Dot Product: * Command vs. Loop gives different results

I have two vectors in Matlab, z and beta. Vector z is a 1x17:

1 0.430742139435890 0.257372971229541 0.0965909090909091 0.694329541928697 0 0.394960106863064 0 0.100000000000000 1 0.264704325268675 0.387774594078319 0.269207605609567 0.472226643323253 0.750000000000000 0.513121013402805 0.697062571025173

... and beta is a 17x1:

6.55269487769363e+26 0 0 -56.3867588816768 -2.21310778926413 0 57.0726052009847 0 3.47223691057151e+27 -1.00249317882651e+27 3.38202232046686 1.16425987969027 0.229504956512063 -0.314243264212449 -0.257394312588330 0.498644243389556 -0.852510642195370

I'm dealing with some singularity issues, and I noticed that if I want to compute the dot product of z*beta, I potentially get 2 different solutions. If I use the * command, z*beta = 18.5045. If I write a loop to compute the dot product (below), I get a solution of 0.7287.

summation=0;
for i=1:17
end

Any idea what's going on here?

Here's a link to the data: https://dl.dropboxusercontent.com/u/16594701/data.zip

-
you can also just use the matlab function "dot" to compute the dot product –  alrikai Apr 24 '13 at 20:22
@Amy: I've computed that with both your methods and with method natan posted below (on R2012a), and all three of them give 4.1232e+12. –  zplesivcak Apr 24 '13 at 20:23
@zplesivcak: The scaling of the variables is likely part of the problem, so the truncated data I gave doesn't show the problem. I've added a link to the data. I'm also using R2012a. –  Amy Apr 24 '13 at 20:34
If you really care about precise result, maybe try using some arbitrary precision library for Matlab; one is here. –  zplesivcak Apr 24 '13 at 20:46
@zplesivcak: Precision isn't so important, just consistency. I'm building a regression model...the outputs restats computed were small (ex: 0.7287), but when I manually compute the outputs using the beta value from regstats I get much larger values (ex: 18.5045). I'm using the residuals (from regstats) to train another model, so I need those to be consistent with what the regression model is actually predicting (z*beta). –  Amy Apr 24 '13 at 21:04

The problem here is that addition of floating point numbers is not associative. When summing a sequence of numbers of comparable magnitude, this is not usually a problem. However, in your sequence, most numbers are around 1 or 10, while several entries have magnitude 10^26 or 10^27. Numerical problems are almost unavoidable in this situation.

The wikipedia page http://en.wikipedia.org/wiki/Floating_point#Accuracy_problems shows a worked example where (a + b) + c is not equal to a + (b + c), i.e. demonstrating that the order in which you add up floating point numbers does matter.

I would guess that this is a homework assignment designed to illustrate these exact issues. If not, I'd ask what the data represents to suss out the appropriate approach. It would probably be much more productive to find out why such large numbers are being produced in the first place than trying to make sense of the dot product that includes them.

-
I'm attempting to build a regression model as part of my research. The huge entries in beta are a result of this. I now know the model is a poor fit, but I was surprised to see differing results for essentially the same computation. –  Amy Apr 24 '13 at 21:09
I would suggest that something is going wrong before the point where you get to the dot product. –  nibot Apr 24 '13 at 21:38

you don't need to loop. If you compare z*beta and sum(z.*beta') you should get the same result. Your for loop should also get the same result.

When using the numbers you wrote one obtains a value of 4.1232e+12 so I don't know how you get to the numbers you claim to get. Check that you don't have other variables with the same names in your code.

EDIT: I've used the data in the file you added as a link and I agree with @nibot. The magnitude of the numbers of beta will cause floating point errors.

-
sum(z.*beta') gives me the answer of 0.7287, while z*beta gives 18.5045. –  Amy Apr 24 '13 at 20:25
There are numerical problems because of some huge numbers in the data. –  nibot Apr 24 '13 at 20:42
I agree... ... ... –  natan Apr 24 '13 at 21:09
For me Matlab returns -0.5943 for 'z*beta' and 0.7287 for your method when using your data file. However when I copy the data from your question I get 4.1232e+012 in both cases (did a quick test and the data isn't the same, probably due to limit amount of digits behind the decimal point). I am currently using R2011b. –  fibonatic Apr 24 '13 at 21:46
It indeed has probably something to do with rounding errors. However I do not know why Matlab returns different values, since both methods should calculate in the same way (sort of checked this by creating symbolic vectors). I also did a test with converting both vectors to single precision, which yields 17.9102 for 'z*beta' and 0.7287 for your method. Strangely only the answer of the first method changes and your method returns the same value. –  fibonatic Apr 24 '13 at 22:07