Article ID Journal Published Year Pages File Type
1146765 Journal of Multivariate Analysis 2009 14 Pages PDF
Abstract

Linear dependence coefficients are defined for random fields of continuous-index, which are modified from those already defined for random fields indexed by an integer lattice. When a selection of these linear dependence conditions are satisfied, the random field will have a continuous spectral density function. Showing this involves the construction of a special class of random fields using a standard Poisson process and the original random field.

Related Topics
Physical Sciences and Engineering Mathematics Numerical Analysis
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