Wednesday, January 30, 2019

[DMANET] Summer school on random graphs, random walks, Nice July 8-19

The Nice Summer School on Markov chains, random walks, random graphs and
its applications to complex networks will be held in Nice (France)
from July 8-19, 2019. One of the two courses focusses on different models
of random graphs (model G(n,p), configuration model, preferential
attachment model, random graph processes, ...) together with techniques in
these models (switching techniques, differential equation method,...),
whereas the other course will focus on concepts and techniques related to
random walks and Markov chains (mixing times, hitting times, random
spanning trees, cutoff phenomena, ...).

The school is aimed at advanced master students, PhD students, or
researchers in an early stage of their career working in the broad field of
discrete probability and its applications.

Further details can be found at:
https://math.unice.fr/~dmitsche/Summerschool/Summerschool.html

Being a popular summer holiday destination, lodging in Nice in summer is
expensive. However, the school is supported by different sponsors:
Universite Cote d'Azur, UCA Academie 1, Universite Nice, google, PIMS.
Registration fees (including 2-week stay in a single bedroom close to the
university, lunches and coffee breaks during lecture days): 400 Euro.
Discounts for people without need for lodging. However, the number of
participants being limited, we might have to make a selection.

If you want to participate, send an email to dmitsche@gmail.com. Attach a
CV as well as a short motivation letter for your participation.

Deadline for registration: May 1, 2019. You will be informed shortly
afterwards whether your application was successful.

Best regards,
Dieter Mitsche

**********************************************************
*
* Contributions to be spread via DMANET are submitted to
*
* DMANET@zpr.uni-koeln.de
*
* Replies to a message carried on DMANET should NOT be
* addressed to DMANET but to the original sender. The
* original sender, however, is invited to prepare an
* update of the replies received and to communicate it
* via DMANET.
*
* DISCRETE MATHEMATICS AND ALGORITHMS NETWORK (DMANET)
* http://www.zaik.uni-koeln.de/AFS/publications/dmanet/
*
**********************************************************