On Spatial Transition Probabilities as Continuity Measures in Categorical Fields

Models of spatial transition probabilities, or equivalently, transiogram models have been recently proposed as spatial continuity measures in categorical fields. In this paper, properties of transiogram models are examined analytically, and three important findings are reported. Firstly, connections between the behaviors of auto-transiogram models near the origin and the spatial distribution of the corresponding category are carefully investigated. Secondly, it is demonstrated that for the indicators of excursion sets of Gaussian random fields, most of the commonly used basic mathematical forms of covariogram models are not eligible for transiograms in most cases; an exception is the exponential distance-decay function and models that are constructed from it. Finally, a kernel regression method is proposed for efficient, non-parametric joint modeling of auto- and cross-transiograms, which is particularly useful for situations where the number of categories is large