Regression and Classification by Zonal Kriging

Abstract

Consider a family Z=\xi,yi,1≤ i≤ N\ of N pairs of vectors xi ∈ Rd and scalars yi that we aim to predict for a new sample vector x0. Kriging models y as a sum of a deterministic function m, a drift which depends on the point x, and a random function z with zero mean. The zonality hypothesis interprets y as a weighted sum of d random functions of a single independent variables, each of which is a kriging, with a quadratic form for the variograms drift. We can therefore construct an unbiased estimator y*(x0)=Σiλiz(xi) de y(x0) with minimal variance E[y*(x0)-y(x0)]2, with the help of the known training set points. We give the explicitly closed form for λi without having calculated the inverse of the matrices.