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Martin Hasenbusch

About Martin Hasenbusch

Martin Hasenbusch, With an exceptional h-index of 49 and a recent h-index of 20 (since 2020), a distinguished researcher at Ruprecht-Karls-Universität Heidelberg, specializes in the field of statistical physics, lattice field theory.

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

lattice model with cubic symmetry in three dimensions: Renormalization group flow and first-order phase transitions

The lattice model with cubic symmetry in three dimensions: RG-flow and first order phase transitions

Cubic fixed point in three dimensions: Monte Carlo simulations of the model on the simple cubic lattice

Three-dimensional -invariant models at criticality for

Restoring isotropy in a three-dimensional lattice model: The Ising universality class

Two- and three-point functions at criticality: Monte Carlo simulations of the three-dimensional -state clock model

Monte Carlo study of a generalized icosahedral model on the simple cubic lattice

Dynamic critical exponent of the three-dimensional Ising universality class: Monte Carlo simulations of the improved Blume-Capel model

Martin Hasenbusch Information

University

Position

Post-Doc Institut fuer theoretische Physik

Citations(all)

7704

Citations(since 2020)

1770

Cited By

6622

hIndex(all)

49

hIndex(since 2020)

20

i10Index(all)

108

i10Index(since 2020)

50

Email

University Profile Page

Google Scholar

Martin Hasenbusch Skills & Research Interests

statistical physics

lattice field theory

Top articles of Martin Hasenbusch

Title

Journal

Author(s)

Publication Date

lattice model with cubic symmetry in three dimensions: Renormalization group flow and first-order phase transitions

Physical Review B

Martin Hasenbusch

2024/2/15

The lattice model with cubic symmetry in three dimensions: RG-flow and first order phase transitions

arXiv preprint arXiv:2307.05165

Martin Hasenbusch

2023/7/11

Cubic fixed point in three dimensions: Monte Carlo simulations of the model on the simple cubic lattice

Physical Review B

Martin Hasenbusch

2023/1/10

Three-dimensional -invariant models at criticality for

Physical Review B

Martin Hasenbusch

2022/2/24

Restoring isotropy in a three-dimensional lattice model: The Ising universality class

Physical Review B

Martin Hasenbusch

2021/7/26

Two- and three-point functions at criticality: Monte Carlo simulations of the three-dimensional -state clock model

Physical Review B

Martin Hasenbusch

2020/12/21

Monte Carlo study of a generalized icosahedral model on the simple cubic lattice

Physical Review B

Martin Hasenbusch

2020/7/6

Dynamic critical exponent of the three-dimensional Ising universality class: Monte Carlo simulations of the improved Blume-Capel model

Physical Review E

Martin Hasenbusch

2020/2/24

See List of Professors in Martin Hasenbusch University(Ruprecht-Karls-Universität Heidelberg)