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How do I use Mathematica's Gather/Collect/Transpose functions to convert:

{ { {1, foo1}, {2, foo2}, {3, foo3} }, { {1, bar1}, {2, bar2}, {3, bar3} } } 

to

{ {1, foo1, bar1}, {2, foo2, bar2}, {3, foo3, bar3} } 

EDIT: Thanks! I was hoping there was a simple way, but I guess not!

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5  
IMHO the functional requirement could have been written somewhat better. Your example leaves much to be guessed. –  Sjoerd C. de Vries Aug 7 '11 at 20:38
    
Yes, please update the question to be more specific. Currently it is quite ambiguous. –  Mr.Wizard Aug 13 '11 at 14:17
    
barrycarter, I am still waiting for a clarified question. –  Mr.Wizard Oct 15 '11 at 8:06

7 Answers 7

up vote 7 down vote accepted

Here is your list:

tst = {{{1, foo1}, {2, foo2}, {3, foo3}}, {{1, bar1}, {2, bar2}, {3,  bar3}}}

Here is one way:

In[84]:= 
Flatten/@Transpose[{#[[All,1,1]],#[[All,All,2]]}]&@
  GatherBy[Flatten[tst,1],First]

Out[84]= {{1,foo1,bar1},{2,foo2,bar2},{3,foo3,bar3}}

EDIT

Here is a completely different version, just for fun:

In[106]:= 
With[{flat = Flatten[tst,1]},
   With[{rules = Dispatch[Rule@@@flat]},
       Map[{#}~Join~ReplaceList[#,rules]&,DeleteDuplicates[flat[[All,1]]]]]]

Out[106]= {{1,foo1,bar1},{2,foo2,bar2},{3,foo3,bar3}}

EDIT 2

And here is yet another way, using linked lists and inner function to accumulate the results:

In[113]:= 
Module[{f},f[x_]:={x};
  Apply[(f[#1] = {f[#1],#2})&,tst,{2}];
  Flatten/@Most[DownValues[f]][[All,2]]]

Out[113]= {{1,foo1,bar1},{2,foo2,bar2},{3,foo3,bar3}}

EDIT 3

Ok, for those who consider all of the above too complicated, here is a really simple rule - based solution:

In[149]:= 
GatherBy[Flatten[tst, 1], First] /. els : {{n_, _} ..} :> {n}~Join~els[[All, 2]]

Out[149]= {{1, foo1, bar1}, {2, foo2, bar2}, {3, foo3, bar3}}
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1  
In Edit 3, what does els : mean, or do? Is it a way to name the pattern that follows? –  David Carraher Aug 7 '11 at 20:07
    
@David Yep. reference.wolfram.com/mathematica/ref/Pattern.html –  belisarius Aug 7 '11 at 20:23
4  
@David: The standard x_ is actually short for x:_, but the former is so common that many people don't recognize the latter. Both are read "the pattern named x that matches Blank[]". –  Simon Aug 7 '11 at 22:29
    
@Simon Your explanation makes sense. Thanks. –  David Carraher Aug 7 '11 at 23:33

Perhaps easier:

tst = {{{1, foo1}, {2, foo2}, {3, foo3}}, {{1, bar1}, {2, bar2}, {3,  bar3}}};

GatherBy[Flatten[tst, 1], First] /. {{k_, n_}, {k_, m_}} -> {k, n, m}
(*
-> {{1, foo1, bar1}, {2, foo2, bar2}, {3, foo3, bar3}}
*)
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I did not see you solution until my last edit. I was thinking along the same lines, but the main problem that took me some time to figure out was to handle arbitrary number of terms in the sublists in the rule-based approach - yours only handles exactly two terms. –  Leonid Shifrin Aug 7 '11 at 19:17
    
@Leonid You are right, but I am not sure if such generalization is asked for in the question –  belisarius Aug 7 '11 at 19:22
    
You are right, it may not be. –  Leonid Shifrin Aug 7 '11 at 19:36
1  
+1 Clean, easy-to-understand code. Nice. –  David Carraher Aug 7 '11 at 20:09

MapThread

If the "foo" and "bar" sublists are guaranteed to be aligned with one another (as they are in the example) and if you will consider using functions other than Gather/Collect/Transpose, then MapThread will suffice:

data={{{1,foo1},{2,foo2},{3,foo3}},{{1,bar1},{2,bar2},{3,bar3}}};

MapThread[{#1[[1]], #1[[2]], #2[[2]]}&, data]

result:

{{1, foo1, bar1}, {2, foo2, bar2}, {3, foo3, bar3}}

Pattern Matching

If the lists are not aligned, you could also use straight pattern matching and replacement (although I wouldn't recommend this approach for large lists):

data //.
  {{h1___, {x_, foo__}, t1___}, {h2___, {x_, bar_}, t2___}} :>
  {{h1, {x, foo, bar}, t1}, {h2, t2}} // First

Sow/Reap

A more efficient approach for unaligned lists uses Sow and Reap:

Reap[Cases[data, {x_, y_} :> Sow[y, x], {2}], _, Prepend[#2, #1] &][[2]]
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I had the same idea, but was using Union instead of your pure function... –  Sjoerd C. de Vries Aug 7 '11 at 20:36

Here is how I would do it using the version of SelectEquivalents I posted in What is in your Mathematica tool bag?

l = {{{1, foo1}, {2, foo2}, {3, foo3}}, {{1, bar1}, {2, bar2}, {3, bar3}}};

SelectEquivalents[
   l
   ,
   MapLevel->2
   ,
   TagElement->(#[[1]]&)
   ,
   TransformElement->(#[[2]]&)
   ,
   TransformResults->(Join[{#1},#2]&)
]

This method is quite generic. I used to use functions such as GatherBy before for treating huge lists I generate in Monte-Carlo simulations. Now with SelectEquivalents implementations for such operations are much more intuitive. Plus it is based on the combination Reap and Sow which is very fast in Mathematica.

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Also just for fun ...

DeleteDuplicates /@ Flatten /@ GatherBy[Flatten[list, 1], First]

where

list = {{{1, foo1}, {2, foo2}, {3, foo3}}, {{1, bar1}, {2, bar2}, {3, 
    bar3}}}

Edit.

Some more fun ...

Gather[#][[All, 1]] & /@ Flatten /@ GatherBy[#, First] & @ 
 Flatten[list, 1]
share|improve this answer
    
That's pretty much exactly the code that I wrote... –  Simon Aug 7 '11 at 22:40
    
@Simon yes, that's the most direct way to do it. but where's the fun in that? :) –  acl Aug 8 '11 at 0:34
    
@Simon. I didn't see your code. I posted this just as WReach posted his answer. I thought about deleting it but decided to leave it there ... –  TomD Aug 8 '11 at 7:07
    
@TomD: I didn't post my code - since you beat me to it. So I upvoted your answer instead - leave it or my vote is wasted! –  Simon Aug 8 '11 at 11:18
    
@Simon Thanks! Upvotes are scarce of late (but I am learning a lot) :-) –  TomD Aug 8 '11 at 16:48

Maybe a bit overcomplicated, but:

lst = {{{1, foo1}, {2, foo2}, {3, foo3}}, {{1, bar1}, {2, bar2}, {3, bar3}}}

Map[
    Flatten,
    {Scan[Sow[#[[1]]] &,
                Flatten[lst, 1]] // Reap // Last // Last // DeleteDuplicates,
    Scan[Sow[#[[2]], #[[1]]] &,
            Flatten[lst, 1]] // Reap // Last} // Transpose
]
(*
{{1, foo1, bar1}, {2, foo2, bar2}, {3, foo3, bar3}}
*)

Here's how this works:

Scan[Sow[#[[1]]] &,
    Flatten[lst, 1]] // Reap // Last // Last // DeleteDuplicates

returns the unique first elements of each of your list items, in the order they were sown (since DeleteDuplicates never reorders elements). Then,

Scan[Sow[#[[2]], #[[1]]] &,
        Flatten[lst, 1]] // Reap // Last

exploits the fact that Reap returns expressions sown with difference tags in different lists. So then put them together, and transpose.

This has the disadvantage that we scan twice.

EDIT:

This

Map[
    Flatten,
    {DeleteDuplicates@#[[1]],
            Rest[#]} &@Last@Reap[
                Scan[(Sow[#[[1]]]; Sow[#[[2]], #[[1]]];) &,
                    Flatten[lst, 1]]] // Transpose
]

is (very) slightly faster, but is even less readable...

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Until the question is updated to be more clear and specific, I will assume what I want to, and suggest this:

UnsortedUnion @@@ #~Flatten~{2} &

See: UnsortedUnion

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1  
Welcome back mr.wizard. Had a good vacation? Did you see this question (stackoverflow.com/q/6505675/615464)? I think you'll like it ;-) –  Sjoerd C. de Vries Aug 13 '11 at 22:43
    
@Sjoerd Thanks, and yes. No, I had not. LOL! –  Mr.Wizard Aug 15 '11 at 21:05

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