Lower Bounds for Norms of Inverses of Interpolation Matrices for Radial Basis Functions

Radial basis function interpolation has attracted a lot of interest in recent years. For popular choices, for example thin plate splines, this problem has a variational formulation, i.e. the interpolant minimizes a semi-norm on a certain space of radial functions. This gives rise to a function space

This article reports further progress using ;I new method for determining lower bounds to energies of atomic systems with more than two ekctrons. Here we $ve new lower bounds for the lowest points of the continuous spectrum of rodin lithium.

We consider error estimates for interpolation by a special class of compactly supported radial basis functions. These functions consist of a univariate polynomial within their support and are of minimal degree depending on space dimension and smoothness. Their associated ``native'' Hilbert spaces ar