Intermediate scaling regimes for kinetic transport
Lead Research Organisation:
University of Bristol
Department Name: Mathematics
Abstract
The project seeks to establish diffusive and superdiffusive limit theorems for particle
transport in the Lorentz gas in the case of intermediate scaling limits for both random
and periodic scatterer configurations.
transport in the Lorentz gas in the case of intermediate scaling limits for both random
and periodic scatterer configurations.
Organisations
People |
ORCID iD |
Jens Marklof (Primary Supervisor) | |
Christopher Lutsko (Student) |
Publications
Lutsko C
(2021)
Invariance Principle for the Random Wind-Tree Process
in Annales Henri Poincaré
Lutsko C
(2020)
Invariance Principle for the Random Lorentz Gas-Beyond the Boltzmann-Grad Limit
in Communications in Mathematical Physics
Lutsko C
(2022)
Farey Sequences for Thin Groups
in International Mathematics Research Notices
Lutsko C
(2022)
Long-range correlations of sequences modulo 1
in Journal of Number Theory
LUTSKO C
(2020)
Directions in orbits of geometrically finite hyperbolic subgroups
in Mathematical Proceedings of the Cambridge Philosophical Society
Lutsko C
(2020)
Long-Range Correlations of Sequences Modulo 1
Lutsko C
(2019)
Farey Sequences for Thin Groups
Lutsko C
(2019)
Invariance Principle for the Random Wind-Tree Process
Studentship Projects
Project Reference | Relationship | Related To | Start | End | Student Name |
---|---|---|---|---|---|
EP/N509619/1 | 30/09/2016 | 29/09/2021 | |||
1793795 | Studentship | EP/N509619/1 | 30/09/2016 | 30/03/2020 | Christopher Lutsko |
Description | We have made significant progress in our understanding of diffusion in particle systems. Specifically the Lorentz gas. In so doing, we developed a new method using probabilistic coupling to introduce probabilistic techniques into the study of particle systems. Moreover, in a second project we have fully characterised the local statistics for orbits of thin groups. In doing so we extended methods from classical homogeneous dynamics to the thin group setting. |
Exploitation Route | It would be very interesting to apply the probabilistic methods developed by myself and Balint Toth to more systems. It is also possible that these methods could be extended to longer times and stronger results could be achieved for the classical systems we study. In addition the study of thin groups is a hot topic in modern mathematics. Applying homogeneous dynamics methods to that setting is an interesting prospect. This could further our understanding of fractals. |
Sectors | Other |
URL | https://chrislutsko.com/publications/ |