This answer should be considered as complementary to @Sasha's answer. I believe that this is a subtle topic that can benefit from explanations from several viewpoints.

### Why the question is non-trivial

I want to stress that the behavior in question is not typical, in the sense that it is not how most heads behave in Mathematica, and it can not be explained based just on the general principles of evaluation (in particular mechanics of `Unevaluated`

stripping), without resorting to implementation details of a particular head with such behavior (`RuleDelayed`

here). Consider some general head with a `HoldRest`

attribute:

```
In[185]:= SetAttributes[h, HoldRest];
h[1, Unevaluated[Unevaluated[Unevaluated[1 + 1]]]]
Out[186]= h[1, Unevaluated[Unevaluated[Unevaluated[1 + 1]]]]
```

while

```
In[209]:= 1:>Unevaluated@Unevaluated@Unevaluated[1+1]
Out[209]= 1:>1+1
```

### Some details on stripping off the `Unevaluated`

wrapers

This is based on discussions in the book of David Wagner "Power programming in Mathematica - the kernel", the WRI technical report by David Withoff named "Mathematica internals", and my own experiences.

Here is a very simplified picture of evaluation. Mathematica evaluates expressions recursively, first going "down" from "branches" (expressions) to "sub-branches" (sub-expressions) and leaves (atoms), and then going "up". On the way "down", heads of (sub) expressions are evaluated, and then parts. Those parts that have the head `Unevaluated`

, are not evaluated further (in the sense that the evaluator is not called recursively on them), while `Unevaluated`

gets stripped and it is marked that this has been done. On the way "up", it is considered that parts have been already evaluated. There are a number of steps including sequences splicing, evaluations related to attributes like `Flat`

, `Orderless`

etc. Then, rules for the head where evaluation is currently, are applied, user-defined and built-in (`UpValues`

, `DownValues`

, `SubValues`

). Finally, and this is what is important for this discussion, the `Unevaluated`

wrappers are restored for those parts of expression where no applicable rules were found. This is why, for an undefined function `f`

, we have:

```
In[188]:= ClearAll[f];
f[Unevaluated[1+1]]
Out[189]= f[Unevaluated[1+1]]
```

One can confirm that `Unevaluated`

wrappers were stripped and then restored, by using `Trace`

with the `TraceOriginal`

option set to `True`

:

```
In[190]:= Trace[f[Unevaluated[1+1]],TraceOriginal->True]
Out[190]= {f[Unevaluated[1+1]],{f},f[1+1],f[Unevaluated[1+1]]}
```

What happens when there are some rules defined for `f`

? The answer is that each rule application strips off one layer of `Unevaluated`

. Here is an example:

```
In[204]:=
f[x_]:=Hold[x];
g[x_]:=f[x];
{f[Unevaluated[1+1]],g[Unevaluated[1+1]]}
{f[Unevaluated@Unevaluated[1+1]],g[Unevaluated@Unevaluated[1+1]]}
{f[Unevaluated@Unevaluated@Unevaluated[1+1]], g[Unevaluated@Unevaluated@Unevaluated[1+1]]}
Out[206]= {Hold[1+1],Hold[2]}
Out[207]= {Hold[Unevaluated[1+1]],Hold[1+1]}
Out[208]= {Hold[Unevaluated[Unevaluated[1+1]]],Hold[Unevaluated[1+1]]}
```

If one knew in exactly how many evaluations will a given part of expression particiapte, one could in principle wrap that part in that many layers of `Unevaluated`

to prevent its evaluation. This information is however impossible to have generally, and `Unevaluated`

should not be used as a persistent holding wrapper - this is what `Hold`

is for. But this analysis may make it clearer that, in order to trip *any* number of evaluations, the head which does it must have non-trivial rules defined for it. In other words, normally, the part of evaluation process consisting of stripping off a layer of `Unevaluated`

does not (by itself, "on the way down the expression"), induce its re-evaluation - this can happen only on the way "up", due to some rules defined for that head. The conclusion is that the observed behavior of `RuleDelayed`

can only be explained by looking at the implementation details for `RuleDelayed`

, general considerations are not enough.

### An illustration: simulating the behavior of `RuleDelayed`

I will now illustrate this and also answer the part of the original question regarding the simulation of this behavior. As far as I can tell, the following code fully simulates the behavior of `RuleDelayed`

regarding stripping off `Unevaluated`

wrappers:

```
ClearAll[rd];
SetAttributes[rd, {HoldAllComplete, SequenceHold}];
rd[lhs_, Verbatim[Unevaluated][rhs_]] /;
Head[Unevaluated[rhs]] =!= Unevaluated := Append[rd[lhs], Unevaluated[rhs]];
rd[lhs_, Verbatim[Unevaluated][rhs_]] := rd @@ {lhs, rhs};
rd[lhs_, rhs_] /; Hold[lhs] =!= Hold[Evaluate[lhs]] := Prepend[rd[rhs], lhs];
```

(it may not be free of some evaluation leaks for other heads, but that's besides the point. Also, I was not able to make it `HoldRest`

, like `RuleDelayed`

- I had to use `HoldAllComplete`

for this construction to work). You can check:

```
In[173]:=
a=1;
rd[a,Unevaluated[1+1]]
rd[a,Unevaluated@Unevaluated[1+1]]
rd[a,Unevaluated@Unevaluated[1+1]]
Out[174]= rd[1,1+1]
Out[175]= rd[1,1+1]
Out[176]= rd[1,1+1]
```

This indirectly supports my arguments that it may be the `RuleDelayed`

implementation, rather than the evaluator, responsible for this effect (although, not knowing for sure, I can only guess. Also, `RuleDeleayed`

is fundamental enough that this exceptional behavior could have been wired into the evaluator)

**EDIT**

To further strengthen the analogy, here are the results of tracing:

```
In[183]:=
DeleteCases[Trace[rd[s,Unevaluated[1+1]],TraceOriginal->True],
x_/;!FreeQ[x,Head|Hold|Append|HoldPattern[rd[_]]]]
Out[183]= {rd[s,Unevaluated[1+1]],{rd},rd[s,Unevaluated[1+1]],
rd[s,1+1],{rd},rd[s,1+1],rd[s,1+1]}
In[184]:= Trace[RuleDelayed[s,Unevaluated[1+1]],TraceOriginal->True]
Out[184]= {s:>Unevaluated[1+1],{RuleDelayed},{s},s:>1+1,s:>1+1,{RuleDelayed},{s},s:>1+1}
```

The tracing results are very similar. I used `DeleteCases`

to filter out intermediate evaluations for `rd`

. The differences are due to the `HoldAllComplete`

attribute of `rd`

vs. `HoldRest`

of `RuleDelayed`

.

`Unevaluated`

? – belisarius Jun 7 '11 at 15:09`f[s, Unevaluated[1 + 1]]`

everything is simple. From where we would get two nested`Unevaluated`

? – Alexey Popkov Jun 7 '11 at 15:13`HoldRest`

is (almost) irrelevant - it just puts the head in the position to decide what to do with the original expression passed to it. And if the standard semantics of`Unevaluted`

is always enforced, evaluator itself is also irrelevant. The real question IMO (I may be wrong of course) is why`RuleDelayed`

behaves the way it does, or, may be, why the exception was made for it regarding the evaluator behavior, if it still turns out that evaluator is the culprit. – Leonid Shifrin Jun 7 '11 at 16:56