Are there any good references (either books or on-line) on the subject of the distribution of various cycle properties amongst permutations, particularly ones containing exact, closed-forms?

For example, what is the probability that a random permutation of *N* objects contains some cycle having length between *A* and *B*? Or, what is the probability that all cycles in a random permutation of *N* objects have lengths between *A* and *B*?

I would be particularly interested in references that survey what is known in this field, preferably with a little detail.

Thanks.