Hi guys,
I finally found the solution that uses the Schreier-Sims algorithm. For whom wondering the answer, take a look at section 4 of the following article:
http://bkocay.cs.umanitoba.ca/g&g/articles/isomorphismprograms.pdf
Good Luck! :-)
Homework Statement
Hi everyone. I have just joined the community, and I really appreciate your help. Here is what I'm struggling with:
Assume a permutation group G generated by set S, i.e., G=<S>. Since S is given, we can easily find the orbit partition for G. Now assume the subgroup H of G...