Preface. Volume 8

Hajo Broersma, Ulrich Faigle, Johann Hurink, Stefan Pickl

Research output: Contribution to journalArticleAcademicpeer-review

Abstract

This volume collects the extended abstracts of the 36 contributions that have been selected for presentation at the. 1st CologneTwenteWorkshop on Graphs and Combinatorial Optimization. 6-8 June, 2001. Center of Applied Computer Science. University of Cologne. Cologne, Germany. The CologneTwenteWorkshop on graphs and combinatorial optimization is organized biennially at the Department of Mathematics at the University of Cologne and at the Faculty of Mathematical Sciences at the University of Twente. There are no "main speakers" and young researchers are particularly encouraged to discuss their work on algorithmic as well as structural aspects of graphs and combinatorial optimization problems. As this volume demonstrates, research in this area is lively and successful. The local organizers want to thank the members of the programming committee. J. Fonlupt (Paris). M. Jünger (Cologne). H.J. Prömel (Berlin). C. Thomassen (Copenhagen). G. Woeginger (Graz). for their help in setting up such an attractive program. An additional special volume of Discrete Applied Mathematics devoted to the 1st CologneTwenteWorkshop will be prepared. This volume will contain full-length versions of presentations at and results of the workshop as well as other contributions relating to the topics of the workshop. Details can be obtained from the local organizers and the webpage. www.zpr.uni-koeln.de/AFS/conferences/CTW2001/CTW2001.html. http://www.zpr.uni-koeln.de/AFS/conferences/CTW2001/CTW2001.html. Cologne, May 2001.

Original languageEnglish
Number of pages1
JournalElectronic notes in discrete mathematics
Volume8
DOIs
Publication statusPublished - 1 Jan 2001
Event1st Cologne-Twente Workshop on Graphs and Combinatorial Optimization, CTW 2001 - University of Cologne, Cologne, Germany
Duration: 6 Jun 20018 Jun 2001
Conference number: 1

Fingerprint Dive into the research topics of 'Preface. Volume 8'. Together they form a unique fingerprint.

Cite this