# A “MapList” function

In Mathematica there are a number of functions that return not only the final result or a single match, but all results. Such functions are named `*List`. Exhibit:

• FoldList
• NestList
• ReplaceList
• ComposeList

### Something that I am missing is a MapList function.

For example, I want:

``````MapList[f, {1, 2, 3, 4}]
``````
`{{f[1], 2, 3, 4}, {1, f[2], 3, 4}, {1, 2, f[3], 4}, {1, 2, 3, f[4]}}`

I want a list element for each application of the function:

``````MapList[
f,
{h[1, 2], {4, Sin[x]}},
{2}
] // Column
``````
```{h[f[1], 2], {4, Sin[x]}}
{h[1, f[2]], {4, Sin[x]}}
{h[1, 2], {f[4], Sin[x]}}
{h[1, 2], {4, f[Sin[x]]}}```

### One may implement this as:

``````MapList[f_, expr_, level_: 1] :=
MapAt[f, expr, #] & /@
Position[expr, _, level, Heads -> False]
``````

### However, it is quite inefficient. Consider this simple case, and compare these timings:

``````a = Range@1000;
#^2 & /@ a // timeAvg
MapList[#^2 &, a] // timeAvg
ConstantArray[#^2 & /@ a, 1000] // timeAvg

0.00005088

0.01436

0.0003744
``````

This illustrates that on average `MapList` is about 38X slower than the combined total of mapping the function to every element in the list and creating a 1000x1000 array.

### Therefore, how may MapList be most efficiently implemented?

-

I suspect that `MapList` is nearing the performance limit for any transformation that performs structural modification. The existing target benchmarks are not really fair comparisons. The `Map` example is creating a simple vector of integers. The `ConstantArray` example is creating a simple vector of shared references to the same list. `MapList` shows poorly against these examples because it is creating a vector where each element is a freshly generated, unshared, data structure.

I have added two more benchmarks below. In both cases each element of the result is a packed array. The `Array` case generates new elements by performing `Listable` addition on `a`. The `Module` case generates new elements by replacing a single value in a copy of `a`. These results are as follows:

``````In[8]:= a = Range@1000;
#^2 & /@ a // timeAvg
MapList[#^2 &, a] // timeAvg
ConstantArray[#^2 & /@ a, 1000] // timeAvg
Array[a+# &, 1000] // timeAvg
Module[{c}, Table[c = a; c[[i]] = c[[i]]^2; c, {i, 1000}]] // timeAvg

Out[9]=  0.0005504

Out[10]= 0.0966

Out[11]= 0.003624

Out[12]= 0.0156

Out[13]= 0.02308
``````

Note how the new benchmarks perform much more like `MapList` and less like the `Map` or `ConstantArray` examples. This seems to show that there is not much scope for dramatically improving the performance of `MapList` without some deep kernel magic. We can shave a bit of time from `MapList` thus:

``````MapListWR4[f_, expr_, level_: {1}] :=
Module[{positions, replacements}
, positions = Position[expr, _, level, Heads -> False]
; replacements = # -> f[Extract[expr, #]] & /@ positions
; ReplacePart[expr, #] & /@ replacements
]
``````

Which yields these timings:

``````In[15]:= a = Range@1000;
#^2 & /@ a // timeAvg
MapListWR4[#^2 &, a] // timeAvg
ConstantArray[#^2 & /@ a, 1000] // timeAvg
Array[a+# &, 1000] // timeAvg
Module[{c}, Table[c = a; c[[i]] = c[[i]]^2; c, {i, 1000}]] // timeAvg

Out[16]= 0.0005488

Out[17]= 0.04056

Out[18]= 0.003

Out[19]= 0.015

Out[20]= 0.02372
``````

This comes within factor 2 of the `Module` case and I expect that further micro-optimizations can close the gap yet more. But it is with eager anticipation that I join you awaiting an answer that shows a further tenfold improvement.

-
Thank you for your analysis. –  Mr.Wizard Oct 30 '11 at 23:57
@Mr.Wizard see my answer for another speed boost. I have a couple more ideas that I'll add to my post tonight if I get time. –  telefunkenvf14 Oct 31 '11 at 23:54

(Updated my function)

I think I can offer another 2x boost on top of WReach's attempt.

``````Remove[MapListTelefunken];
MapListTelefunken[f_, dims_] :=
With[{a = Range[dims], fun = f[[1]]},
With[{replace = ({#, #} -> fun) & /@ a},
ReplacePart[ConstantArray[a, {dims}], replace]
]
]
``````

Here are the timings on my machine (Sony Z laptop; i7, 8GB ram, 256 SSD in Raid 0):

``````a = Range@1000;
#^2 & /@ a; // timeAvg
MapList[#^2 &, a]; // timeAvg
MapListWR4[#^2 &, a]; // timeAvg
MapListTelefunken[#^2 &, 1000]; // timeAvg

0.0000296 (* just Mapping the function over a Range[1000] for baseline *)
0.0297 (* the original MapList proposed by Mr.Wizard *)
0.00936 (* MapListWR4 from WReach *)
0.00468 (* my attempt *)
``````
-
I think a man with that laptop deserves upvotes and envy. –  belisarius Nov 1 '11 at 3:00
The new function does not give the same results as the two use cases shown for `MapList` (even when `#^2` is changed to `f[#]` in the definition). –  WReach Nov 1 '11 at 4:50
@WReach -- I see my error...was trying to make the function syntax the same as the others and forgot replace the #^2& (in the internal With) with the f_. I think the timings will still be valid. Will fix and update. –  telefunkenvf14 Nov 1 '11 at 9:43
@belisarius - don't worry, the laptop comes with plenty of Sony crapware to slow it down. –  telefunkenvf14 Nov 1 '11 at 9:44
@telef This week my Lenovo friendware alerted about the convenience of buying a new battery to prevent future failures ... three days after the old one died. –  belisarius Nov 1 '11 at 11:49
``````MapList[f_, list_] := (Table[MapAt[f, #, i], {i, Length@#}] &)@list;
The culprit in your own definition is the `Position[]` call, which creates a complex auxiliary structure.