In this work we study continuous kernels on compact two-point homogeneous spaces which are positive definite and zonal (isotropic). Such kernels were characterized by R. Gangolli some forty years ago and are very useful for solving scattered data interpolation problems on the spaces. In the case the space is the d-dimensional unit sphere, J. Ziegel showed in 2013 that the radial part of a continuous positive definite and zonal kernel is continuously differentiable up to order ⌊(d−1)/2⌋ in the interior of its domain. The main issue here is to obtain a similar result for all the other compact two-point homogeneous spaces.CNPq (grant 141908/2015-7)FAPESP (grant 2014/00277-5
The correspondence between reproducing kernel Hilbert spaces and positive definite kernels is well u...
Positive definite functions of compact support are widely used for radial basis function approximati...
Conditionally positive definite kernels provide a powerful tool for scattered data approximation. Ma...
Neste trabalho analisamos a positividade definida estrita de núcleos contínuos sobre um espaço compa...
Abstract. We analyze term-by-term differentiability of uniformly con-vergent series of the form k=0 ...
Este trabalho é composto de duas partes distintas, ambas dentro de um mesmo tema: núcleos positivos ...
We prove that any continuous function with domain {z ∈ C: |z| ≤ 1} that generates a bizonal positive...
In this work, we generalize three famous results obtained by Schoenberg: I) the characterization of ...
AbstractThis paper characterizes several classes of conditionally positive definite kernels on a dom...
AbstractContinuous bizonal positive definite kernels on the spheres in Cq are shown to be a series o...
AbstractConditionally positive definite kernels are frequently used in multi-dimensional data fittin...
Abstract. Convolution is an important tool in the construction of positive definite kernels on a man...
AbstractThis paper deals with conditionally positive definite kernels on Euclidean spaces. The focus...
Positive definite kernels and their generalizations, as, e.g., the conditionally positive definite k...
Convolution is an important tool in the construction of positive definite kernels on a manifold. Thi...
The correspondence between reproducing kernel Hilbert spaces and positive definite kernels is well u...
Positive definite functions of compact support are widely used for radial basis function approximati...
Conditionally positive definite kernels provide a powerful tool for scattered data approximation. Ma...
Neste trabalho analisamos a positividade definida estrita de núcleos contínuos sobre um espaço compa...
Abstract. We analyze term-by-term differentiability of uniformly con-vergent series of the form k=0 ...
Este trabalho é composto de duas partes distintas, ambas dentro de um mesmo tema: núcleos positivos ...
We prove that any continuous function with domain {z ∈ C: |z| ≤ 1} that generates a bizonal positive...
In this work, we generalize three famous results obtained by Schoenberg: I) the characterization of ...
AbstractThis paper characterizes several classes of conditionally positive definite kernels on a dom...
AbstractContinuous bizonal positive definite kernels on the spheres in Cq are shown to be a series o...
AbstractConditionally positive definite kernels are frequently used in multi-dimensional data fittin...
Abstract. Convolution is an important tool in the construction of positive definite kernels on a man...
AbstractThis paper deals with conditionally positive definite kernels on Euclidean spaces. The focus...
Positive definite kernels and their generalizations, as, e.g., the conditionally positive definite k...
Convolution is an important tool in the construction of positive definite kernels on a manifold. Thi...
The correspondence between reproducing kernel Hilbert spaces and positive definite kernels is well u...
Positive definite functions of compact support are widely used for radial basis function approximati...
Conditionally positive definite kernels provide a powerful tool for scattered data approximation. Ma...