Think about the recursion as simply a number of levels. At each level, you are running a piece of code, here you are running a for loop n-i times at each level. this window gets decreasing at each level. n-i times, n-(i+1) times, n-(i+2) times,..2,1,0 times.

With respect to string manipulation and permutation, think of the string as simply a 'set' of chars. "abcd" as {'a', 'b', 'c', 'd'}. Permutation is rearranging these 4 items in all possible ways. Or as choosing 4 items out of these 4 items in different ways. In permutations the order does matter. abcd is different from acbd. we have to generate both.

The recursive code provided by you exactly does that. In my string above "abcd", your recursive code runs 4 iterations (levels). In the first iteration you have 4 elements to choose from. second iteration, you have 3 elements to choose from, third 2 elements, and so on. so your code runs 4! calculations. This is explained below

`First iteration`

:
choose a char from {a,b,c,d}

`Second Iteration`

:
choose a char from subtracted set {{a,b,c,d} - {x}} where x is the char chosen from first iteration. i.e. if 'a' has been choose in first iteration, this iteration has {b,c,d} to choose from.

`Third Iteration`

:
choose a char from subtracted set {{a,b,c,d} - {x,y}} where x and y are chosen chars from previous iterations. i.e. if 'a' is chosen at first iteration, and 'c' is chosen from 2nd, we have {b,d} to play with here.

This repeats until we choose 4 chars overall. Once we choose 4 possible char, we print the chars. Then backtrack and choose a different char from the possible set. i.e. when backtrack to Third iteration, we choose next from possible set {`b`

,d}. This way we are generating all possible permutations of the given string.

We are doing this set manipulations so that we are not selecting the same chars twice. i.e. abcc, abbc, abbd,bbbb are invalid.

The swap statement in your code does this set construction. It splits the string into two sets `free set`

to choose from `used set`

that are already used. All chars on left side of `i+1`

is `used set`

and right are `free set`

. In first iteration, you are choosing among {a,b,c,d} and then passing {a}:{b,c,d} to next iteration. The next iteration chooses one of {b,c,d} and passes {a,b}:{c,d} to next iteration, and so on. When the control backtracks back to this iteration, you will then choose `c`

and construct {a,c}, {b,d} using swapping.

That's the concept. Otherwise, the recursion is simple here running n deep and each level running a loop for n, n-1, n-2, n-3...2,1 times.