I have a list of integers, for example `1,2,2,3,4,1`

. I need to be able to check for equivalence (==) between different lists.

However, I do not mean a simple number wise comparison. Each of these lists actually denotes a set partition, where the position in the list denotes the index of an element and the number denotes an index of the group. For example in the former, element 0 and element 5 are in the same group, element 1 and 2 are in the same group and element 3 and 4 are both in their own individual groups. **The actual index of the group is not important, only the grouping.**

I need to be able to test equivalence in this sense, so for example the previous list would be equivalent to `5,3,3,2,9,5,`

since they have the same grouping.

The way I have been doing this is reducing the array to a kind of normal form. I find all numbers having the same value as the first number, and set these all to 0. I then continue in the list until I find a new number, find all numbers of the same value is this and set them all to 1. I continue in this manner.

In my example, both numbers would reduce to would reduce down to `0,1,1,2,3,0`

and of course I can then just use a simple comparison to see if they are equivalent.

However this is quite slow, as I have to make several linear passes over the list. So to cut to the chase, **is there any more efficient manner of reducing these numbers to this normal form?**

Howver, more generally, **can I avoid this reduction all together and compare arrays in a different and perhaps more efficient manner**?

**Implementation details**

- These arrays are actually implemented as bitsets to save space, so I really do have to iterate over the whole list every time as there is no rb_tree esque hashing going on.
- Large numbers of these arrays will be stored in an stl unordered_set, hence the requirement for a hash should be taken into consideration