**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]`

.

puremean, is that a Mathematica concept? – starblue Jul 28 '11 at 10:46