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I have the following two lists

l1 = {{{2011, 3, 13}, 1}, {{2011, 3, 14}, 1}, {{2011, 3, 15}, 
    1}, {{2011, 3, 16}, 2}, {{2011, 3, 17}, 3}};
l2 = {{{2011, 3, 13}, 40}, {{2011, 3, 16}, 50}, {{2011, 3, 17}, 60}};

and I need to extract items from l2 whose date (the first element of each l2 element) matches dates in l1 (so as to produce two lists of exactly the same length)

I don't see why something like:

Select[l1, MemberQ[Transpose[l2][[1]], #[[1]]]]

should produce an empty list. Am I missing something trivial?

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1  
Although my response is correct and was first, Sjoerd spotted the issue in your code (the missing ampersand) and thus gave a better answer to your question, in my view. So feel free to change your selection. –  David Carraher Apr 20 '11 at 23:00
    
radrat, I agree with David. Sjoerd is the one who answered your actual question, and I feel that it deserves your Accept. I posted what I feel is the cleanest method, and I hope it is helpful, but replies like David's and mine are ancillary to the matter. –  Mr.Wizard Apr 25 '11 at 21:52

5 Answers 5

up vote 2 down vote accepted

Is this possibly what you have in mind?

dates=Transpose[l2][[1]];
Cases[l1, {x_, _} /; MemberQ[dates, x]]
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Hi David, that did it (actually with a small change: it should be l2 in the first line) , thanks for the prompt reply! I am still baffled as to why my approach is not working though –  radrat Apr 20 '11 at 22:15
    
@David Notice, that this solution also evaluates Transpose for every element of x. This can be seen by evaluating Cases[l1, {x_, _} /; MemberQ[Print[1]; Transpose[l2][[1]], x]]. There will be 5 numbers printed at execution. –  Sasha Apr 21 '11 at 0:17
    
Sasha is right, your new form is not equivalent the prior one, if that was your intention. You would need an Evaluate in there: Cases[l1, {x_, _} /; MemberQ[Evaluate[Transpose[l2][[1]]], x]] –  Mr.Wizard Apr 21 '11 at 0:25
    
@Sasha MemberQ seems to check each element in l1 separately. –  David Carraher Apr 21 '11 at 0:38
1  
@David But you should have included Print inside Evaluate. Then the argument of MemberQ would be evaluated and then resulting pattern will be used for every element of l1. This way you would evaluate Transpose once. Otherwise Condition, i.e. /; holds its arguments, and MemberQ with its arguments would only be evaluated after pattern matcher found x and this evaluation will be repeated for every match, i.e. for every element of l1 –  Sasha Apr 21 '11 at 2:39

You forgot the ampersand. It should be

Select[l1, MemberQ[Transpose[l2][[1]], #[[1]]]&]
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Nice and direct. +1 –  David Carraher Apr 20 '11 at 22:27
    
You may realize this, but this evaluates Transpose[l2][[1]] for every element of l1. It is better to use Select[l1, MemberQ[Evaluate[Transpose[l2][[1]]], #[[1]]]&] –  Sasha Apr 21 '11 at 0:00
    
gosh, how stupid of me :-| Cheers folks –  radrat Apr 21 '11 at 1:29
    
@Sash Yep, this seemed to me the only answer to the question what was wrong. Note that the OP didn't ask for an alternative, just an explanation why his own method didn't work. –  Sjoerd C. de Vries Apr 21 '11 at 5:56

Sjoerd shows you how to make your method work, but it is not optimal. The problem is that Transpose[l2][[1]] is evaluated again for every element in l1. David give a method which does that step only once. You could also use:

Cases[l1, {Alternatives @@ l2[[All, 1]], _}]
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1  
+1 Really nice. First time I've seen Alternatives Apply'd like that. –  David Carraher Apr 20 '11 at 23:23

A faster method for when your lists get bigger:

DeleteCases[GatherBy[Join[l1, l2], First], {_}][[All, 1]]

(*  Out= {{{2011, 3, 13}, 40}, {{2011, 3, 16}, 50}, {{2011, 3, 17}, 60}}  *)

If your list might contain duplicates, you can use the

l1 = GatherBy[l1, First][[All, 1]]

to remove the duplicates first.

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This does not produce the same result. –  Mr.Wizard Apr 21 '11 at 4:35
    
@Joshua Why not correct the typo using TomD's observation? –  David Carraher Apr 21 '11 at 12:23
    
The downvote on this answer is harsh –  TomD Apr 22 '11 at 18:33
    
I changed the Part spec to match. Thanks for catching that @TomD. –  Joshua Martell Apr 25 '11 at 17:19
    
@TomD I am sorry, but I do not see any declaration that the lists have no duplicates within the first elements, either in the question, or in this answer. Without that, this is not a solution. Consider: l1 = {{1, "a"}, {2, "b"}, {3, "c"}, {4, "d"}, {2, "x"}}; l2 = {{1, "q"}, {3, "r"}}; or: l1 = {{1, "a"}, {2, "b"}, {3, "c"}, {4, "d"}}; l2 = {{5, "q"}, {5, "r"}, {2, "s"}}; -- neither gives the correct result, in my opinion. –  Mr.Wizard Apr 25 '11 at 21:41

Here is my non-sorting intersection code:

NonSortingIntersection[l1_, l2_, test_: SameQ] := 
 Module[{res = 
    Last@Reap[
      Scan[Extract[l1, 
         Position[l1, x_ /; test[x, #], {1}, 1, Heads -> False], 
         Sow] &, l2]]}, If[res === {}, res, First[res]]]

Here is the usage:

In[22]:= NonSortingIntersection[l1, l2, 
 Function[{x, y}, First[x] == First[y]]]

Out[22]= {{{2011, 3, 13}, 1}, {{2011, 3, 16}, 2}, {{2011, 3, 17}, 3}}

Notice that unlike other solutions the output is guaranteed to have length no longer that that of l2. For instance:

In[24]:= Cases[Join[l1, l1], {x_, _} /; MemberQ[Evaluate[Transpose[l2][[1]]], x]]

Out[24]= {{{2011, 3, 13}, 1}, {{2011, 3, 16}, 2}, {{2011, 3, 17}, 
  3}, {{2011, 3, 13}, 1}, {{2011, 3, 16}, 2}, {{2011, 3, 17}, 3}}

In[25]:= NonSortingIntersection[Join[l1, l1], l2, 
 Function[{x, y}, First[x] == First[y]]]

Out[25]= {{{2011, 3, 13}, 1}, {{2011, 3, 16}, 2}, {{2011, 3, 17}, 3}}

This may or may not be desirable, but this is up to radhat who knows his problem better.

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