We prove that any continuous function with domain {z ∈ C: |z| ≤ 1} that generates a bizonal positive definite kernel on the unit sphere in 'C POT.Q' , q ⩾ 3, is continuously differentiable in {z ∈ C: |z| < 1} up to order q − 2, with respect to both z and 'Z BARRA'. In particular, the partial derivatives of the function with respect to x = Re z and y = Im z exist and are continuous in {z ∈ C: |z| < 1} up to the same order
Convolution is an important tool in the construction of positive definite kernels on a manifold. Thi...
nuloIn this paper we present an overview of the implications of our previously derived results for p...
Abstract. Convolution is an important tool in the construction of positive definite kernels on a man...
Abstract. We analyze term-by-term differentiability of uniformly con-vergent series of the form k=0 ...
AbstractContinuous bizonal positive definite kernels on the spheres in Cq are shown to be a series o...
In this work we study continuous kernels on compact two-point homogeneous spaces which are positive ...
AbstractThis paper characterizes several classes of conditionally positive definite kernels on a dom...
We show that isotropic positive definite functions on the d -dimensional sphere which are 2k times ...
We characterize complex strictly positive definite functions on spheres in two cases, the unit spher...
AbstractWe derive a set of differential inequalities for positive definite functions based on previo...
We characterize complex strictly positive definite functions on spheres in two cases, the unit spher...
We prove that any isotropic positive definite function on the sphere can be written as the spherical...
We show that, for positive de finite kernels, ifspecific forms of regularity (continuity, S-n-differ...
We derive a set of differential inequalities for positive definite functions based on previous resul...
In this work, we generalize three famous results obtained by Schoenberg: I) the characterization of ...
Convolution is an important tool in the construction of positive definite kernels on a manifold. Thi...
nuloIn this paper we present an overview of the implications of our previously derived results for p...
Abstract. Convolution is an important tool in the construction of positive definite kernels on a man...
Abstract. We analyze term-by-term differentiability of uniformly con-vergent series of the form k=0 ...
AbstractContinuous bizonal positive definite kernels on the spheres in Cq are shown to be a series o...
In this work we study continuous kernels on compact two-point homogeneous spaces which are positive ...
AbstractThis paper characterizes several classes of conditionally positive definite kernels on a dom...
We show that isotropic positive definite functions on the d -dimensional sphere which are 2k times ...
We characterize complex strictly positive definite functions on spheres in two cases, the unit spher...
AbstractWe derive a set of differential inequalities for positive definite functions based on previo...
We characterize complex strictly positive definite functions on spheres in two cases, the unit spher...
We prove that any isotropic positive definite function on the sphere can be written as the spherical...
We show that, for positive de finite kernels, ifspecific forms of regularity (continuity, S-n-differ...
We derive a set of differential inequalities for positive definite functions based on previous resul...
In this work, we generalize three famous results obtained by Schoenberg: I) the characterization of ...
Convolution is an important tool in the construction of positive definite kernels on a manifold. Thi...
nuloIn this paper we present an overview of the implications of our previously derived results for p...
Abstract. Convolution is an important tool in the construction of positive definite kernels on a man...