I want to generate Gaussian random numbers in MATLAB for long program which runs for many number of iterations. I used randn function, but is there a way to avoid negative results and generate random numbers in range from 1 to 100.
For example
X=0.02*randn;
How Can I get only positive values in specific range.
As Cheery wrote, a Gaussian distribution covers the whole real set, so there is no way to have numbers both normally distributed and limited in support.
A solution might be to truncate the values: regenerate the values when randn returns a value outside of the desired range.
This can be implemented quite easily (and naively) by the following code:
function x = randnlimit(mu, sigma, minVal, maxVal, varargin);
assert(mu>=minVal && mu<=maxVal);
assert(sigma>0);
x = mu + sigma*randn(varargin{:});
outsideRange = x<minVal | x>maxVal;
while nnz(outsideRange)>0
x(outsideRange) = mu + sigma*randn(nnz(outsideRange),1);
outsideRange = x<minVal | x>maxVal;
end
edit to summarize the discussion @Cheery and I had: You can choose: either you get a Gaussian, but then you are stuck with values that cover the whole real axis (so also negative values). On the other hand, if you need a limited range, you need to use a different distribution to generate samples from.
Which approach you need depends on your application. Whether the need for a limited support is primordial or the shape of the pdf is the most important.
The code I provided above will be limited to the range [minVal, maxVal] and approximately gaussian when you choose sigma and mu appropriately, i.e. mu = maxVal/2 + minVal/2 and n * sigma = maxVal - minVal. For a value of n larger than two, the distribution will be quite close to a real Gaussian. E.g. for n=2, I expect only 5% difference (for n=3, less than 1%). You can of course specify minVal = 0 and maxVal = +Inf to select the positive values only.
A Gaussian distribution by definition has a distribution of (-inf, inf). The standard deviation (sigma) is 1 by default. If you're looking for a uniform distribution over [1, 100] use 99*rand()+1 or randi([1 100]) for integers.
ps: for Gaussian distribution with range there is a solution (by setting the sigma and shifting maximum of the distribution) http://www.mathworks.com/matlabcentral/newsreader/view_thread/156521
function X=random_generator(n, x_max, x_min)
X=[x_min+((randn(n,n)).*(x_max-x_min))];
end
x_min here is not the minimum value - it is the average value (or the peak of the distribution). Distribution is symmetrical with respect to x_min. But negative values would not be removed as distribution defined on the whole X axis. Their probability will be smaller.
pps: from Matlab's manual
Generate values from a normal distribution with mean 1 and standard deviation 2: 1 + 2.*randn(100,1);
rand returns uniformly distributed samples. You can verify this for yourself by generating lots of samples and plotting its histogram. This will be quite a constant empirical pdf, certainly not bell-shaped.
rand, not randn. With randn, it indeed produces samples from a normal distribution with a clumsily specified range (as stated in the manual). But that will NOT prevent from generating negative samples. It is impossible to have both an exact Gaussian and limited support.
You have to choose a limited support distribution that have the desired properties, check http://en.wikipedia.org/wiki/List_of_probability_distributions. I have a similar problem I want to apply finite mixtures model to a limited support distribution, unfortunately, most of the algorithms focus on Gaussian distributions.
