A new type of B3-spline interpolation

A parallel implementation of Chebyshev method is presented for the B-spline surface interpolation problem. The algorithm finds the control points of a uniform bicubic B-spline surface that interpolates \(m \times n\) data points on an \(m \times n\) mesh-connected processor array in constant time. H

A theorist may wish to interpolate data known to be a func-Catalogue number: ACZG tion of two variables. Often the data are not known on a regular grid, but are distributed irregularly. The "best approx-Program obtainable from: CPC Program Library, Queen's imation" when interpolating data which can

Sections of parametric surfaces defined by equally spaced parameter values can be very unevenly spaced physically. This can cause practical problems when the surface is to be drawn or machined automatically. This paper describes a method for imposing a good parametrization on a curve constructed by