Is there a nice way to get randomly generated integers with normal distribution?
The first method which come to mi mind:
int rndi = (int)Math.floor(random.nextGaussian()*std);
Is there better way? Thanks
You should update the question to make clear what's exactly your use case.
According to your comment, you shouldn't be using normal distribution at all. Instead try one of many discrete distributions, since you want integers at the end. There are a lot of those, but I'd recommend one - very simple. It uses stochastic vector as the discrete probability distribution.
Here's example implementation:
Strictly speaking, you can't have normally distributed integers. Maybe what you want is the output of a normal distribution sorted into buckets. In that case, you probably want to shift and scale your normal distribution according to the size of your array. If you just take samples from a standard normal distribution (mean = 0 and scale = 1), you'll get samples between -2 and 2 around 99% of the time.
Suppose you want random samples from an array of size N. You want the entries in the middle to be chosen more often than the samples at the end, but you want the samples near the ends to come up occasionally, say 1% of the time. Then you may want to compute something like N/2 + N*z/4 where z is your standard normal then cast those numbers to an integer. If you do this, you'll occasionally get an index outside your array. Just test for that and get a new value when that happens.
That depends on what you are trying to do with those random numbers.
So if you are interested in high statistical quality you should really avoid Sun's implementation. Take a look at this "Not so random" applet for visual proof of how bad it is.
If statistical quality is a concern to You, the best you can do is use some external PRNG library.
You can precompute a list of "random" integers, then hand tweak that list to get the distribution you want.
Then when you want a "random" number, just pull the next available one from the list...
This way you ensure the distribution and therefore the probability of a particular item being selected. For fun, you can just "mix up" your list whenever you need.