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I'm working on a pattern recognition project and in there I want to sample a 2 dimensional normal distribution with given parameters (mean and covariance matrix). For example if I want to have 100 samples from normal distribution, I use mvnrnd(mu,sigma,100) where mu and sigma are assumed to be available. But mvnrnd returns 100 unique samples but I want to have samples even with duplicated values. (I mean how to get 100 samples but not necessarily with unique values) What should I do?

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I don't see anything in the documentation that says it generates unique samples. –  Oliver Charlesworth Dec 11 '11 at 22:45
Besides, the probability of getting non-unique samples is exactly zero. –  dantswain Dec 11 '11 at 22:47
@dantswain: with real numbers, yes, but not with fixed precision floating point arithmetic. –  André Caron Dec 11 '11 at 23:02
@AndréCaron OK. s/exactly zero/vanishingly small to the point of being effectively zero (or whatever, I mean, you can do mvnrnd(1, 1e-10, 2) but then your problem is just poorly posed)/. Either way, @Oli Charlesworth is correct. –  dantswain Dec 11 '11 at 23:11

2 Answers 2

It doesn't say anywhere in the mvnrnd documentation that the samples are guaranteed to be unique, though if your problem is posed in a reasonable manner then this shouldn't be an issue anyways.

Either way, if you're not happy with mvnrnd, this should be equivalent:

% draw 100 samples from a 2D bivariate normal distribution with unit variance and zero mean:
R = randn(2, 100);
% scale by the square root (see http://en.wikipedia.org/wiki/Cholesky_decomposition) of sigma
R1 = chol(sigma)*R;
% offset by the mean
R2 = bsxfun(@plus, R1, mu);
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correction: Cholesky decomposition in MATLAB returns an upper triangular matrix, thus you need a transpose in the multiplication: R1 = chol(sigma)'*R –  Amro Oct 24 '12 at 17:43

Check out the normrnd() function. It generates normally distributed random numbers.

To generate a 1-by-100 vector of normally distributed random numbers with mean mu and standard deviation sigma, use the following statement.

X = normrnd(mu,sigma,[1 100]);
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Or if you don't have the Stats Toolbox, simply sigma*randn(1, 100) + mu. –  Oliver Charlesworth Dec 11 '11 at 22:44
Also, this doesn't generate multivariate random numbers (AFAICS). –  Oliver Charlesworth Dec 11 '11 at 22:46
@OliCharlesworth That should be sqrt(sigma) (only works for scalars). –  dantswain Dec 11 '11 at 23:27
@dantswain: Nope, sigma is the standard deviation. –  Oliver Charlesworth Dec 11 '11 at 23:34
Oh. Haha. Whoops. I was thinking of in the question where it's the covariance - so in the scalar case it'd be the variance :) –  dantswain Dec 11 '11 at 23:41

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