Cardinal Interpolation With General Multiquadrics: Convergence Rates

Abstract

This article pertains to interpolation of Sobolev functions at shrinking lattices hZd from Lp shift-invariant spaces associated with cardinal functions related to general multiquadrics, φα,c(x):=(|x|2+c2)α. The relation between the shift-invariant spaces generated by the cardinal functions and those generated by the multiquadrics themselves is considered. Additionally, Lp error estimates in terms of the dilation h are considered for the associated cardinal interpolation scheme. This analysis expands the range of α values which were previously known to give such convergence rates (i.e. O(hk) for functions with derivatives of order up to k in Lp, 1<p<∞). Additionally, the analysis here demonstrates that some known best approximation rates for multiquadric approximation are obtained by their cardinal interpolants.