Stable local bases for multivariate spline spaces

We present an algorithm for constructing stable local bases for the spaces Srd(Δ) of multivariate polynomial splines of smoothness r⩾1 and degree d⩾r2n+1 on an arbitrary triangulation Δ of a bounded polyhedral domain Ω⊂n, n⩾2

Burst Motorkortexstimulation zur Behandlung von Schlaganfall-assozierten Schmerzsyndromen

Advances in the mathematical theory behind Hardy's multiquadric method, development of methods for surfaces with tension parameters or which satisfy constraints, and methods for least squares approximation and subset selection are discussed. This report was prepared for the proceedings of The International Workshop on Multivariate Approximation, held in Santiago, Chile, in December 1986.http://archive.org/details/recentadvancesin00fra