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I would like to plot a "decomposition tree" in Mathematica.

I have a function f that takes an object and returns all the components of that object as a list. For the purpose of this question, let's just decompose Mathematica expressions as follows (my actual f relies on an external database to decompose different kinds of objects, so I can't easily post it):

f[e_?AtomQ] := {}
f[e_] := List @@ e

I would like to create a tree plot that shows how an object is decomposed as we recursively keep applying f. For the particular example f above, we should get something very similar to the output of TreeForm, except that a full expression should be displayed (rather than just a head) at each node. The children of a node are going to be its components as returned by f.

Note that elements can repeat in a decomposition tree like this, but not elements are repeated in the output of TreePlot as it works with graphs. One idea would be to generate a unique "internal name" for each node, construct a graph, and use TreePlot, setting it to display the actual form of the nodes rather than their "internal name"

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2 Answers 2

up vote 9 down vote accepted

How about this?

tf[x_] := f[x] /. {{} :> x, r_ :> x @@ tf /@ r}

example usage

If any of the terms are not inert, this "simple" (?) approach will not work.

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Hackish in a way, but it's the kind of simple solution I was hoping for. And the objects I decompose are stored as strings, so very suitable there (no accidental evaluation). –  Szabolcs Apr 13 '11 at 23:37
can you suggest a way compatible with this solution to change the font of the nodes? (Needed to display glyphs not present in the default font.) –  Szabolcs May 5 '11 at 10:36
@Szabolcs You can use the VertexRenderingFunction option of TreeForm to take complete control over the node appearance, e.g. VertexRenderingFunction->(Inset[Framed[Style[#2, FontFamily->"Webdings"], Background->LightYellow], #1]&). –  WReach May 5 '11 at 14:32
ah, so obvious! I was all along on the wrong track, trying to manipulate the nodes directly ... –  Szabolcs May 5 '11 at 15:31

I am not sure it answers your question, but here is how I would implement rudimentary TreeForm:

decompose[expr_?AtomQ] := expr
decompose[expr_] := Block[{lev = Level[expr, {1}]},
  Sow[Thread[expr -> lev]]; decompose /@ lev;]

treeForm[expr_] := Reap[decompose[expr]][[-1, 1]] // Flatten


enter image description here

EDIT Yes you are right, this is not a tree. To make it a tree, each expression should carry with it its position. Kind of like so:

ClearAll[treePlot, node, decompose2];
SetAttributes[{treePlot, node, decompose2}, HoldAll];
decompose2[expr_] /; AtomQ[Unevaluated[expr]] := node[expr];
decompose2[expr_] := Module[{pos, list},
  pos = SortBy[
    Position[Unevaluated[expr], _, {0, Infinity}, Heads -> False], 
  list = Extract[Unevaluated[expr], pos, node];
  list = MapThread[Append, {list, pos}];
   list, {___, node[e1_, p1_], ___, node[e2_, p2_], ___} /; 
     Length[p2] == Length[p1] + 1 && 
      Most[p2] == p1 :> (node[e1, p1] -> node[e2, p2])]


treePlot2[expr_] := 
 Module[{data = decompose2[a^2 + Subscript[b, 2] + 3 c], gr, vlbls},
  gr = Graph[data];
  vlbls = Table[vl -> (HoldForm @@ {vl[[1]]}), {vl, VertexList[gr]}];
  Graph[data, VertexLabels -> vlbls, ImagePadding -> 50]

enter image description here

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your plot is not really a tree, as both a^2 and b_2 have an edge pointing to the same node labelled 2. This is exactly the challenge (and why I mentioned that perhaps it's necessary to use an "internal name" for node): I need branching at every step, and elements are allowed to be repeated in the tree. We should have two nodes labelled 2 here, one branching from a^2, the other from b_2. –  Szabolcs Apr 13 '11 at 13:09
@Szabolcs Please see the edit to my response –  Sasha Apr 13 '11 at 17:44
This is brilliant coding but there is a small error. The treeplot2 function should read: Module[{data = decompose2[expr], gr, vlbls}, gr = Graph[data]; vlbls = Table[vl -> (HoldForm @@ {vl[[1]]}), {vl, VertexList[gr]}]; Graph[data, VertexLabels -> vlbls, ImagePadding -> 50] ], –  mathlawguy Jan 20 '13 at 15:52

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