Thanks for the info, David. I'd been looking at http://shell.cas.usf.edu/~eclark/algctlg/small_groups.html
which appears quite similar. I believe I've got a permutation representation of the dicyclic group of order 4m in the symmetric group on m+4 symbols. But the group must have an element of order 4, so it won't build the KleinFourGroup when m=1. I may be tempted to do some more work on permgroup_named.py once I'm done with this - thanks for all your work getting those constructions together. Rob --~--~---------~--~----~------------~-------~--~----~ To post to this group, send an email to sage-devel@googlegroups.com To unsubscribe from this group, send an email to sage-devel-unsubscr...@googlegroups.com For more options, visit this group at http://groups.google.com/group/sage-devel URL: http://www.sagemath.org -~----------~----~----~----~------~----~------~--~---
