# Applying transformation of `GatherBy` to a different list

I have `listA` and `listB` of the same size. I'm doing `GatherBy` on `listA`, which rearranges that list. What is an elegant way to apply identical rearrangement to `listB`?

For example

``````listA = {1, 2, 3};
listB = {a, b, c};
listA1 = GatherBy[{1, 2, 3}, OddQ];
``````

`listB1` should become `{{a, c}, {b}}`

Update Thanks for interesting ideas, I eventually ended up doing something similar to belisarius. This reminds me of Python's "decorate-sort-undecorate" pattern

``````decorated = Thread[{listA, listB}];
grouped = GatherBy[decorated, OddQ[First[#]] &];
listB1 = Map[Last, grouped, {2}]
``````
-
For really large lists, `grouped[[All, All, -1]]` may be faster or much faster than using `Map` (not sure if this is relevant for your case) –  Leonid Shifrin Feb 12 '11 at 21:49

Well, first second try:

(Warning Warning ... "elegance" is an utterly subjective concept)

``````gBoth[lslave_, lmaster_, f_] :=
{Part[#, All, All, 1], Part[#, All, All, 2]} &@
GatherBy[Transpose[{lslave, lmaster}], f[#[[2]]] &]

lmaster = {1, 2, 3};
lslave = {a, b, c};

{lslave1, lmaster1} = gBoth[lslave, lmaster, OddQ]
``````

Out

``````{{{a, c}, {b}}, {{1, 3}, {2}}}
``````

Edit

Note that for this code to run you must have

`````` Dimensions[lslave][[1;;Length[Dimensions@lmaster]]] == Dimensions@lmaster
``````

but the deeper internal structure of both lists could be different. For example:

``````lmaster = {{1, 2, 3}, {2, 3, 4}};
lslave = {{{a}, {b}, {c}}, {{a}, {b}, {c}}};

{lslave1, lmaster1} = gBoth[lslave, lmaster, #[[1]] < 3 &]
``````

Out

``````{{{{{a}, {b}, {c}}, {{a}, {b}, {c}}}}, {{{1, 2, 3}, {2, 3, 4}}}}
``````

HTH!

-

``````Map[listB[[#]] &, listA1 /. Dispatch@Thread[listA -> Range[Length[listA]]]]
``````

Edit : It actually came to my mind that this solution will have problems if `listA` has repeated elements.Besides, it uses the specialized knowledge that the resulting list is of constant depth 2. Here is a more general (admittedly, ugly) version, which does not care what is the resulting list structure, or whether the original list did have repeated elements :

``````Clear[rearrangeAs];
rearrangeAs[source_List, transformed_List, target_List] :=
Module[{f, count, symbs = Table[Unique[], {Length[source]}]},
count[_] = 0;
f[x_, _] := x;
MapThread[With[{cnt = ++count[#1]}, f[#1, cnt] := #2] &, {source, symbs}];
Clear[count];
count[_] = 0;
Replace[transformed, x_ :> f[x, ++count[x]], {0, Infinity}] /.
``````

For example,

``````In[94] := rearrangeAs[listA, listA1, listB]

Out[94] = {{a, c}, {b}}
``````

I did not test, but this function should also work when the transformed list does not have a regular structure, but is some general tree

-

You essentially want:

``````Map[listB[[#]] &, listA1]
``````

Since ListB[[{1,3,5}]] for example gives a list of the first, third, and fifth elements of ListB.

So this a very simple version of the function:

``````example[listA_, listB_, ordering_] :=
Map[listB[[#]] &, GatherBy[listA, ordering]]
``````

Its important to note that if a number is duplicated in ListA then it won't appear because of the behavior of GatherBy:

``````example[{1, 2, 3, 4, 5, 6, 3, 5}, {a, b, c, d, e, f, g, h}, OddQ]

{{a, c, e, c, e}, {b, d, f}}
``````
-
example[{{1, 3}, {2, 3, 4}, {1, 2}}, {a, b, c}, Length] seems not working –  belisarius Jan 27 '11 at 0:20
Yeah my function is really really simple for simple cases. ListA has to be Range[Length[listB]] so it has limited useability. Sorry, should have mentioned. –  Searke Jan 27 '11 at 0:51