Piloty

The Meeting

The mathematical study of random geometric graphs is an active subject in probability with
many real world applications. The aim of this school is to introduce PhD students and young
post-docs to some recent developments in this field. The core of the school consists of
two mini courses, each consisting of five 90-minute lectures by


Peter Mörters (Köln): Scale-free random geometric graphs

Mathew Penrose (Bath): Connectivity and components of random Euclidean graphs.


There will also be some invited talks in the general topic area of the school. In addition,
participants, in particular PhD students, are encouraged to deliver short talks of 10min to
introduce themselves and their research interests.



Confirmed speakers

Steffen Dereich
Münster
Christian Döbler
Düsseldorf
Benedikt Jahnel
WIAS Berlin
Christian Hirsch
Aarhus
Peter Mörters
Köln
Mathew Penrose
Bath

Target Audience

The spring school is primarily aimed at PhD studens and postdocs, but everybody
is welcome to attend. Participants will be given the opportunity to deliver contributed talks.

Previous schools

The school is a continuation of the Spring schools

"Complex Networks" March 2-6, 2020
"Selected topics in stochastic geometry " February 25 - March 1, 2019
"Spin Systems: Discrete and Continuous " March 19-23, 2018
"Probability in mathematics and physics " March 27-31, 2017
"Geometric models in probability" April 4 - 8, 2016
"Stochastic Analysis of Spatially Extended Models" March 23 - 27, 2015
"Spatial Models in Statistical Mechanics" February 24 - 28, 2014

held at TU Darmstadt.


Covid regulations

The event will take place under a 2G+ regulation. I.e. either
- a booster vaccination or
- [(double) vaccination or recent recovery (within the last 6 months)] and a daily updated test
is required.
This is possibly additional to any hygiene and safety rules in force by law at the time
of the school.


Organizers

Frank Aurzada (Darmstadt)
Volker Betz (Darmstadt)
Matthias Meiners (Gießen)

Sponsor

DFG Priority Programme
SPP 2265: Random geometric systems

SPP 2265