# What Algorithm can i use to find any valid result depending on variable integer inputs

In my project i face a scenario where i have a function with numerous inputs. At a certain point i am provided with an result and i need to find one combination of inputs that generates that result.

Here is some pseudocode that illustrates the problem:

Double y = f(x_0,..., x_n)

I am provided with y and i need to find any combination that fits the input.

I tried several things on paper that could generate something, but my each parameter has a range of 6.5 x 10^9 possible values - so i would like to get an optimal execution time.

Can someone name an algorithm or a topic that will be useful for me so i can read up on how other people solved simmilar problems.

I was thinking along the lines of creating a vector from the inputs and judjing how good that vektor fits the problem. This sounds awful lot like an NN, but there is no training phase available.

Edit: Thank you all for the feedback. The comments sum up the Problems i have and i will try something along the lines of hill climbing.

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I don't get what you are trying to achieve. Are you trying to find the possible inputs that yields the desired output? Without knowing what the function is - it is impossible to know, even if you can sample your function infinite number of times. However, if there is some knowledge on `f` - it might be done (for example: Is it a polynom?) –  amit Oct 15 '12 at 10:28
One view of what you are trying to do is to solve an inverse problem. Another view is that you are trying to select a vector of `x` values to minimise the difference between a computed `y` and the target `y`, which makes yours an optimisation problem. There are very many algorithms for tackling such problems, but without a lot more input about your problem there will be no good advice forthcoming. –  High Performance Mark Oct 15 '12 at 10:35
You seem to be asking for an equation solver. It depends very much on the kind of `f` and the domain of `x_i` which method to choose. For example, if the domain of `y` and `x_i` are real numbers and `f` is an polynomial (over real numbers), you need a polynomial root finder. –  Paul Michalik Oct 15 '12 at 10:44
If your input arguments are, as hinted at by the question title, all integers, you could start your researches at en.wikipedia.org/wiki/Combinatorial_optimization –  High Performance Mark Oct 15 '12 at 11:05

The general case for your problem might be impossible to solve, but for some cases there are numerical methods that can help you solve your problem.

For example, in 1D space, if you can find a number that is smaller then `y` and one that is higher then `y` - you can use the numerical method regula-falsi in order to numerically find the "root" (which is `y` in your case, by simply invoking the method on`f(x) -y`).
Other numerical method to find roots is newton-raphson
I admit, I am not familiar with how to apply these methods on multi dimensional space - but it could be a starter. I'd search the literature for these if I were you.
Note: using such a method almost always requires some knowledge on the function.

Another possible solution is to take `g(X) = |f(X) - y)|`, and use some heuristical algorithms in order to find a minimal value of `g`. The problem with heuristical methods is they will get you "close enough" - but seldom will get you exactly to the target (unless the function is convex)

Some optimizations algorithms are: Genethic Algorithm, Hill Climbing, Gradient Descent (where you can numerically find the gradient)

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