Project Details
Projekt
Permutation groups where non-trivial elements have few fixed points
Subject Area
Mathematics
Term
from 2013 to 2015
Project identifier
Deutsche Forschungsgemeinschaft (DFG) - Project number 251621688
During the first phase of our cooperation Kay Magaard and I produced a few good results and some more precise questions emerged that we plan to answer in 2014.The basis of our project is a result of Schoeneberg's. It says that all fixed points of a non-trivial automorphism of an algebraic curve that fixes at least five points is a Weierstrass point.With this theorem in mind, Kay Magaard and I started to investigate permutation groups where every non-trivial element has few fixed points, hence being an obstruction to finding Weierstrass points with Schoeneberg's result. It is our aim to understand the structure of such groups and to classify the simple groups with this property completely.
DFG Programme
Research Grants
International Connection
United Kingdom
Participating Person
Professor Dr. Kay Magaard
