There are two obvious ways to structure a linked list in Mathematica, "left":

```
{1, {2, {3, {4, {5, {6, {7, {}}}}}}}}
```

And "right":

```
{{{{{{{{}, 7}, 6}, 5}, 4}, 3}, 2}, 1}
```

These can be made with:

```
toLeftLL = Fold[{#2, #} &, {}, Reverse@#] & ;
toRightLL = Fold[List, {}, Reverse@#] & ;
```

If I use these, and do a simple `ReplaceRepeated`

to walk through the linked list, I get drastically different `Timing`

results:

```
r = Range[15000];
left = toLeftLL@r;
right = toRightLL@r;
Timing[i = 0; left //. {head_, tail_} :> (i++; tail); i]
Timing[i = 0; right //. {tail_, head_} :> (i++; tail); i]
(* Out[6]= {0.016, 15000} *)
(* Out[7]= {5.437, 15000} *)
```

Why?

`RuleDelayed`

. Although IthinkI sort of see how it walks through the list, it's not entirely clear. Also, if I replace`tail`

in the RHS with`tail-tail+tail`

, I get an error:`$RecursionLimit::reclim: Recursion depth of 256 exceeded. >>`

and need to abort. Why doesn't mma figure out that`tail-tail+tail=tail`

and return the same result as before? – abcd Apr 27 '11 at 1:44`{head_, tail_} :> (i++; tail)`

increments`i`

and returns the rest of the linked list, without the first element (head), e.g.`{2, {3, {4, {5, {6, {7, {}}}}}}}`

if used on the first list in my question. I increment`i`

simply to prove that this replacement took place 15,000 times in each case. The pattern`head_`

was used only for clarity and could be replaced with`_`

just as well. Since`tail`

is a list structure, and arithmetic operations thread through such trees, you are doing up to 14,999 operations rather than one with each`+`

or`-`

. – Mr.Wizard Apr 27 '11 at 2:09`//.`

!! I wasn't careful in noticing it and was trying to wrap my head around how the walk-through is done with`/.`

That didn't make much sense! Now that I see it, it's clear! Thanks for the explanation on the second part of the comment. – abcd Apr 27 '11 at 4:01