2

I need to find pairs of matching elements in a list after the list has been grouped by twos.

I.e. 1 1 2 3 2 2 would return 1 1 2 2, but 1 2 2 1 would return nothing because the twos would be in different boxes.

My idea was to create boxes, then apply a mask to get the matching pairs, but I can't figure out the pairwise boxing step. How would I do pairwise boxing?

(Another solution to my problem would be interesting as well, but I'm interested in the pairwise boxing solution)

2

Generally it is better to use boxes in situations where you are dealing with variable-sized lists. Where that isn't the case, it is best to avoid them to improve performance (increase speed and reduce space). This version doesn't use boxes:

   _2 ,@(]\ #~ =/\) 1 1 3 4 2 2
1 1 2 2
   _2 ,@(]\ #~ =/\) 1 2 2 1
1

Building on Bob's answer, you can apply the conditional verb on pairs of values as well with the Infix (\) adverb:

   _2 =/\ 1 1 2 3 2 2
1 0 1

A straightforward way to apply this conditional and end up with the boxed results follows, assuming that you need the results boxed (which you don't in this simple example):

   ((_2 =/\ ]) # _2 <\ ]) 1 2 2 1

   ((_2 =/\ ]) # _2 <\ ]) 1 1 2 3 2 2
┌───┬───┐
│1 1│2 2│
└───┴───┘

In case it's unclear, the above calculates the conditional with the parenthesized (_2 =/\ ]). The fork rule applies _2 <\ ] to box the pairs, then selects the boxes that match the conditional result with the f # g fork.

1

This should work.

   _2 ]\ 1 2 2 1
1 2
2 1

It is based on the dyad u\ called Infix. More about that at this link: http://www.jsoftware.com/help/dictionary/d430.htm

To box, just apply the adverb \ to the box verb <

   _2 <\ 1 2 4 5 4 6 2 1
+---+---+---+---+
|1 2|4 5|4 6|2 1|
+---+---+---+---+
  • 3
    Or just use _2 <\ 1 2 4 5 4 6 2 1 – Tikkanz Dec 3 '17 at 4:05
  • 2
    Should have seen that really, shouldn't I. Thanks for cleaning up Tikkanz. – bob Dec 3 '17 at 8:06
  • And actually since Dane has since cleaned up my answer, originally it was _2<@]\ 1 2 4 5 4 6 2 1 which is what Tikkanz was pointing out. – bob Dec 18 '17 at 5:20

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