# monte carlo integration on a R^5 hypercube in MATLAB

I need to write MATLAB code that will integrate over a R^5 hypercube using Monte Carlo. I have a basic algorithm that works when I have a generic function. But the function I need to integrate is:

∫dA

A is an element of R^5.

If I had ∫f(x)dA then I think my algorithm would work.

Here is the algorithm:

``````% Writen by Jerome W Lindsey III

clear;
n = 10000;

% Make a matrix of the same dimension
% as the problem.  Each row is a dimension

A = rand(5,n);

% Vector to contain the solution

B = zeros(1,n);

for k = 1:n
% insert the integrand here
% I don't know how to enter a function {f(1,n), f(2,n), … f(5n)} that
% will give me the proper solution
% I threw in a function that will spit out 5!
% because that is the correct solution.
B(k) = 1 / (2 * 3 * 4 * 5);

end

mean(B)
``````
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Can you elaborate on what you're trying to integrate? Are you just trying to find the volume of the region? That's what integrating dA itself suggests to me. –  bnaul Sep 25 '11 at 18:30
Correct. I need a Monte Carlo algorithm that finds the volume of a unit cube in R^5. The volume is 1/5! –  JJJ Sep 25 '11 at 20:26
Did you forget to add the homework tag? –  user85109 Sep 25 '11 at 21:31
I did not. But this is HW, we just are not graded on programming. Don't ask me to explain it. –  JJJ Sep 25 '11 at 21:52
This doesn't make sense to me. The way you compute a MC integral is typically I ~= V * 1/N * (f_1 + ... + f_N). How do you plan to use this formula to find the volume? Seems circular to me. Furthermore, how do you figure that the volume of the unit cube in R^5 is 1/120? –  bnaul Sep 25 '11 at 23:42

In any case, I think I understand what the intent here is, although it does seem like somewhat of a contrived exercise. Consider the problem of trying to find the area of a circle via MC, as discussed here. Here samples are being drawn from a unit square, and the function takes on the value 1 inside the circle and 0 outside. To find the volume of a cube in R^5, we could sample from something else that contains the cube and use an analogous procedure to compute the desired volume. Hopefully this is enough of a hint to make the rest of the implementation straightforward.

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Thanks for your help but that is about the point where I arrived at before I asked the question. It sounds like you just proposing acceptance rejection. My question is not how to theoretically solve this problem, but how to do it in MATLAB. –  JJJ Sep 26 '11 at 0:59
Ok, then why are you still sampling from the hypercube in order to compute its volume? It's quite obvious this won't work: the only possible output of your proposed function is a vector of identical function values [1,1,...,1]. Your problem here is definitely NOT just a MATLAB one. You need to sample from something other than the hypercube itself in order to gain any useful information. –  bnaul Sep 26 '11 at 1:10
ok… That was stated in your previous response. I don't have a proposed function. I just hard coded the answer. I have no idea how to solve this problem. That is why I have asked for help but so far people have only stated to obvious. –  JJJ Sep 26 '11 at 1:33
I don't think I'm being too cryptic. The Wikipedia example shows how to find the volume of a circle by inscribing it in a square. How might you instead find the volume of a square by inscribing it in a circle? How would this generalize to R^5? It's possible there is an easier technique that still meets the requirements of the problem, but from what I can tell your problem is: "Find the volume of the unit hypercube in R^5 using Monte Carlo rather than by direct computation." The volume should be 1, by the way, since the volume of a multi-dimensional interval is simply the product of its sides. –  bnaul Sep 26 '11 at 2:03
Well then perhaps I have poorly described the integral, because the The volume was given as 1/120. When I integrate it analytically that is also what I get. So for at least those two reasons your answer is of no use. ∫dA = 1/120, A is an element of R^5, and the bounds of integration for all 5 variables is [0,1]. –  JJJ Sep 26 '11 at 18:03
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I'm guessing here a bit since the numbers you give as "correct" answer don't match to how you state the exercise (volume of unit hypercube is 1).

Given the result should be 1/120 - could it be that you are supposed to integrate the standard simplex in the hypercube?

The your function would be clear. f(x) = 1 if sum(x) < 1; 0 otherwise

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Well the integral I gave in the question is correct. Perhaps the confusions was in me calling it just the hypercube and not the standard simplex. What I wanted help with was in the if function in matlab. I kept getting syntax errors. Any how I figured out the solution: –  JJJ Sep 29 '11 at 19:25
``````%Question 2, problem set 1
% Writen by Jerome W Lindsey III

clear;
n = 10000;

% Make a matrix of the same dimension
% as the problem.  Each row is a dimension
A = rand(5,n);

% Vector to contain the solution
B = zeros(1,n);

for k = 1:n
% insert the integrand here
% this bit of code works as the integrand
if sum(A(:,k)) < 1
B(k) = 1;
end

end
clear k;

clear A;

% Begin error estimation calculations
std_mc = std(B);
clear n;
clear B;

% using the error I calculate a new random
% vector of corect length
N_new = round(std_mc ^ 2 * 3.291 ^ 2 * 1000000);
A_new = rand(5, N_new);
B_new = zeros(1,N_new);
clear std_mc;

for k = 1:N_new
if sum(A_new(:,k)) < 1
B_new(k) = 1;
end
end
clear k;

clear A_new;

% collect descriptive statisitics
M_new = mean(B_new);
std_new = std(B_new);
MC_new_error_999 = std_new * 3.921 / sqrt(N_new);
clear N_new;
clear B_new;
clear std_new;

% Display Results
disp('Integral in question #2 is');
disp(M_new);
disp(' ');
disp('Monte Carlo Error');
disp(MC_new_error_999);
``````
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