# a special Tally function in mathematica

I am wondering how one can write a special Tally function, which treats the following list `{{{1,0},{2,1,3}},{{1,1},{0,1,1}},{{2,1,2},{3,2}},{{1,0},{2,1}}}` as if:

1. as long as dimensions match, it is equivalent. For example, `{{1,0},{2,1,3}}` and `{{1,1},{0,1,1}}` are equivalent, but not with `{{1,0},{2,1}}`.
2. ordering also does not matter. For example, `{{1,0},{2,1,3}}` and `{{2,1,2},{3,2}}` are equivalent.

The elements of the level `1` list can be artitarily nested. How can I write such a function?

Many thanks.

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Very similar to @Daniel's answer, but preserves a member of each class:

``````In[9]:= Tally[list, (Sort[Length /@ #] == Sort[Length /@ #2]) &]

Out[9]= {{{{1, 0}, {2, 1, 3}}, 3}, {{{1, 0}, {2, 1}}, 1}}
``````
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(1) Replace all integers with 0. (2) Sort at level one. This gives a unique representative for every class in the list.

`````` ll2 = Map[Sort, ll /. aa_Integer -> 0]
``````

Out[9]= {{{0, 0}, {0, 0, 0}}, {{0, 0}, {0, 0, 0}}, {{0, 0}, {0, 0, 0}}, {{0, 0}, {0, 0}}}

``````Tally[ll2]
``````

Out[10]= {{{{0, 0}, {0, 0, 0}}, 3}, {{{0, 0}, {0, 0}}, 1}}

Daniel Lichtblau Wolfram Research

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+1 Simple is beautiful –  belisarius Mar 15 '11 at 2:51
``````SelectEquivalents[list, Dimensions, #&, {#2[[1]], Length@#2}&]
``````

which gives the same thing as Michael's answer, or

``````SelectEquivalents[list, Dimensions, #&, {#2[[1]] /. _Integer -> 0, Length@#2}&]
``````

which gives Daniel's answer. Or, my personal favorite

``````SelectEquivalents[list, Dimensions, #&, {#1, Length@#2}&]
``````

which gives

``````{{{2},3}, {{2,2}, 1}}
``````

But, that reveals a flaw in using `Dimension`, in that it does not know what to report when the sublists are of different dims, so if we replace `Dimension` with `Sort@Map[Length,#,{1,Infinity}]&`, we can begin to handle arbitrary dimensions. This gives

``````{{{2, 3}, 3}, {{2, 2}, 1}}
``````

So, the dimensionality of each sublist is revealed. This does not sort below the first dimension, and I do not see how it can be immediately fixed.

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