Le Cam spacings theorem in dimension two
Abstract
The definition of spacings associated to a sequence of random variables is extended to the case of random vectors in [0,1]2. Beirlant & al. (1991) give an alternative proof of the Le Cam (1958) theorem concerning asymptotic normality of additive functions of uniform spacings in [0,1]. I adapt their technique to the two-dimensional case, leading the way to new directions in the domain of Complete Spatial Randomness (CSR) testing.
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