Numerical methods in approximation theory. Vol. 9: Proceedings of the conference held in Oberwolfach, Germany, November 24-30, 1991 (Q1341633)

The articles of this volume will be reviewed individually. Indexed articles: \textit{Baszenski, G.; Delvos, F.-J.; Jester, S.}, Blending approximations with sine functions, 1-19 [Zbl 0822.42008] \textit{Beatson, R. K.; Light, W. A.}, Quasi-interpolation in the absence of polynomial reproduction, 21-39 [Zbl 0832.41011] \textit{Binev, P.; Jetter, K.}, Estimating the condition number for multivariate interpolation problems, 41-52 [Zbl 0839.41009] \textit{Chui, Charles K.; Quak, Ewald}, Wavelets on a bounded interval, 53-75 [Zbl 0815.42016] \textit{Freund, Roland W.}, Quasi-kernel polynomials and convergence results for quasi-minimal residual iterations, 77-95 [Zbl 0814.65035] \textit{Heilmann, Margareta}, Rate of approximation of weighted derivatives by linear combinations of SMD operators, 97-115 [Zbl 0826.41023] \textit{Jia, Rong-Qing}, Approximation by multivariate splines: An application of Boolean methods, 117-134 [Zbl 0827.41006] \textit{Le Méhauté, A.; Bouhamidi, A.}, \(L^{m,\ell,s}\)-splines in \(\mathbb{R}^ d\), 135-154 [Zbl 0826.41028] \textit{Lenze, Burkhard}, Constructive multivariate approximation with sigmoidal functions and applications to neural networks, 155-175 [Zbl 0823.41016] \textit{Lyche, T.; Mørken, K.}, Spline-wavelets of minimal support, 177-194 [Zbl 0836.41012] \textit{Mulansky, Bernd}, Necessary conditions for local best Chebyshev approximations by splines with free knots, 195-206 [Zbl 0829.41027] \textit{Neff, A.; Peters, Jörg}, \(C^ 1\) interpolation on higher-dimensional analogues of the 4-direction mesh, 207-220 [Zbl 0829.41007] \textit{Powell, M. J. D.}, Tabulation of thin plate splines on a very fine two-dimensional grid, 221-244 [Zbl 0813.65014] \textit{Ron, Amos}, The \(L_ 2\)-approximation orders of principal shift-invariant spaces generated by a radial basis function, 245-268 [Zbl 0820.41014] \textit{Schaback, R.}, A multi-parameter method for nonlinear least-squares approximation, 269-283 [Zbl 0813.65088] \textit{Schempp, Walter}, Analog VLSI networks, 285-300 [Zbl 0939.68726] \textit{Schmeisser, G.}, Converse theorems for approximation on discrete sets. II, 301-316 [Zbl 0831.41013] \textit{Schmidt, Jochen W.}, A dual method for smoothing histograms using nonnegative \(C^ 1\)- splines, 317-329 [Zbl 0814.65010] \textit{Sommer, Manfred}, Segment approximation using linear functionals, 331-346 [Zbl 0813.65017] \textit{Traas, Cornelis}, Construction of monotone extensions to boundary functions, 347-357 [Zbl 0813.65018]