# Generate a sequence of all permutation of some range of numbers

The following algorithm is given and we are supposed to write it out in java. However, when I try to understand line by line, it gets confusing, especially the part:

A[k+1:N-1] = the values in S in ascending order

To my understand, the set only have 1 number at anytime. How can we replace A[k+1:N-1] when the set only has 1 number?

Let A be a sequence of integers 0 to N-1 in ascending order (let's assume its an array of int[N]).

next_permutation(A):
k = N-1
S = { }
while k >= 0:
if S contains a value larger than A[k]:
v = the smallest member of S that is larger than A[k]
remove v from S
insert A[k] in S
A[k] = v
A[k+1:N-1] = the values in S in ascending order.
return true
else:
insert A[k] in S
k -= 1
return false

-
Why do you think S always contains one number? –  templatetypedef Oct 17 '13 at 1:24
Let's say N is 4. It starts with nothing, so first loop will add 3 to the set. Second loop will replace 3 by 2, and then so on. –  Iann Wu Oct 17 '13 at 1:26
But what if the value in A[k] is smaller than A[k-1]? In this case, on the first iteration A[k] is added and k is set to k - 1. Then on the second iteration, S doesn't contain anything larger than A[k] (since k is different), so another element is added. –  templatetypedef Oct 17 '13 at 1:36
Oh seems like I've missed that post-permutation outcome. Let me work it out on paper again first! –  Iann Wu Oct 17 '13 at 1:42
@templatetypedef Any clue on how I can replace items in an array by values in a set in ascending order? e.g. A[k+1:N-1] = the values in S in ascending order. Should I use toArray()? –  Iann Wu Oct 20 '13 at 0:50

This is not needed. You can try to keep the S array sorted all the time. Every time you want to insert a new number in the array, you insert it in such, so the array could stay sorted. For example, if you have S = [5 7 8] so far and you want to insert 6, you inserted between 5 and 7 - S = [5 6 7 8]. This way the replacement step is just copying the elements from S to A[k+1:N-1].