random permutations with macroscopic number of fixed points

arXiv e-prints

2023/5

Mohamed Slim Kammoun
Mohamed Slim Kammoun

H-Index: 1

Universality for random permutations and some other groups

Stochastic Processes and their Applications

2022/5/1

Mohamed Slim Kammoun
Mohamed Slim Kammoun

H-Index: 1

Small cycle structure for words in conjugation invariant random permutations

Random Structures & Algorithms

2022/4

Mohamed Slim Kammoun
Mohamed Slim Kammoun

H-Index: 1

Universalité pour les permutations aléatoires

2020/10/22

Mohamed Slim Kammoun
Mohamed Slim Kammoun

H-Index: 1

On the longest common subsequence of conjugation invariant random permutations

The Electronic Journal of Combinatorics

2020/10/16

Mohamed Slim Kammoun
Mohamed Slim Kammoun

H-Index: 1

A product of invariant random permutations has the same small cycle structure as uniform

Electronic Communications in Probability

2020

Mohamed Slim Kammoun
Mohamed Slim Kammoun

H-Index: 1

See List of Professors in Mohamed Slim Kammoun University(Lancaster University)