# Need mathematical function for “adding” 0.5 and 0.5 and getting 0.4 [closed]

I'm looking for a ["smooth"] mathematical function that would have the following attributes:

• Given two values 1.0 and 1.0 it produces 1.0
• Given two values less than 1.0, such as 0.5 and 0.5 it produces a number less than either number but greater than the product of the two numbers (eg, 0.4).
• Similarly, for two values greater than 1.0 it produces a number greater than either but less than their products.
• Ideally (not a hard requirement), the function is associative and commutative.
• Ideally (not a hard requirement), there is a "knob" one can turn to adjust the "strength" of the function, in terms of, eg, whether f(0.5,0.5) = 0.4 or instead 0.3.

Eg, I could simply use multiplication, where 0.5 * 0.5 = 0.25, but that results in a number (to be used as a weighting factor) that is too small.

Eg, exp(-pow(pow(fabs(log(A)), 0.5) + pow(fabs(log(B)), 0.5), 2.0)) sorta works -- might do it with adjustment of the exp factors.

After some experimentation (in a "toy" Java test program)

``````Math.exp(-Math.pow(Math.pow(Math.abs(Math.log(A)), fudge) + Math.pow(Math.abs(Math.log(B)), fudge), 1.0/fudge));
``````

comes pretty close, where "fudge" is roughly 2.0. It doesn't work right for values of A and B > 1.0, but I'm not sure how important that is.

## A more complete solution involves a more complex formula:

``````static double f(double A, double B, double fudge) {
double logA = Math.log(A);
double logB = Math.log(B);
double signA = Math.signum(logA);
double signB = Math.signum(logB);
double sum = signA * Math.pow(Math.abs(logA), fudge) + signB * Math.pow(Math.abs(logB), fudge);
double signSum = Math.signum(sum);
return Math.exp(signSum * Math.pow(Math.abs(sum), 1.0/fudge));
}
``````

This appears to work for values > 1.0.

The purpose of the function is to combine ad-hoc weighting values. The weighting values are being applied to a probability multiplier which may be > or < 1.0 by 0.4 or so. The weighting is basically to compensate for non-independence between "observations" (in a Bayesian inference algorithm), and the idea is to reduce the multiplier towards one by raising it to the power of the weighting value (which is typically less than 1). But if more than one weighting value is applied (more than one prior "observation" is interdependent with this one) the simple multiplication of weighting values overdoes it a bit, so we need to come up with a way to combine values in a "softer" fashion.

(Note: This is "programming related" because I want to use the function in a program.)

Epilog (for those who still see the need to downvote this question): I asked the same question on math.stackexchange.com and communally we worked out a formula. It's been in production for about a year now and seems to be working pretty well. And the question got 8 upvotes.

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So, what's the question? Each of those steps seems pretty self-explanatory and easy to code. Also, is this homework? It seems like the sort of problem you would do for school. –  Bryan Oakley Jul 27 '11 at 18:49
No, this isn't programming related. Defining the mathematical function, and implementing it as code are two different questions. You are asking the first, which needs no programming expertise. Voting to close. –  ire_and_curses Jul 27 '11 at 18:52
Gee thanks, guys. No one wants to strain their brain on this, even a little?? –  Hot Licks Jul 27 '11 at 18:55
@Daniel, we only strain our brain after we feel comfortable you've reasonably strained yours. –  user414076 Jul 27 '11 at 18:57
Sorry, but this might work on math.stackexchange.com. It doesn't really work here. That said, I like the question. :P –  Chris Cunningham Jul 27 '11 at 19:09

## closed as off topic by ire_and_curses, Bertrand Marron, leonbloy, Jacob, Robert Harvey♦Jul 27 '11 at 21:19

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Try this: f(x,y) = ((x+y)/2)^1.5

I guess that varying the 1.5 between would adjust the strength and values between ]0 and 2[ would keep your specs true (atleast for when x == y, not sure for when x!=y)

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I tried this algorithm but it didn't produce the correct behavior, even when trying several different exponents. +1 for giving it a try, though. –  Hot Licks Jul 28 '11 at 11:12

Try something like this:

``````f(x) = x^y, where 1 < y < 2.
``````

You can work something out for two inputs on your own.

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Actually, the thing I want to do is to use the resulting value as an exponent. But I need to combine multiple values into a single exponent (for adjusting weighting factors) in a uniform (non-random, continuous) way. –  Hot Licks Jul 27 '11 at 18:58
``````Random.NextDouble(lessnum, product);