In Map Algebra, what is NOT a characteristic of local operations?

Local operations in Map Algebra are characterized by the fact that they operate on each cell independently, meaning the calculations or transformations applied do not take into account the values of neighboring cells. This allows for the processing of data on a cell-by-cell basis, which is fundamental in creating outputs based solely on values from individual cells.

The correct answer highlights that local operations do not consider neighboring cells; rather, they generate an output strictly derived from the value of the single cell being evaluated. This independence is what distinguishes local operations from other types such as focal or zonal operations, which explicitly incorporate the values of neighboring cells or cells within a specified zone.

To summarize, local operations are defined by their focus on individual cells without the influence of adjacent cell data, which aligns with the principles of Map Algebra and contributes to spatial analyses where the behavior of each cell is evaluated distinctly.