1986
DOI: 10.1007/bf00897654
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An interpolation method taking into account inequality constraints: I. Methodology

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Cited by 61 publications
(31 citation statements)
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“…where f m (u) are low-order polynomials corresponding to the drift functions in Kriging, and ϒ(:) is a set of parametric functionals, which is equivalent to the variogram when it is replaced with a generalized covariance of an intrinsic RF (Chilès and Delfiner, 1999;Cressie, 1993;Dubrule and Kostov, 1986). For example, in one-dimensional space R 1 , ϒ(u, u k ) = ϒ(|h|) = |h| 3 , in two-dimensional space R 2 , ϒ(u, u k ) = ϒ(|h|) = |h| 2 log(|h|), where |h| denotes the distance between u and u k .…”
Section: Constrained Thin-plate Splinesmentioning
confidence: 99%
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“…where f m (u) are low-order polynomials corresponding to the drift functions in Kriging, and ϒ(:) is a set of parametric functionals, which is equivalent to the variogram when it is replaced with a generalized covariance of an intrinsic RF (Chilès and Delfiner, 1999;Cressie, 1993;Dubrule and Kostov, 1986). For example, in one-dimensional space R 1 , ϒ(u, u k ) = ϒ(|h|) = |h| 3 , in two-dimensional space R 2 , ϒ(u, u k ) = ϒ(|h|) = |h| 2 log(|h|), where |h| denotes the distance between u and u k .…”
Section: Constrained Thin-plate Splinesmentioning
confidence: 99%
“…The coefficients of constrained thin-plate splines are determined by finding a unique minimizer of the quadratic form of Equation (22), and then constraining the minimization problem via equality and inequality constraints. In two papers Dubrule and Kostov (1986), Kostov and Dubrule (1986), they developed a method for constrained point-to-point Kriging prediction on the analogy of dual Kriging formalism with splines. In essence, the algorithm replaces the strongest inequality data, which violate some inequality constraints when the initial prediction using only areal data is evaluated against bound values, so that all the other constraints are automatically satisfied .…”
Section: Constrained Area-to-point Predictionmentioning
confidence: 99%
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“…This is because, if this approach is used in generating conditional realizations of the modeled process, the ensemble of realizations yields a finite probability for elements of s being equal to the constraint value, which is contrary to the definition of continuous random variables. A related approach, based on spline formalism, was presented in Dubrule and Kostov [1986].…”
Section: Constrained Interpolation and Inverse Modelingmentioning
confidence: 99%