The problem was not what I wrote way below: Obviously with a finite number of groups of order n, one can easily pick one "at random". But how about the subgroups? Are we picking one from *all* subgroups, including all those conjugate to one subgroup? That method will tend to decrease the probability of a normal subgroup, since every *other* subgroup will get counted once for each of its conjugates but a normal subgroup has only one conjugate. On the other hand, picking just one subgroup from each conjugacy class will increase the probability of a normal subgroup. So: What is the probability measure being considered? —Dan -----
(That is, for large n, if you pick a group G of order n uniformly at random, and then pick a subgroup H of G uniformly at random, the probability that H is a normal subgroup of G goes to 0 as n goes to infinity.)
Jim Propp wrote: ----- for large n, if you pick a group G of order n uniformly at random -----
I wonder how to define a probability on groups of order n.
And in particular: If there are several ways to do this, do they result in the same probabilities?
—Dan
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