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Alexander Zass

About Alexander Zass

Alexander Zass, With an exceptional h-index of 3 and a recent h-index of 3 (since 2020), a distinguished researcher at Universität Potsdam, specializes in the field of Probability theory, Gibbs point process theory, Interacting particle systems.

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

Diffusion dynamics for an infinite system of two-type spheres and the associated depletion effect

Off-diagonal long-range order for the free Bose gas via the Feynman--Kac formula

Locality properties for discrete and continuum Widom--Rowlinson models in random environments

Correction to: Marked Gibbs Point Processes with Unbounded Interaction: An Existence Result

An explicit Dobrushin uniqueness region for Gibbs point processes with repulsive interactions

Gibbs point processes on path space: existence, cluster expansion and uniqueness

A multifaceted study of marked Gibbs point processes

Marked Gibbs point processes with unbounded interaction: an existence result

Alexander Zass Information

University

Position

PhD student

Citations(all)

18

Citations(since 2020)

18

Cited By

4

hIndex(all)

3

hIndex(since 2020)

3

i10Index(all)

0

i10Index(since 2020)

0

Email

University Profile Page

Google Scholar

Alexander Zass Skills & Research Interests

Probability theory

Gibbs point process theory

Interacting particle systems

Top articles of Alexander Zass

Diffusion dynamics for an infinite system of two-type spheres and the associated depletion effect

Stochastic Processes and their Applications

2024/2/23

Alexander Zass
Alexander Zass

H-Index: 1

Off-diagonal long-range order for the free Bose gas via the Feynman--Kac formula

arXiv preprint arXiv:2312.07481

2023/12/12

Wolfgang König
Wolfgang König

H-Index: 4

Alexander Zass
Alexander Zass

H-Index: 1

Locality properties for discrete and continuum Widom--Rowlinson models in random environments

arXiv preprint arXiv:2311.07146

2023/11/13

Alexander Zass
Alexander Zass

H-Index: 1

Correction to: Marked Gibbs Point Processes with Unbounded Interaction: An Existence Result

Journal of Statistical Physics

2022/10

Alexander Zass
Alexander Zass

H-Index: 1

An explicit Dobrushin uniqueness region for Gibbs point processes with repulsive interactions

Journal of Applied Probability

2022/6

Alexander Zass
Alexander Zass

H-Index: 1

Gibbs point processes on path space: existence, cluster expansion and uniqueness

Markov Processes and Related Fields

2022

Alexander Zass
Alexander Zass

H-Index: 1

A multifaceted study of marked Gibbs point processes

2021

Alexander Zass
Alexander Zass

H-Index: 1

Marked Gibbs point processes with unbounded interaction: an existence result

JOURNAL OF STATISTICAL PHYSICS

2022/10/1

Sylvie Roelly
Sylvie Roelly

H-Index: 11

Alexander Zass
Alexander Zass

H-Index: 1

A Gibbs point process of diffusions: Existence and uniqueness

2020

Alexander Zass
Alexander Zass

H-Index: 1

See List of Professors in Alexander Zass University(Universität Potsdam)