Ordering@Ordering and Ranking Permutations

As pointed out by nazdrovje (see here) `Ordering@Ordering` may be used to obtain the rank of each element in a list. Even when the list contains repeated elements the result is an n-permutation (taken as an ordered list of integers 1 to n without repetition), where the lowest ranked element is assigned 1, the second lowest 2, etc. As pointed out by Andrzej Kozlowski, the following holds (see also here):

``````(Sort@mylist)[[Ordering@Ordering@mylist]]==mylist
``````

I'd like to produce a ranking permutation where the highest ranked element is assigned 1, the second highest 2, etc. such that the following holds:

``````(Reverse@Sort@mylist)[[newPermutation]]==mylist
``````

This seems simple, but I have only been able to come up with quite an awkward solution. At the moment I do the following:

``````newPermutation= Ordering@Ordering[Ordering@Ordering@mylist,All,Greater]
``````

Is there a more elegant,or more intuitive, way? There surely must be?

An example:

``````mylist= {\[Pi],"abc",40,1, 300, 3.2,1};

Ordering@Ordering@mylist

Ordering@Ordering[Ordering@Ordering@mylist,All,Greater]
``````

Output (note the reciprocal relationship between the permutations)

``````{7,6,4,1,5,3,2}
{1,2,4,7,3,5,6}
``````

(Both the following evaluate to True)

``````Sort@mylist)[[Ordering@Ordering@mylist]]== mylist
Reverse@Sort@mylist)[[ Ordering@Ordering[Ordering@Ordering@mylist,All,Greater]]]== mylist
``````
-

If you set

`````` oldPerm = Ordering@Ordering@mylist
``````

then

`````` newPerm = - oldPerm + Length@mylist + 1
``````

and

``````(Reverse@Sort@mylist)[[newPerm]]==mylist
``````

is `True`

So, you may define

``````newPerm[x_] := 1 + Length@x - Ordering@Ordering@x
``````

Such as

``````(Reverse@Sort@mylist)[[newPerm[mylist]]] == mylist
``````

is `True`

-
That is very nice! Thank you. I was debating whether or not to post the question as I did have a solution of sorts. I am very glad I did now. –  TomD Jan 20 '11 at 11:05
@TomD In Mma there is always another way, and sometimes one just can't find the easiest. The community here is very helpful with this kind of problems. Glad to help! –  belisarius Jan 20 '11 at 11:22