A suggestion for extracting stack, maybe something that relies on Trace?

An example of using Trace below, from Chris Chiasson. This code saves evaluation tree of 1 + Sin[x + y] + Tan[x + y] into ~/temp/msgStream.m

```
Developer`ClearCache[];
SetAttributes[recordSteps, HoldAll];
recordSteps[expr_] :=
Block[{$Output = List@OpenWrite["~/temp/msgStream.m"]},
TracePrint[Unevaluated[expr], _?(FreeQ[#, Off] &),
TraceInternal -> True];
Close /@ $Output;
Thread[
Union@Cases[
ReadList["~/temp/msgStream.m", HoldComplete[Expression]],
symb_Symbol /;
AtomQ@Unevaluated@symb &&
Context@Unevaluated@symb === "System`" :>
HoldComplete@symb, {0, Infinity}, Heads -> True],
HoldComplete]
];
recordSteps[1 + Tan[x + y] + Sin[x + y]]
```

To answer Samsdram's question, the code below (also from Chris) gives evaluation tree of a Mathematica expression. Here is the post from MathGroup with source code and examples.

```
(Attributes@# = {HoldAllComplete}) & /@ {traceToTreeAux, toVertex,
HoldFormComplete, getAtoms, getAtomsAux}
MakeBoxes[HoldFormComplete[args___], form_] :=
MakeBoxes[HoldForm[args], form]
edge[{head1_, pos1_, xpr1_}, {head2_, pos2_, xpr2_}] :=
Quiet[Rule[{head1, vertexNumberFunction@pos1, xpr1}, {head2,
vertexNumberFunction@pos2, xpr2}], {Rule::"rhs"}]
getAtomsAux[atom_ /; AtomQ@Unevaluated@atom] :=
Sow[HoldFormComplete@atom, getAtomsAux]
getAtomsAux[xpr_] := Map[getAtomsAux, Unevaluated@xpr, Heads -> True]
getAtoms[xpr_] := Flatten@Reap[getAtomsAux@xpr][[2]]
toVertex[traceToTreeAux[HoldForm[heldXpr_], pos_]] := toVertex[heldXpr]
toVertex[traceToTreeAux[HoldForm[heldXprs___], pos_]] :=
toVertex@traceToTreeAux[Sequence[], pos]
(*this code is strong enough to not need the ToString commands,but \
some of the resulting graph vertices give trouble to the graphing \
routines*)
toVertex[
traceToTreeAux[xpr_, pos_]] := {ToString[
Short@Extract[Unevaluated@xpr, 0, HoldFormComplete], StandardForm],
pos, ToString[Short@First@originalTraceExtract@{pos}, StandardForm]}
traceToTreeAux[xpr_ /; AtomQ@Unevaluated@xpr, ___] := Sequence[]
traceToTreeAux[_HoldForm, ___] := Sequence[]
traceToTreeAux[xpr_, pos_] :=
With[{lhs = toVertex@traceToTreeAux[xpr, pos],
args = HoldComplete @@ Unevaluated@xpr},
Identity[Sequence][
ReleaseHold[
Function[Null, edge[lhs, toVertex@#], HoldAllComplete] /@ args],
ReleaseHold@args]]
traceToTree[xpr_] :=
Block[{vertexNumber = -1, vertexNumberFunction,
originalTraceExtract},
vertexNumberFunction[arg_] :=
vertexNumberFunction[arg] = ++vertexNumber;
originalTraceExtract[pos_] :=
Extract[Unevaluated@xpr, pos, HoldFormComplete]; {MapIndexed[
traceToTreeAux, Unevaluated@xpr, {0, Infinity}]}]
TraceTreeFormPlot[trace_, opts___] :=
Block[{$traceExpressionToTree = True},
Through@{Unprotect, Update}@SparseArray`ExpressionToTree;
SparseArray`ExpressionToTree[trace, Infinity] = traceToTree@trace;
With[{result = ToExpression@ToBoxes@TreeForm[trace, opts]},
Through@{Unprotect, Update}@SparseArray`ExpressionToTree;
SparseArray`ExpressionToTree[trace, Infinity] =.;
Through@{Update, Protect, Update}@SparseArray`ExpressionToTree;
result]];
TraceTreeFormPlot[Trace[Tan[x] + Sin[x] - 2*3 - 55]]
```

`Message[]`

itself... interesting approach! – Timo Nov 14 '10 at 21:47