In Mathematica, I create singly linked lists like so:

```
toLinkedList[x_List] := Fold[pair[#2, #1] &, pair[], Reverse[x]];
fromLinkedList[ll_pair] := List @@ Flatten[ll];
emptyQ[pair[]] := True;
emptyQ[_pair] := False;
```

Using the symbol `pair`

for the cons cells has the advantage of `Flatten`

working safely even if the lists contain Mathematica-style `List`

s, and allows you to define custom notation using `MakeExpression`

/`MakeBoxes`

, which makes everything much more pleasant. In order to avoid having to muck around with `$IterationLimit`

, I wrote functions to work with these lists using either `While`

loops or `NestWhile`

instead of using recursion. Naturally, I wanted to see which approach would be faster, so I wrote two candidates so I could watch 'em fight:

```
nestLength[ll_pair] :=
With[{step = {#[[1, -1]], #[[-1]] + 1} &},
Last@NestWhile[step, {ll, 0}, ! emptyQ@First@# &]];
whileLength[ll_pair] :=
Module[{result = 0, current = ll},
While[! emptyQ@current,
current = current[[2]];
++result];
result];
```

The results were very strange. I tested the functions on linked lists of length 10000, and `whileLength`

was usually about 50% faster, at about 0.035 seconds to `nestLength`

's 0.055 seconds. However, occasionally `whileLength`

would take about ~4 seconds. I thought there might be some caching behavior, so I started generating fresh, random lists to check, and `whileLength`

wouldn't necessarily be slow on the first run with a new list; it might take dozens of times to see the slowdown, but then it wouldn't recur (at least not for the 200 runs I was trying with each list).

What might be going on?

For reference, the function I used for testing is this:

```
getTimes[f_, n_] :=
With[{ll = toLinkedList@RandomInteger[100, 10000]},
Table[Timing[f@ll], {n}][[All, 1]]]
```

**EDIT:** I neglected to mention the version earlier; I got these results with Mathematica 8.

**EDIT the second:** When I read Daniel Lichtblau's answer, I realized that my times for "typical" runs omitted a leading 0. It's been fixed.

**EDIT the third:** I think Leonid Shifrin is correct to associate the issue with `Module`

; I can get the same sort of behavior from the `NestWhile`

-based version by replacing the `With`

with a `Module`

:

```
nestModuleLength[ll_pair] :=
Module[{step = {#[[1, -1]], #[[-1]] + 1} &},
Last@NestWhile[step, {ll, 0}, ! emptyQ@First@# &]];
In[15]:= Select[getTimes[nestModuleLength, 100], # > 3 &]
Out[15]= {3.797}
```

`List`

generated by`RandomInteger`

, which is immediately converted into a tree-like expression. – Pillsy Feb 23 '11 at 20:52`Module`

- @belisarius was the first to suggest that it was the culprit. – Leonid Shifrin Feb 25 '11 at 16:26