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What is the simplest way to map an arbitrarily funky nested list expr to a function unflatten so that expr==unflatten@@Flatten@expr?

Motivation: Compile can only handle full arrays (something I just learned -- but not from the error message), so the idea is to use unflatten together with a compiled version of the flattened expression:

fPrivate=Compile[{x,y},Evaluate@Flatten@expr];
f[x_?NumericQ,y_?NumericQ]:=unflatten@@fPrivate[x,y] 

Example of a solution to a less general problem: What I actually need to do is to calculate all the derivatives for a given multivariate function up to some order. For this case, I hack my way along like so:

expr=Table[D[x^2 y+y^3,{{x,y},k}],{k,0,2}];
unflatten=Module[{f,x,y,a,b,sslot,tt},
  tt=Table[D[f[x,y],{{x,y},k}],{k,0,2}] /. 
    {Derivative[a_,b_][_][__]-> x[a,b], f[__]-> x[0,0]};
  (Evaluate[tt/.MapIndexed[#1->sslot[#2[[1]]]&, 
            Flatten[tt]]/. sslot-> Slot]&) ] 

Out[1]= {x^2 y + y^3, {2 x y, x^2 + 3 y^2}, {{2 y, 2 x}, {2 x, 6 y}}}
Out[2]= {#1, {#2, #3}, {{#4, #5}, {#5, #7}}} &

This works, but it is neither elegant nor general.

Edit: Here is the "job security" version of the solution provided by aaz:

makeUnflatten[expr_List]:=Module[{i=1},
    Function@Evaluate@ReplaceAll[
        If[ListQ[#1],Map[#0,#1],i++]&@expr,
        i_Integer-> Slot[i]]]

It works a charm:

In[2]= makeUnflatten[expr]
Out[2]= {#1,{#2,#3},{{#4,#5},{#6,#7}}}&
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I didn't test it, but modification of Leonid Shifrin's rearrangeAs might work stackoverflow.com/questions/4811082/… –  Yaroslav Bulatov Feb 15 '11 at 8:05
    
Thanks, Yaroslav: That certainly looks related -- but it's a bit hard to grok :). I ended up doing something myself which I'll post if nobody bites... Same story always: 1) solve problem for you specific case, 2) realize that a more general solution could be fun, 3) to avoid wasting time on tangent, post it on SO for others to do your tangential work, 4) do it yourself as well. Sigh –  Janus Feb 15 '11 at 8:49
    
This question seems related stackoverflow.com/questions/3807976/… –  dbjohn Feb 15 '11 at 12:15
    
@Yaroslav I adjusted my version to this question, and ended up with something very similar to the solution by @aaz, but the latter is simpler and more elegant. –  Leonid Shifrin Feb 15 '11 at 12:28
    
@dbjohn: Thanks. The question you mention only deals with "full arrays" -- for which, incidentally, there would be no need for this hack as Compile handles those just fine. –  Janus Feb 15 '11 at 13:04
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3 Answers 3

up vote 4 down vote accepted

You obviously need to save some information about list structure, because Flatten[{a,{b,c}}]==Flatten[{{a,b},c}].

If ArrayQ[expr], then the list structure is given by Dimensions[expr] and you can reconstruct it with Partition. E.g.

expr = {{a, b, c}, {d, e, f}};
dimensions = Dimensions[expr]

  {2,3}

unflatten = Fold[Partition, #1, Reverse[Drop[dimensions, 1]]]&;
expr == unflatten @ Flatten[expr]

(The Partition man page actually has a similar example called unflatten.)


If expr is not an array, you can try this:

expr = {a, {b, c}};
indexes = Module[{i=0}, If[ListQ[#1], Map[#0, #1], ++i]& @expr]

  {1, {2, 3}}

slots = indexes /. {i_Integer -> Slot[i]}

  {#1, {#2, #3}}

unflatten = Function[Release[slots]]

  {#1, {#2, #3}} &

expr == unflatten @@ Flatten[expr]
share|improve this answer
    
Yes, I have used the first one a couple of times, but the second version is what I need -- and very nicely done! Using Slot[0] for anonymous recursion never occurred to me :) Thanks. –  Janus Feb 15 '11 at 13:14
    
I just found out about Slot[0] while writing this; it's under Neat Examples, obviously :) –  aaz Feb 15 '11 at 13:40
    
Is Release documented? Can anyone guide me to some information? I am using Mma 7 (M. Trott, in 'Programming' says it is undocumented, but gives no further information, as far as I can see). –  TomD Feb 17 '11 at 0:55
1  
@TomD - Sort of. Here it works the same as Evaluate. –  aaz Feb 17 '11 at 1:30
    
@aaz Thanks for that –  TomD Feb 17 '11 at 14:00
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I am not sure what you are trying to do with Compile. It is used when you want to evaluate procedural or functional expressions very quickly on numerical values, so I don't think it is going to help here. If repeated calculations of D[f,...] are impeding your performance, you can precompute and store them with something like Table[d[k]=D[f,{{x,y},k}],{k,0,kk}];

Then just call d[k] to get the kth derivative.

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1  
Thanks. I quite agree that I wouldn't need compile for the example case -- but I don't think anyone would thank me for posting the actual expression I'm working with :) My question is the first sentence, everything else is background. –  Janus Feb 15 '11 at 7:18
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I just wanted to update the excellent solutions by aaz and Janus. It seems that, at least in Mathematica 9.0.1.0 on Mac OSX, the assignment (see aaz's solution)

{i_Integer -> Slot[i]}

fails. If, however, we use

{i_Integer :> Slot[i]}

instead, we succeed. The same holds, of course, for the ReplaceAll call in Janus's "job security" version.

For good measure, I include my own function.

unflatten[ex_List, exOriginal_List] := 
  Module[
   {indexes, slots, unflat},
   indexes = 
     Module[
       {i = 0}, 
       If[ListQ[#1], Map[#0, #1], ++i] &@exOriginal
       ];
   slots = indexes /. {i_Integer :> Slot[i]};
   unflat = Function[Release[slots]];
   unflat @@ ex
   ];

(* example *)
expr = {a, {b, c}};
expr // Flatten // unflatten[#, expr] &

It might seem a little like a cheat to use the original expression in the function, but as aaz points out, we need some information from the original expression. While you don't need it all, in order to have a single function that can unflatten, all is necessary.

My application is similar to Janus's: I am parallelizing calls to Simplify for a tensor. Using ParallelTable I can significantly improve performance, but I wreck the tensor structure in the process. This gives me a quick way to reconstruct my original tensor, simplified.

share|improve this answer
    
The original is still working fine for me in v9. The purpose of makeUnflatten is exactly to store the information about the structure of expr into an anonymous unpack function -- so there is no need to keep the original expression around. –  Janus Aug 26 '13 at 11:05
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