Available with Geostatistical Analyst license.

The Densify Sampling Network tool can be used to determine the best places for adding new sampling locations to a monitoring network based on the predefined selection criterion.

Several criteria can be used to determine where to add a station, including the maximum prediction uncertainty and the highest probability that a specified threshold value is exceeded.

The tool utilizes an existing geostatistical layer, created using a kriging or cokriging model with measurements at the existing monitoring stations, to determine prediction standard error, the interquartile range, and the probability that a specified threshold is exceeded for every input location.

If maximum prediction standard error, *stderr(s)*, is used as a criterion, a new sampling location is chosen so as to minimize *stderr(s),* and the optimality criterion *O*_{0}*(s) * can be expressed as:

*O*_{0}*(s)* = maximum of *stderr(s)*

The probability of exceeding a threshold value can be used to weigh the prediction standard error or the interquartile range (the interquartile range *Z*_{0.75}*(s)* - *Z*_{0.25}*(s)* is often used instead of the prediction standard error if the prediction distribution is not symmetrical). For example, if that probability is equal to *0.5*, the optimality criterion *O _{1}(s) *is equal to the maximum of the prediction standard error:

*O*_{1}*(s)* = maximum of *stderr(s)*(1-2ยท*abs(prob*[*Z(s)*>*Z*_{threshold}]-0.5))

The criterion value decreases as the uncertainty about exceeding the threshold value decreases. Adding the locations with the largest weighted prediction standard error *O*_{0}*(s)* to the monitoring network will improve predictions near the threshold value.

It is often useful to multiply the optimization criteria by the a priori inclusion probability (input weight raster) values. For example, values equal to 1 can be assigned to the areas where new monitoring stations are allowed, and values of 0 are assigned otherwise.

It is important to use the prediction standard errors, which depend not only on the monitoring network density but also on the measurement values. This can be achieved by using the data detrending and data transformation options.