# Sample uniformly at random from an n-dimensional unit simplex

Sampling uniformly at random from an n-dimensional unit simplex is the fancy way to say that you want n random numbers such that

• they are all non-negative,
• they sum to one, and
• every possible vector of n non-negative numbers that sum to one are equally likely.

In the n=2 case you want to sample uniformly from the segment of the line x+y=1 (ie, y=1-x) that is in the positive quadrant. In the n=3 case you're sampling from the triangle-shaped part of the plane x+y+z=1 that is in the positive octant of R3:

(Image from http://en.wikipedia.org/wiki/Simplex.)

Note that picking n uniform random numbers and then normalizing them so they sum to one does not work. You end up with a bias towards less extreme numbers.

Similarly, picking n-1 uniform random numbers and then taking the nth to be one minus the sum of them also introduces bias.

Wikipedia gives two algorithms to do this correctly: http://en.wikipedia.org/wiki/Simplex#Random_sampling (Though the second one currently claims to only be correct in practice, not in theory. I'm hoping to clean that up or clarify it when I understand this better. I initially stuck in a "WARNING: such-and-such paper claims the following is wrong" on that Wikipedia page and someone else turned it into the "works only in practice" caveat.)

Finally, the question: What do you consider the best implementation of simplex sampling in Mathematica (preferably with empirical confirmation that it's correct)?

Related questions

• It seems there are several methods that work fine - the only real differentiation is in speed and read-ability. What are your criterion other than 'best'?
– zdav
Jun 10, 2010 at 18:08
• Speed and readability are great criteria! Conciseness could be another. If you have an implementation that has anything at all going for it, go ahead and post it as an answer. Jun 10, 2010 at 22:35
• I think the Wikipedia warning is a little bogus; the authors of the paper cited are worrying about perfect uniformity for a discretized version of this problem. The 2nd algorithm described is perfectly correct from a mathematical point of view, and should work well in practice if you're prepared to regard 'random floating-point number from [0, 1]' as a good-enough approximation to 'random real number from [0, 1]'. Jun 11, 2010 at 10:17
• the link to sampling is dead Feb 21, 2013 at 17:39
• – Wok
Apr 30, 2013 at 11:48

This code can work:

samples[n_] := Differences[Join[{0}, Sort[RandomReal[Range[0, 1], n - 1]], {1}]]

Basically you just choose n - 1 places on the interval [0,1] to split it up then take the size of each of the pieces using Differences.

A quick run of Timing on this shows that it's a little faster than Janus's first answer.

• Thanks! I think this is pretty much isomorphic to the one I posted. Thanks for the speed comparison, btw! Jun 20, 2010 at 22:23
• Oh, indeed it is! Somehow I thought that yours was different, but it looks the same now that I've taken another look. Jun 21, 2010 at 0:15
• Are there generalizations on non-unit simplexes or even (simplicial) convex polytopes? Jul 17, 2014 at 8:27
• @Orient Can't you just scale up the result to whatever size you want? Jul 17, 2014 at 8:38
• @BenAlpert I can simply scale the result up to, for the one hand, triangulation of desired convex polytope in accordance with hypervolumes of the produced simplices, but, on the other hand, I cannot simply deform the unit simplex into arbitrary simplex by means of only the linear transformations and hold the uniformity of spatial distributions by doing so. Jul 17, 2014 at 8:43

After a little digging around, I found this page which gives a nice implementation of the Dirichlet Distribution. From there it seems like it would be pretty simple to follow Wikipedia's method 1. This seems like the best way to do it.

As a test:

In[14]:= RandomReal[DirichletDistribution[{1,1}],WorkingPrecision->25]
Out[14]= {0.8428995243540368880268079,0.1571004756459631119731921}
In[15]:= Total[%]
Out[15]= 1.000000000000000000000000

A plot of 100 samples:

alt text http://www.public.iastate.edu/~zdavkeos/simplex-sample.png

I'm with zdav: the Dirichlet distribution seems to be the easiest way ahead, and the algorithm for sampling the Dirichlet distribution which zdav refers to is also presented on the Wikipedia page on the Dirichlet distribution.

Implementationwise, it is a bit of an overhead to do the full Dirichlet distribution first, as all you really need is n random Gamma[1,1] samples. Compare below
Simple implementation

SimplexSample[n_, opts:OptionsPattern[RandomReal]] :=

Full Dirichlet implementation

DirichletDistribution/:Random`DistributionVector[
DirichletDistribution[alpha_?(VectorQ[#,Positive]&)],n_Integer,prec_?Positive]:=
Block[{gammas}, gammas =
Transpose[gammas]/Total[gammas]]

SimplexSample2[n_, opts:OptionsPattern[RandomReal]] :=
(#/Total[#])& @ RandomReal[DirichletDistribution[ConstantArray[1,{n}]],opts]

Timing

Timing[Table[SimplexSample[10,WorkingPrecision-> 20],{10000}];]
Timing[Table[SimplexSample2[10,WorkingPrecision-> 20],{10000}];]
Out[159]= {1.30249,Null}
Out[160]= {3.52216,Null}

So the full Dirichlet is a factor of 3 slower. If you need m>1 samplepoints at a time, you could probably win further by doing (#/Total[#]&)/@RandomReal[GammaDistribution[1,1],{m,n}].

Here's a nice concise implementation of the second algorithm from Wikipedia:

SimplexSample[n_] := Rest@# - Most@# &[Sort@Join[{0,1}, RandomReal[{0,1}, n-1]]]

That's adapted from here: http://www.mofeel.net/1164-comp-soft-sys-math-mathematica/14968.aspx (Originally it had Union instead of Sort@Join -- the latter is slightly faster.)

(See comments for some evidence that this is correct!)

• I just ran a test, and it seems to work ok - the values are pretty uniform and all on the right line. I'm not sure why it was downvoted.
– zdav
Jun 10, 2010 at 18:06
• The downvote was mine, and was accidental; I apologise. If you can make a trivial edit to your answer, I'll upvote. This method looks correct to me. Jun 11, 2010 at 10:12
• I was just going to post this same method. On my machine it is eight times faster than the method sampling Gamma[1,1].
– Timo
Jun 11, 2010 at 18:18
• Instead of doing Rest - Most, you can also just call the built-in Differences and that's the same thing. Jun 21, 2010 at 0:16

I have created an algorithm for uniform random generation over a simplex. You can find the details in the paper in the following link: http://www.tandfonline.com/doi/abs/10.1080/03610918.2010.551012#.U5q7inJdVNY

Briefly speaking, you can use following recursion formulas to find the random points over the n-dimensional simplex:

x1=1-R11/n-1

xk=(1-Σi=1kxi)(1-Rk1/n-k), k=2, ..., n-1

xn=1-Σi=1n-1xi

Where R_i's are random number between 0 and 1.

Now I am trying to make an algorithm to generate random uniform samples from constrained simplex.that is intersection between a simplex and a convex body.

• Do you know how you would alter this algorithm to place more weight on one dimension? Mar 17, 2021 at 18:06

Old question, and I'm late to the party, but this method is much faster than the accepted answer if implemented efficiently.

In Mathematica code: #/Total[#,{2}]&@Log@RandomReal[{0,1},{n,d}]

In plain English, you generate n rows * d columns of randoms uniformly distributed between 0 and 1. Then take the Log of everything. Then normalize each row, dividing each element in the row by the row total. Now you have n samples uniformly distributed over the (d-1) dimensional simplex.

I'll admit, I'm not sure why it works, but it passes every statistical test I can think of. If anyone has a proof of why this method works, I'd love to see it!