# Efficient handling of list of small vectors with Compile

Often we need to process data consisting of a list of coordinates: `data = {{x1,y1}, {x2,y2}, ..., {xn,yn}}`. It could be 2D or 3D coordinates, or any other arbitrary length list of fixed length small vectors.

Let me illustrate how to use `Compile` for such problems using the simple example of summing up a list of 2D vectors:

``````data = RandomReal[1, {1000000, 2}];
``````

First, obvious version:

``````fun1 = Compile[{{vec, _Real, 2}},
Module[{sum = vec[[1]]},
Do[sum += vec[[i]], {i, 2, Length[vec]}];
sum
]
]
``````

How fast is it?

``````In[13]:= Do[fun1[data], {10}] // Timing
Out[13]= {4.812, Null}
``````

Second, less obvious version:

``````fun2 = Compile[{{vec, _Real, 1}},
Module[{sum = vec[[1]]},
Do[sum += vec[[i]], {i, 2, Length[vec]}];
sum
]
]

In[18]:= Do[
fun2 /@ Transpose[data],
{10}
] // Timing

Out[18]= {1.078, Null}
``````

As you can see, the second version is much faster. Why? Because the crucial operation, `sum += ...` is an addition of numbers in `fun2` while it's an addition of arbitrary length vectors in `fun1`.

You can see a practical application of the same "optimization" in this asnwer of mine, but many other examples could be given where this is relevant.

Now in this simple example the code using `fun2` is not longer or much more complex than `fun1`, but in the general case it very well might be.

How can I tell `Compile` that one of its arguments is not an arbitrary `n*m` matrix, but a special `n*2` or `n*3` one, so it can do these optimization automatically rather than using a generic vector addition function to add tiny length-2 or length-3 vectors?

To make it more clear what's happening, we can use `CompilePrint`:

`CompilePrint[fun1]` gives

``````        1 argument
5 Integer registers
5 Tensor registers
Underflow checking off
Overflow checking off
Integer overflow checking on
RuntimeAttributes -> {}

T(R2)0 = A1
I1 = 2
I0 = 1
Result = T(R1)3

1   T(R1)3 = Part[ T(R2)0, I0]
2   I3 = Length[ T(R2)0]
3   I4 = I0
4   goto 8
5   T(R1)2 = Part[ T(R2)0, I4]
6   T(R1)4 = T(R1)3 + T(R1)2
7   T(R1)3 = CopyTensor[ T(R1)4]]
8   if[ ++ I4 < I3] goto 5
9   Return
``````

`CompilePrint[fun2]` gives

``````        1 argument
5 Integer registers
4 Real registers
1 Tensor register
Underflow checking off
Overflow checking off
Integer overflow checking on
RuntimeAttributes -> {}

T(R1)0 = A1
I1 = 2
I0 = 1
Result = R2

1   R2 = Part[ T(R1)0, I0]
2   I3 = Length[ T(R1)0]
3   I4 = I0
4   goto 8
5   R1 = Part[ T(R1)0, I4]
6   R3 = R2 + R1
7   R2 = R3
8   if[ ++ I4 < I3] goto 5
9   Return
``````

I chose to include this rather than the considerably lengthier C version, where the timing difference is even more pronounced.

-
Perhaps this is an XY problem and the question should really be "how do I perform numerical tasks like this quickly"? If so, the correct answer is certainly "Mathematica is the wrong tool for this job". –  Jon Harrop Nov 21 '11 at 22:01
I disagree, Mathematica is well suited for this. –  user1054186 Nov 23 '11 at 8:53

Your addendum is actually almost enough to see what the problem is. For the first version, you invoke `CopyTensor` in an inner loop, and this is the main reason for inefficiency, since lots of small buffers must be allocated on the heap and then released. To illustrate, here is a version which does not copy:

``````fun3 =
Compile[{{vec, _Real, 2}},
Module[{sum = vec[[1]], len = Length[vec[[1]]]},
Do[sum[[j]] += vec[[i, j]], {j, 1, len}, {i, 2, Length[vec]}];
sum], CompilationTarget -> "C"]
``````

(by the way, I think that the speed comparison is more fair when compiled to C, since the Mathematica virtual machine does, for example, much more heavily discourage nested loops). This function is still slower than yours, but about 3 times faster than `fun1`, for such small vectors.

The rest of the inefficiency is, I believe, inherent to this approach. The fact that you can decompose the problem into solving for sums of individual components is what makes your second function efficient, because you use structural operations like `Transpose`, and, most importantly, this allows you to squeeze more instructions out of the inner loop. Because this is what matters the most - you must have as few instructions in an inner loop as possible. You can see from `CompilePrint` that this is indeed the case for `fun1` vs `fun3`. In a way, you found (for this problem) an efficient high-level way to manually unroll the outer loop (the one over the coordinate index). An alternative you suggest would ask the compiler to unroll the outer loop automatically, based on the extra information on vector dimensionality. This sounds like a plausible optimization, but has not probably been implemented for the Mathematica virtual machine yet.

Note also that for larger lengths of vectors (say 20), the difference between `fun1` and `fun2` disappears, because the cost of memory allocation / deallocation in tensor copying becomes insignificant compared to the cost of massive assignment (which is still implemented more efficiently when you assign vector to vector - perhaps because you can use things like `memcpy` in that case).

To conclude, I think that while it would be nice to have this optimization automatic, at least in this particular case, this is a kind of low-level optimization that is hard to expect to be fully automatic - even optimizing C compilers do not always perform it. One thing you could try is to hard-code the vector length into compiled function, then use `SymbolicCGenerate` (from `CCodeGenerator`` package) to generate symbolic C, then use `ToCCodeString` to generate the C code (or, whatever other way you use to get a C Code for the compiled function), and then try to create and load the library manually, enabling all optimizations for the C compiler via options to `CreateLibrary`. Whether or not this would work I don't know. EDIT I actually doubt that this will help at all, since the loops are already implemented with `goto`-s for speed when C code is generated, and this will likely prevent the compiler from attempting the loop unrolling.

-

It is always a good option to look for a function that does exactly what you want to do.

``````In[50]:= fun3=Compile[{{vec,_Real,2}},Total[vec]]

Out[50]= CompiledFunction[{vec},Total[vec],-CompiledCode-]

In[51]:= Do[fun3[data],{10}]//Timing

Out[51]= {0.121982,Null}

In[52]:= fun3[data]===fun1[data]

Out[52]= True
``````

Another option, less efficient (*due to the transpose *) is to use Listable

``````fun4 = Compile[{{vec, _Real, 1}}, Total[vec],
RuntimeAttributes -> {Listable}]

In[63]:= Do[fun4[Transpose[data]],{10}]//Timing

Out[63]= {0.235964,Null}

In[64]:= Do[Transpose[data],{10}]//Timing

Out[64]= {0.133979,Null}

In[65]:= fun4[Transpose[data]]===fun1[data]

Out[65]= True
``````
-
He probably used this simple example to illustrate the point, rather than because he was not aware of `Total`. –  acl Nov 18 '11 at 17:15
Hi Oliver! Finally, you are here! Welcome to SO, and of course +1. –  Leonid Shifrin Nov 18 '11 at 17:29
Welcome to StackOverflow! –  DForck42 Nov 18 '11 at 17:34
@Jon Harrop Congratulations! So far, you are doing everything right, provided that your goal is to make the SO Mathematica community maximally hostile to you. I find Oliver's post very relevant (if only to add more background on Compile), as his other posts here and on MathGroup, apart from the fact that he is one of the few people in the world with a genuine knowledge of internals of `Compile` and many other Mathematica features. –  Leonid Shifrin Nov 20 '11 at 19:33
@Jon the answer is not wrong, it is just not what you want it to be. –  user1054186 Nov 23 '11 at 15:49

How can I tell `Compile` that one of its arguments is not an arbitrary n*m matrix, but a special n*2 or n*3 one, so it can do these optimization automatically rather than using a generic vector addition function to add tiny length-2 or length-3 vectors?

You're trying to bail out the Titanic using a spoon!

On my machine with Mathematica 7.0.1 your first example takes 4s, your second takes 2s and `Total` takes 0.1s. So you have an objectively extremely inefficient solution (`Total` is 40× faster!) and have correctly identified and addressed one of the least important contributions to the poor performance (making it 2× faster).

Mathematica's poor performance stems from the way Mathematica code gets evaluated. From a programming language perspective, Mathematica's term rewriter might be a powerful solution for computer algebra but it is insanely inefficient for general-purpose program evaluation. Consequently, optimizations like specializing for 2D vectors will not pay off in Mathematica as they can in compiled languages.

I had a quick go at optimizing within Mathematica by writing out the code to add two vector elements at a time:

``````fun3 = Compile[{{vec, _Real, 2}},
Module[{x = vec[[1]][[1]], y = vec[[1]][[2]]},
Do[x += vec[[i]][[1]]; y += vec[[i]][[2]], {i, 2, Length[vec]}];
{x, y}]]
``````

This is actually even slower, taking 5.4s.

But this is Mathematica at its worst. Mathematica is only useful when either:

1. You really don't care about performance, or

2. Mathematica's vast standard library already includes functions (like `Total` in this specific case) that let you solve your problem efficiently either with a single call or by writing a script to make a few calls.

As ruebenko said, Mathematica does provide a built-in function to solve this problem for you with a single call (`Total`) but that is of no use in the general case that you are asking about. Objectively, the best solution is to avoid Mathematica's core inefficiency by porting your program to a language that is evaluated more efficiently.

For example, the most naive possible solution in F# (a compiled language I have to hand, but almost any other will do) is to use a 2D array:

``````let xs =
let rand = System.Random()
Array2D.init 1000000 2 (fun _ _ -> rand.NextDouble())

let sum (xs: float [,]) =
let total = Array.zeroCreate (xs.GetLength 1)
for i=0 to xs.GetLength 0 - 1 do
for j=0 to xs.GetLength 1 - 1 do
total.[j] <- total.[j] + xs.[i,j]
total

for i=1 to 10 do
sum xs |> ignore
``````

This is immediately 8× faster than your fastest solution! But wait, you can do better still by leveraging the static type system via your own 2D vector type:

``````[<Struct>]
type Vec =
val x : float
val y : float
new(x, y) = {x=x; y=y}

static member (+) (u: Vec, v: Vec) =
Vec(u.x+v.x, u.y+v.y)

let xs =
let rand = System.Random()
Array.init 1000000 (fun _ -> Vec(rand.NextDouble(), rand.NextDouble()))

let sum (xs: Vec []) =
let mutable u = Vec(0.0, 0.0)
for i=1 to xs.Length-1 do
u <- u + xs.[i]
u
``````

This solution takes just 0.057s, a whopping 70× faster than your original and substantially faster than any Mathematica-based solution posted here so far! A language compiled to efficient SSE code would likely do much better still.

You might think that a 70× is a freak special case but I have seen many examples where porting Mathematica code to other languages gave huge speedups:

• Sal Mangano's "performance critical" pricer for American options got a 960× speedup from being ported to F#.

• Sal Mangano's red-black trees in Mathematica got a 100× speedup from being ported to F#.

• My ray tracer in Mathematica got a 100,000× speedup from being ported to OCaml. Daniel Lichtblau of Wolfram Research later optimized the Mathematica but even his version was still 1,000× slower than my OCaml.

-
All code until now, used version 8. Yours is outdated and thus irrelevant. –  user1054186 Nov 20 '11 at 16:06
How does #F help the OP? Also irrelevant. –  user1054186 Nov 20 '11 at 16:07
@Jon, As we know very well, the real difference for American options is not as dramatic as you claim. To get the 960x difference, you compared the original (slowest) Mathematica code with your highly optimized F# based on my improved solution - not quite fair I think. In the comments to that very blog post, I gave the code which, even for 7.0. was about 40 times faster than the original (counting 8-core parallelism). Compilation to C gives another 2-3 times speedup. Given this, you can probably claim an order of magnitude speedup for F# at the most (including parallelism). –  Leonid Shifrin Nov 20 '11 at 19:11
Honestly, this looks more like a rant by someone who's still angry Stephen Wolfram parked on his favorite parking spot some 20 years ago rather than an actual answer to the question. The question was "How can I tell `Compile` that ...". Your answer is "You're stupid. Mathematica is bad, F# is good". Any reason we should not raise the "Not an answer" flag? –  Sjoerd C. de Vries Nov 20 '11 at 20:30
In general, you're right in that compiled v. interpreted mostly favors compiled. However, recent developments in JIT compilation is reducing that gap. I don't know how much Mathematica does this, but the tech is out there. –  rcollyer Nov 21 '11 at 22:04