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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}]
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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

3 Answers 3

up vote 4 down vote accepted

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]  


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


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 &]


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


share|improve this answer

How about

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 :

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}];
    count[_] = 0;
    Replace[transformed, x_ :> f[x, ++count[x]], {0, Infinity}] /. 
       Dispatch[Thread[symbs -> target]]]

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

share|improve this answer

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}}
share|improve this answer
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

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