El sábado, 1 de marzo de 2014 18:27:12 UTC+1, Vishnu Agarwal escribió: > > @Burcin Thanks for replying > > I was going through the link that you have sent me, I couldn't find many > things on infinite group,but I have some ideas to handle some special cases > of infinite group. >
Look at the section on finitey generated groups. > Then we can move forward to rings(infinite),fields,ideals and other > algebraic structures that your organization has not done yet. > > Sage already includes plenty of inifinite rings, ideals and other algebraic structures. What do you mean exactly? > I have checked your documentation,from Cayley's theorem every finite group > is isomorphic to a subgroup of permutation group,I could'nt find a function > which returns this > subgroup of permutation group(I may be wrong) > it is the method .as_permutation_group() on finitely presented groups. > > Also every abelian group is direct product of some cyclic groups,So what > about a function which returns all the cyclic groups when an abelian group > is entered as an input > > It is the method .elementary_divisors() on abelian groups. > Please tell me your opinions about this.. > > -- You received this message because you are subscribed to the Google Groups "sage-gsoc" group. To unsubscribe from this group and stop receiving emails from it, send an email to [email protected]. To post to this group, send email to [email protected]. Visit this group at http://groups.google.com/group/sage-gsoc. For more options, visit https://groups.google.com/groups/opt_out.
