sadly I'm not really experienced in using random numbers in programming, despite the use of uniform integers in range. Therefore i have to questions regarding this topic.

**Question 1 (more specific):**

I'm looking for a way to chose array elements (dynamic size, but known) according to a probability distribution similar to the curve of *"exponential decay"* (http://en.wikipedia.org/wiki/Exponential_decay).
**Meaning:** i want to prefer to chose the first elements rather than the others. I want an monotonic decreasing function (no growing before decreasing like in many well-known probability-distributions like the gamma-distribution).

Maybe the geometric-distribution is something which i could use? But then i need an answer to my second question regarding the scaling of this distribution to array indexes.

*The dual method to prefer choosing the last elements rather than the first would be ok too, of course.*

**Question 2 (more general):**
Is there a concept in any implementation which will scale me any continuous random-distribution to a given array-range (including discretization)?

Example: Use a gaussian normal distribution and the result is always a valid index in some array (meaning: the middle elements are preferred).

Could this (link text) be something like i want to use?

**Platform and Libraries:**
I'm programming in **C++** and use the **boost::random** library at the moment (link text), but i'm willing to use something like the the **gsl library** or other *quality* libraries.

**One more wish:**
I would prefer a way using some *quality* libraries rather than some quick-and-dirty custom_functions.

Thanks!