We would like to announce that we are going to organize Workshop "Graph Theory for Combinatorial Reconfiguration" via Zoom on November 29 (based on European
Timezone).
A basic idea is to share fundamental concepts in graph theory that can be potentially applied for combinatorial reconfiguration problems and identify future
research directions. In graph theory, combinatorial reconfiguration has been widely used; Reduction of graphs such as deletion and contraction of edges in graph
minors; Kempe chains in graph coloring, which give important insights to a proof of the Four Color Theorem; and Diagonal flips of triangulations. This workshop
aims at the broad audience of discrete mathematics and theoretical computer science, who wish to learn and work on this active research area.
We have six invited speakers:
Maria Chudnovsky (Princeton University, USA)
Zdeněk Dvořák (Charles University, Czech Republic)
Tomáš Kaiser (University of West Bohemia, Czech Republic)
Atsuhiro Nakamoto (Yokohama National University, Japan)
Jakub Przybyło (AGH University of Science and Technology, Poland)
Zi-Xia Song (University of Central Florida, USA)
Registration is free of charge, but please make your registration in advance through the following link.
https://uec-tokyo.zoom.us/meeting/register/tJAuduuoqzojGNbnXzClGdFZBXXVrA74BMXE
You can find the detail in the following link.
http://www.dais.is.tohoku.ac.jp/gtcore.html
We look forward to meet you in the workshop.
Sincerely yours,
Organizers,
Shun-ichi Maezawa
Kenta Ozeki
--
Yoshio Okamoto, Prof. <okamotoy@uec.ac.jp>
Dept. of Computer and Network Engineering
University of Electro-Communications
Chofugaoka 1-5-1, Chofu, Tokyo 182-8585
**********************************************************
*
* 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/
*
**********************************************************
Posts
