I have two 2D arrays with the same shape (105,234) named A & B essentially comprised of mean values from other arrays. I am familiar with Python's scipy package, but I can't seem to find a way to test whether or not the two arrays are statistically significantly different at each individual array index. I'm thinking this is just a large 2D paired Ttest, but am having difficulty. Any ideas or other packages to use?
If we assume that the underlying variance for each mean at the gridpoints is the same, and the number of observations is the same or is known, then we can use the arrays of means to estimate the standard deviation of the means directly. Dividing the difference between gridpoints by the standard deviation, then gives t distributed random variables, that can be directly tested, i.e. the pvalue can be calculated. As tests for many points, we will run into a multiple testing problem http://en.wikipedia.org/wiki/Multiple_comparisons#Largescale_multiple_testing and the pvalues should be corrected. 


I assume that x,y coordinates do not matter and we just have the two huge sets of independent measurements. One of the possible approaches could be just to compute standard deviation of mean for each array, multiply this value to the Student coefficient (probably somewhat 1.645 for your astronomic number of samples and 95 % confidence level) and obtain the confidence ranges around the mean this way. If the confidence ranges of the two different arrays overlap, the difference between them is not significant. Formulas can be found here. 


If your question is "Do twodimensional distributions differ ?", see
Numerical Recipes p. 763 


ttest2
isscipy.stats.ttest_ind
. But neither of them is checking if the arrays are "statistically significantly different at each individual array index." What they do is compare the arrays column to column (for Matlab, rows in default SciPy). If you don't understand that statistical significance cannot be figured out from just two means, I'd suggest using therandom
module to generate your test results: at least you won't have the illusion of certainty... – Jaime Jan 6 '13 at 2:40