Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

Many times I find myself counting occurrences with Tally[ ] and then, once I discarded the original list, having to add (and join) to that counters list the results from another list.

This typically happens when I am counting configurations, occurrences, doing some discrete statistics, etc.

So I defined a very simple but handy function for Tally aggregation:

         listTallied_List] := 
 Join[Tally@Join[listUnTallied, listUnTallied1], listTallied] //. 
     {a___, {x_, p_}, b___, {x_, q_}, c___} -> {a, {x, p + q}, b, c};

Such that

l = {x, y, z}; lt = Tally@l;
n = {x};
m = {x, y, t};

aggTally[n, {}]
  {{x, 1}}

aggTally[m, n, {}]
  {{x, 2}, {y, 1}, {t, 1}}

aggTally[m, n, lt]
  {{x, 3}, {y, 2}, {t, 1}, {z, 1}}

This function has two problems:

1) Performance

Timing[Fold[aggTally[Range@#2, #1] &, {}, Range[100]];]
  {23.656, Null}
(* functional equivalent to *)
Timing[s = {}; j = 1; While[j < 100, s = aggTally[Range@j, s]; j++]]
  {23.047, Null}

2) It does not validate that the last argument is a real Tallied list or null (less important for me, though)

Is there a simple, elegant, faster and more effective solution? (I understand that these are too many requirements, but wishing is free)

share|improve this question
up vote 9 down vote accepted

Perhaps, this will suit your needs?

aggTallyAlt[listUnTallied__List : {}, listUnTallied1_List, listTallied : {{_, _Integer} ...}] :=
{#[[1, 1]], Total@#[[All, 2]]} & /@ 
       GatherBy[Join[Tally@Join[listUnTallied, listUnTallied1], listTallied], First]

The timings are much better, and there is a pattern-based check on the last arg.


Here is a faster version:

aggTallyAlt1[listUnTallied__List : {}, listUnTallied1_List, listTallied : {{_, _Integer} ...}] :=
Transpose[{#[[All, 1, 1]], Total[#[[All, All, 2]], {2}]}] &@
   GatherBy[Join[Tally@Join[listUnTallied, listUnTallied1], listTallied], First]

The timings for it:

In[39]:= Timing[Fold[aggTallyAlt1[Range@#2, #1] &, {}, Range[100]];]
Timing[s = {}; j = 1; While[j < 100, s = aggTallyAlt1[Range@j, s]; j++]]

Out[39]= {0.015, Null}

Out[40]= {0.016, Null}
share|improve this answer
It really flies! – Dr. belisarius Feb 28 '11 at 15:51
Your second version is VERY fast. It seems ReplaceRepeated[ ] should be used very carefully when performance is an issue. – Dr. belisarius Feb 28 '11 at 16:02
Indeed, ReplaceRepeated should be used with care. I have a small section on this topic in my book: To see some example where its performance is quite decent (due to usage of linked lists), you may want to look at e.g. this thread:…. So, it all depends on the pattern. Patterns with many blanks are usually inefficient when used with ReplaceRepeated. – Leonid Shifrin Feb 28 '11 at 16:10
Thanks for the pointers. I'll have to revisit some old code ... – Dr. belisarius Feb 28 '11 at 16:20

The following solution is just a small modification of your original function. It applies Sort before using ReplaceRepeated and can thus use a less general replacement pattern which makes it much faster:

aggTally[listUnTallied__List : {}, listUnTallied1_List, 
   listTallied : {{_, _Integer} ...}] := 
  Sort[Join[Tally@Join[listUnTallied, listUnTallied1], 
     listTallied]] //. {a___, {x_, p_}, {x_, q_}, c___} -> {a, {x, p + q}, c};
share|improve this answer
Although the performance is not comparable to those solutions without patterns, the improvement over my function is really impressive with such a little modification. Thanks. – Dr. belisarius Feb 28 '11 at 16:52

Here's the fastest thing I've come up with yet, (ab)using the tagging available with Sow and Reap:

aggTally5[untallied___List, tallied_List: {}] :=
    Scan[((Sow[#2, #] &) @@@ Tally[#]) &, {untallied}];
    Sow[#2, #] & @@@ tallied;
    , _, {#, Total[#2]} &]]

Not going to win any beauty contests, but it's all about speed, right? =)

share|improve this answer
Thanks! I didn't check why, but seems to fail with aggTally2[m, n, lt] (arguments in the question). Where have you been? We missed you! :) – Dr. belisarius Feb 28 '11 at 15:56
Very, very busy, so I've been mostly lurking. I see that several of my colleagues are carrying the torch admirably though! I updated my answer with the right paste, but I realized it's not quite right... – Michael Pilat Feb 28 '11 at 16:18
Updated with a working solution, and faster all around to boot. – Michael Pilat Feb 28 '11 at 16:50

If you stay purely symbolic, you may try something along the lines of

(Plus @@ Times @@@ Join[#1, #2] /. Plus -> List /. Times -> List) &

for joining tally lists. This is stupid fast but returns something that isn't a tally list, so it needs some work (after which it may not be so fast anymore ;) ).

EDIT: So I've got a working version:

aggT = Replace[(Plus @@ Times @@@ Join[#1, #2] 
                  /. Plus -> List 
                  /. Times[a_, b_] :> List[b, a]), 
                k_Symbol -> List[k, 1], {1}] &;

Using a couple of random symbolic tables I get

a := Tally@b;
b := Table[f[RandomInteger@99 + 1], {i, 100}];

Timing[Fold[aggT[#1, #2] &, a, Table[a, {i, 100}]];]
--> {0.104954, Null}

This version only adds tally lists, doesn't check anything, still returns some integers, and comparing to Leonid's function:

Timing[Fold[aggTallyAlt1[#2, #1] &, a, Table[b, {i, 100}]];]
--> {0.087039, Null}

it's already a couple of seconds slower :-(.

Oh well, nice try.

share|improve this answer
It seems to return inhomogeneous elements. Those having only one occurrence does not show the counter. – Dr. belisarius Feb 28 '11 at 15:43
Uuh, well, like I said it's very rough around the edges. Mainly I just wanted to show off an outside the box idea. I'll see if I have time to play around with it some more, though Leonid seems to be on the ball. – Timo Feb 28 '11 at 17:42
Thanks for your effort! There are very good answers already. Anyway, I'll keep it open for a couple of days. – Dr. belisarius Feb 28 '11 at 21:24

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.