# Take some data, return a pure piecewise function

Given a list of {x,y} datapoints, return a pure function f (from the reals to the reals) such that f[x]==y for every {x,y} in the data. If x is not one of the x-values then return the y-value for the previous point (the one with x-value less than x). If the function gets a value less than that of the first x-value in the data -- i.e., there is no previous point -- then return 0.

For example, given data {{1,20}, {2,10}}, return a pure function that looks like this:

Graph of the function given {{1,20},{2,10}} http://yootles.com/outbox/so/piecewise.png

I wrote something using `Function` and `Piecewise` that I'll include as an answer but it seems like it might be inefficient, especially for a large list of points. [UPDATE: My answer may actually be decent now. I'll probably go with it if no one has better ideas.]

To be clear, we're looking for function that takes a single argument -- a list of pairs of numbers -- and returns a pure function. That pure function should take a number and return a number.

• Bit of a one sided conversation here... :) – Simon Jul 28 '11 at 10:02
• What does pure mean, is that a Mathematica concept? – starblue Jul 28 '11 at 10:46
• @starblue in this context (i.e., Mathematica programming), it means "nameless" as opposed to "side-effect free". So he wants a function that returns a nameless function. – acl Jul 28 '11 at 12:01
• That's right. I've always used "pure function" synonymously with "lambda function": stackoverflow.com/questions/16501/what-is-a-lambda-function Looks like the Mathematica docs do too: reference.wolfram.com/mathematica/ref/Function.html – dreeves Jul 28 '11 at 15:02
• @starblue In Mathematica, a "regular function" can have several definitions, one of which is selected for use by means of pattern matching against the call arguments. A "pure function" has only a single definition and bypasses the pattern matching step. Thus, it can provide a performance improvement in many circumstances. – WReach Jul 29 '11 at 3:35

Hand-Coded Binary Search

If one is willing to sacrifice conciseness for performance, then an imperative binary search approach performs well:

``````stepifyWithBinarySearch[data_] :=
With[{sortedData = SortBy[data, First], len = Length @ data}
, Module[{min = 1, max = len, i, x, list = sortedData}
, While[min <= max
, i = Floor[(min + max) / 2]
; x = list[[i, 1]]
; Which[
x == #, min = max = i; Break[]
, x < #, min = i + 1
, True, max = i - 1
]
]
; If[0 == max, 0, list[[max, 2]]]
]&
]
``````

Equipped with some test scaffolding...

``````test[s_, count_] :=
Module[{data, f}
, data = Table[{n, n^2}, {n, count}]
; f = s[data]
; Timing[Plot[f[x], {x, -5, count + 5}]]
]
``````

...we can test and time various solutions:

``````test[stepifyWithBinarySearch, 10]
`````` On my machine, the following timings are obtained:

```test[stepify (*version 1*), 100000]      57.034 s
test[stepify (*version 2*), 100000]      40.903 s
test[stepifyWithBinarySearch, 100000]     2.902 s
```

I expect that further performance gains could be obtained by compiling the various functions, but I'll leave that as an exercise for the reader.

Better Still: Precomputed Interpolation (response To dreeves' comment)

It is baffling that a hand-coded, uncompiled binary search would beat a Mathematica built-in function. It is perhaps not so surprising for `Piecewise` since, barring optimizations, it is really just a glorified IF-THEN-ELSEIF chain testing expressions of arbitrary complexity. However, one would expect `Interpolation` to fare much better since it is essentially purpose-built for this task.

The good news is that `Interpolation` does provide a very fast solution, provided one arranges to compute the interpolation only once:

``````stepifyWithInterpolation[data_] :=
With[{f=Interpolation[
{-1,1}*#& /@ Join[{{-9^99,0}}, data, {{9^99, data[[-1,2]]}}]
, InterpolationOrder->0 ]}
, f[-#]&
]
``````

This is blindingly fast, requiring only 0.016 seconds on my machine to execute `test[stepifyWithInterpolation, 100000]`.

• Thanks WReach! This is really surprising to me. Why can't a Piecewise or Interpolation function beat doing a hand-made binary search each time? I think there's something very wrong with the other solutions! Like they're reconstructing the pieces on each call of the pure function or something. – dreeves Jul 31 '11 at 6:01
• @dreeves Your intuition is correct. Please see my updated answer about avoiding the recomputation of the interpolation function. – WReach Jul 31 '11 at 15:12

You could also do this with `Interpolation` (with `InterpolationOrder->0`) but that interpolates by using the value of the next point instead of the previous. But then I realized you can reverse that with a simple double-negation trick:

``````stepify[data_] := Function[x,
Interpolation[{-1,1}*#& /@ Join[{{-9^99,0}}, data, {{9^99, data[[-1,2]]}}],
InterpolationOrder->0][-x]]
``````
• I think that you should incorporate the precomputation of the interpolation function from my response and then make your response the accepted answer. – WReach Jul 31 '11 at 15:24
• Perfect! (I just accepted your answer. Thanks so much for the help!) – dreeves Jul 31 '11 at 16:07

My previous attempts were not working properly (they were OK for two steps only).

I think the following one, along the same lines, works:

``````g[l_] := Function[x,
Total[#[] UnitStep[x - #[]] & /@
Transpose@({First@#, Differences[Join[{0}, Last@#]]} &@ Transpose@l)]]

Plot[g[{{1, 20}, {2, 10}, {3, 20}}][x], {x, 0, 6}]
`````` • Nice! Thanks belisarius. Is the `MapThread[List,..` different from a Transpose here? Also, I see this isn't quite to spec; does it work to wrap this in a `Function[x,...]`? – dreeves Jul 28 '11 at 15:14
• @dreeves I did a few Timings (nothing really serious), but seems that your first version is the fastest ... – Dr. belisarius Jul 29 '11 at 2:18
• thanks for doing that! Want to clean up your answer and paste in my version that you suspect is fastest and then I can mark this as the Accepted Answer? (My theory of Accepted Answers is that future searchers should not need to look at any other answers, i.e., it's a complete answer, and the best answer, and the asker vouches for it. Oh, and that answerers should borrow from each other liberally to try to construct a definitive answer.) – dreeves Jul 29 '11 at 5:39
• @dreeves You asked for efficiency, and I provided elegance (at best). So I think yours should be the accepted answer, at least until someone comes up with a faster one. (And I share your POV about borrowing content, with proper attribution of course) – Dr. belisarius Jul 29 '11 at 23:44
• I think your version isn't right. I just tried it with {{1,20}, {2,10}, {3,20}} and it doesn't match. I guess I supplied lousy data. :) – dreeves Jul 30 '11 at 8:55

Compiling WReach's answer does indeed result in a significant speedup. Using all the functions defined in WReach's answer, but redefining `test` to

``````test[s_,count_]:=Module[{data,f},
data=Table[{n,n^2},
{n,count}];
f=s[ToPackedArray[N@data]];
Timing[Plot[f[x],{x,-5,count+5}]]]
``````

(this is necessary to force the resulting arrays to be packed; thanks to Sjoerd de Vries for pointing this out), and defining

``````ClearAll[stepifyWRCompiled];
stepifyWRCompiled[data_]:=With[{len=Length@data,sortedData=SortBy[data,First]},
Compile[{{arg,_Real}},Module[{min=1,max=len,i,x,list=sortedData},
While[
min<=max,
i=Floor[(min+max)/2];
x=list[[i,1]];
Which[
x\[Equal]arg,min=max=i;Break[],
x<arg,min=i+1,True,max=i-1
]
];
If[0==max,0,list[[max,2]]]
],CompilationTarget->"WVM",RuntimeOptions\[Rule]"Speed"]]
``````

(the `With` block is necessary to explicitly insert `sortedData` into the block of code to be compiled) we get results faster even than the solution using `Interpolation`, although only marginally so:

``````Monitor[
tbl = Table[
{test[stepifyWRCompiled, l][],
test[stepifyWithInterpolation, l][],
test[stepifyWithBinarySearch, l][]},
{l, 15000, 110000, 5000}], l]
tbl//TableForm
(*
0.002785    0.003154    0.029324
0.002575    0.003219    0.031453
0.0028      0.003175    0.034886
0.002694    0.003066    0.034896
0.002648    0.003002    0.037036
0.00272     0.003019    0.038524
0.00255     0.00325     0.041071
0.002675    0.003146    0.041931
0.002702    0.003044    0.045077
0.002571    0.003052    0.046614
0.002611    0.003129    0.047474
0.002604    0.00313     0.047816
0.002668    0.003207    0.051982
0.002674    0.00309     0.054308
0.002643    0.003137    0.05605
0.002725    0.00323     0.06603
0.002656    0.003258    0.059417
0.00264     0.003029    0.05813
0.00274     0.003142    0.0635
0.002661    0.003023    0.065713
*)
``````

(first column is compiled binary search, second interpolation, third, uncompiled binary search).

Note also that I use `CompilationTarget->"WVM"`, rather than `CompilationTarget->"C"`; this is because the function is compiled with a lot of data points "built-in", and, if I use compilation to C with 100000 data points, I can see that gcc goes on for a long time and takes up a lot of memory (I imagine the resulting C file is huge, but I did not check). So I just use compilation to "WVM".

I think the overall conclusion here is just that `Interpolation` is also just doing some constant-time lookup (binary search or something similar, presumably) and the hand-coded way just happens to be slightly faster because it's less general.

• I think this has to do with the data array not being packed anymore at that size. Try Needs["Developer`"] DiscretePlot[ PackedArrayQ[Table[{n, n^2}, {n, 1, count}]] // Boole, {count, 5000, 100000, 5000}] DiscretePlot[ PackedArrayQ[Table[{n, n^2}, {n, 1, count}]] // Boole, {count, 100, 500, 20}] – Sjoerd C. de Vries Jul 31 '11 at 20:39
• @Sjoerd hmm, good point. But even if I explicitly use `ToPackedArray[data]` instead of `data`, I see the same slowdown. Still, it must be something like what you say (eg maybe it just gets automatically unpacked). I'll try to check this tomorrow. – acl Jul 31 '11 at 20:57
• PackedArrayQ[Table[{n, n^2}, {n, 1, 46340}]] ==> True, but PackedArrayQ[Table[{n, n^2}, {n, 1, 46341}]] ==> False. 46341 is the square root of 2^31, so its squared value cannot be contained in a machine size signed integer. I assume that's the reason. – Sjoerd C. de Vries Jul 31 '11 at 20:58
• Change test to: test[s_, count_] := Module[{data, f}, data = Table[{n, n^2} // N, {n, count}] // ToPackedArray; f = s[data // ToPackedArray]; Timing[Plot[f[x], {x, -5, count + 5}]]] and it works, if I'm not mistaken (added both //N and //PackedArray) – Sjoerd C. de Vries Jul 31 '11 at 21:00
• Well, we keep on learning. Keeps life exciting ;-) – Sjoerd C. de Vries Jul 31 '11 at 21:42

The following works:

``````stp0[x_][{{x1_,y1_}, {x2_,y2_}}] := {y1, x1 <= x < x2}
stepify[{}] := (0&)
stepify[data_] := With[{x0 = data[[1,1]], yz = data[[-1,2]]},
Function[x, Piecewise[Join[{{0, x<x0}}, stp0[x] /@ Partition[data, 2,1]], yz]]]
``````

Note that without the `With` it will leave things like `{{1,10},{2,20}}[[1,1]]` in the returned function, which seems a little wasteful.

By the way, I decided to call this stepify since it turns a list of points into a step function.