Hi Suzanne,
In Ordinary (not Indicator) Kriging, the semivariogram is interpreted as the average squared difference in the values of two points, given their distance apart. Indicator Kriging, however, is slightly different. The semivariogram in this case is the average squared difference in the indicator values (0 or 1) of two points, given how far apart they are. When the semivariogram value is smaller, this means that the two points more likely to have the same indicator value.
The output is a surface reflecting the probability that a location has an indicator value of 1 (in your case, the probability that the location is clay).
Your second screenshot shows the cross-validation page for indicator kriging. For each input point, the indicator value is hidden, and the probability that the indicator value of the location is 1 is calculated based on neighbors. The graph then shows the true indicator value (Measured) plotted against the predicted probability that the point has indicator value equal to 1. Ideally, points with 0 for the measured value should have low predicted probabilities, and points with 1 for the measured value should have high probabilities.
Unfortunately, that's not quite what I'm seeing in your particular graph. Points whose true value was 0 (ie, sand points) still have reasonably high predicted probabilities of being clay. For a few of the points, the indicator kriging model actually thought they were more likely to be clay than sand (these are the red points on the left and above y=0.5). For the points that actually were clay, the indicator kriging model predicted that they were more likely to be sand than clay (notice that the points on the right all fall below y=0.5).
This can all be a bit confusing, but Indicator Kriging isn't really fundamentally different than the other types of kriging; it just transforms the data into indicator variables first and then proceeds identically.
-Eric
