# Math Problem: Scale a graph so that it matches another

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I have 2 tables of values and want to scale the first one so that it matches the 2nd one as good as possible. Both have the same length. If both are drawn as graphs in a diagram they should be as close to each other as possible. But I do not want quadratic, but simple linear weights. My problem is, that I have no idea how to actually compute the best scaling factor because of the Abs function.

Some pseudocode:

``````//given:
float[] table1= ...;
float[] table2= ...;

//wanted:
float factor= ???; // I have no idea how to compute this

float remainingDifference=0;
for(int i=0; i<length; i++)
{
float scaledValue=table1[i] * factor;
//Sum up the differences. I use the Abs function because negative differences are differences too.
remainingDifference += Abs(scaledValue - table2[i]);
}
``````

I want to compute the scaling factor so that the remainingDifference is minimal.

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Simple linear weights is hard like you said.

``````a_n = first sequence
b_n = second sequence
c = scaling factor
``````

Your residual function is (sums are from i=1 to N, the number of points):

``````SUM( |a_i - c*b_i| )
``````

Taking the derivative with respect to c yields:

``````  d/dc SUM( |a_i - c*b_i| )
= SUM( b_i * (a_i - c*b_i)/|a_i - c*b_i| )
``````

Setting to `0` and solving for `c` is hard. I don't think there's an analytic way of doing that. You may want to try http://math.stackexchange.com/ to see if they have any bright ideas.

However if you work with quadratic weights, it becomes significantly simpler:

``````  d/dc SUM( (a_i - c*b_i)^2 )
= SUM( 2*(a_i - c*b_i)* -c )
= -2c * SUM( a_i - c*b_i ) = 0
=> SUM(a_i) - c*SUM(b_i) = 0
=> c = SUM(a_i) / SUM(b_i)
``````

I strongly suggest the latter approach if you can.

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+1. Actually, there is no analytic solving method for the Least Absolute Deviations regression. In this case, using the (very simple!) least squares approach is most probably the best way to go. See also: en.wikipedia.org/wiki/Least_absolute_deviations#Solving_Methods – Ferdinand Beyer Jul 22 '11 at 13:55
Thanks for that reference! Was trying to work out a solution but couldn't think of anything better than iterative methods. Now I know why :) – tskuzzy Jul 22 '11 at 13:58
+1. I already ended up with a very similar formulation. As far as I understand it setting to 0 does not work well, because the function has sharp edges. In my specific case linear weights would be far better. But performance is very important too. I am going to wait a few more hours and accept this if nobody has another idea. – Floste Jul 22 '11 at 15:26
Wait, I have an idea (which I'm not sure is correct). Wouldn't you just have to check each `c` for which `a_i - c*b_i = 0`? The residuals as a function of `c` should be a piece-wise linear function so you should only have to check peaks/troughs for the minimum. Could someone confirm that I'm not crazy? – tskuzzy Jul 22 '11 at 15:47
Now that I think of it: Yeah, makes sense! I have a feeling that this won't be fast enough for me, but at least this sounds like an actual solution^^ – Floste Jul 22 '11 at 18:39

I would suggest trying some sort of variant on Newton Raphson.

Construct a function Diff(k) that looks at the difference in area between your two graphs between fixed markers A and B.

mathematically I guess it would be integral ( x = A to B ){ f(x) - k * g(x) }dx

anyway realistically you could just subtract the values,

like if you range from X = -10 to 10, and you have a data point for f(i) and g(i) on each integer i in [-10, 10], (ie 21 datapoints )

then you just sum( i = -10 to 10 ){ f(i) - k * g(i) }

basically you would expect this function to look like a parabola -- there will be an optimum k, and deviating slightly from it in either direction will increase the overall area difference

and the bigger the difference, you would expect the bigger the gap

so, this should be a pretty smooth function ( if you have a lot of data points )

so you want to minimise Diff(k)

so you want to find whether derivative ie d/dk Diff(k) = 0

so just do Newton Raphson on this new function D'(k)

kick it off at k=1 and it should zone in on a solution pretty fast

that's probably going to give you an optimal computation time

if you want something simpler, just start with some k1 and k2 that are either side of 0

so say Diff(1.5) = -3 and Diff(2.9) = 7

so then you would pick a k say 3/10 of the way (10 = 7 - -3) between 1.5 and 2.9

and depending on whether that yields a positive or negative value, use it as the new k1 or k2, rinse and repeat

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