# Parallel Normal Distributions

I'm working on a simulation where a large task is completed by a series of independent smaller tasks either in parallel or in series. The smaller task's time of completion follows a normal distribution with a mean time say "t" and a variance say "v". I understand that if this task is repeated in series say "n" times than the new total time distribution is normal with mean t*n and variance v*n, which is nice but I don't know what happens to the mean and variance if a set of the same tasks are done simultaneously/in parallel, it's been a while since prob stat class. Is there a nice/fast way to find the new time distribution for "n" of these independent normally distributed task done in parallel?

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You might find this question on Math.StackExchange interesting: math.stackexchange.com/questions/89030/… –  Mathias Dec 8 '12 at 3:38
Really variance is additive? Think about it. If I know the average and run then all then the sum of mean will have a variance of zero. –  Blam Dec 8 '12 at 14:18
I may be wrong but I believe this describes how to add normal/gaussian random variables: en.wikipedia.org/wiki/…. –  zahmde Dec 8 '12 at 22:10

If the tasks are undertaken independently and in parallel, the distribution of time until completion depends on the time of the longest process.

Unfortunately, the max function doesn't have particularly nice properties for theoretical analysis, but if you're already simulating there's an easy way to do it. For each subprocess i with mean t_i and variance v_i, draw time until completion for each i independently then look at the biggest. Repeating this lots of times will give you a bunch of samples from the max distribution you're interested in: you can compute the expectation (average), variance, or whatever you want.

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That's basically what I've done for now, I guess I thought there might be a more elegant approach. The numbers change each time and trying to approximate it every time is a real drag on the application. –  zahmde Dec 11 '12 at 8:22
Do the means or component distributions change over time? If not, you can pre-compute the samples. And sampling is a perfectly elegant method for determining the properties of probability distributions! –  Ben Allison Dec 11 '12 at 9:48

The question is, what is the distribution of the maximum (greatest value) of the random completion times. The distribution function (i.e. the indefinite integral of the probability density) of the maximum of a collection of independent random variables is just the product of the distribution function of each variable. (The distribution function of the minimum is just 1 - (product of (1 - distribution function)).)

If you want to find a time such that probability(maximum > time) = (some given value), you might be able to solve that exactly, or resort to a numerical method. Still, solving the equation numerically (e.g. bisection method) is much faster and more accurate than a Monte Carlo method, as you mentioned you have already tried.

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