AbstractThe purpose of this paper is to investigate kernel density estimators for spatial processes with linear or nonlinear structures. Sufficient conditions for such estimators to converge in L1 are obtained under extremely general, verifiable conditions. The results hold for mixing as well as for nonmixing processes. Potential applications include testing for spatial interaction, the spatial analysis of causality structures, the definition of leading/lagging sites, the construction of clusters of comoving sites, etc
International audienceA non-parametric level set estimator of the density of a stationary d-dimensi...
International audienceIn this paper, we propose a nonparametric method to estimate the spatial densi...
International audienceA nonparametric density estimate that incorporates spatial dependency has not ...
The purpose of this paper is to investigate kernel density estimators for spatial processes with lin...
Kernel-type estimators of the multivariate density of stationary random fields indexed by multidimen...
International audienceWe are concerned with estimating the mode of a density of a spatial process by...
AbstractA general nonparametric density estimation problem is considered in which the data is genera...
International audienceWe investigate here a kernel estimate of A spatial regression function of a st...
© 2018 Hanyuan Hang, Ingo Steinwart, Yunlong Feng and Johan A.K. Suykens. We study the density estim...
This paper establishes a general moment inequality for spatial processes satisfying the α-mixing con...
AbstractLet X1,…,Xn be n consecutive observations of a linear process X1=μ+∑r=0∞ArZt−r, where μ is a...
Let X1,...,Xn be n consecutive observations of a linear process , where [mu] is a constant and {Zt} ...
Rate of convergence to normality for the density estimators of Kernel type is obtained when the obse...
We summarize and discuss the current state of spatial point process theory and directions for future...
Rate of convergence to normality for the density estimators of Kernel type is obtained when the obse...
International audienceA non-parametric level set estimator of the density of a stationary d-dimensi...
International audienceIn this paper, we propose a nonparametric method to estimate the spatial densi...
International audienceA nonparametric density estimate that incorporates spatial dependency has not ...
The purpose of this paper is to investigate kernel density estimators for spatial processes with lin...
Kernel-type estimators of the multivariate density of stationary random fields indexed by multidimen...
International audienceWe are concerned with estimating the mode of a density of a spatial process by...
AbstractA general nonparametric density estimation problem is considered in which the data is genera...
International audienceWe investigate here a kernel estimate of A spatial regression function of a st...
© 2018 Hanyuan Hang, Ingo Steinwart, Yunlong Feng and Johan A.K. Suykens. We study the density estim...
This paper establishes a general moment inequality for spatial processes satisfying the α-mixing con...
AbstractLet X1,…,Xn be n consecutive observations of a linear process X1=μ+∑r=0∞ArZt−r, where μ is a...
Let X1,...,Xn be n consecutive observations of a linear process , where [mu] is a constant and {Zt} ...
Rate of convergence to normality for the density estimators of Kernel type is obtained when the obse...
We summarize and discuss the current state of spatial point process theory and directions for future...
Rate of convergence to normality for the density estimators of Kernel type is obtained when the obse...
International audienceA non-parametric level set estimator of the density of a stationary d-dimensi...
International audienceIn this paper, we propose a nonparametric method to estimate the spatial densi...
International audienceA nonparametric density estimate that incorporates spatial dependency has not ...