DeltaCC12
ΔCC1/2 is a quantity, that detects datasets/frames, that are non-isomorphous. As described in Assmann and Diederichs (2016), ΔCC1/2 is calculated with the σ-τ method. This method is a way to calculate the Pearson correlation coefficient for the special case of two sets of values (intensities) that randomly deviate from their true values, but is not influenced by a random number sequence as shown in Karplus and Diederichs (2012). For the σ-τ method CC1/2 is calculated for all datasets/frames, which will be called CC1/2_overall and CC1/2 is calculated for all datasets/frames except for one dataset i, which is omitted from calculations and denoted as CC1/2_i. The difference of the two quantities is ΔCC1/2.
- [math]\displaystyle{ \Delta CC_{1/2}= CC_{1/2 overall}-CC_{1/2 i} }[/math]
If ΔCC1/2_ is > 0 -CC1/2_overall is bigger than CC1/2_i- that means if omitting dataset i from calculations, a lower CC1/2 results, which is why we want to keep it. Thus it is improving the whole merged dataset. If Δ CC1/2 is < 0, -CC1/2_overall is smaller than CC1/2_i - that means that by omitting dataset i from calculations a higher CC1/2 results, which is why we want to exclude it from calculations, because it is impairing the whole merged dataset.