Variable degree polynomial splines are Chebyshev splines

Extending a result recently obtained for Chebyshevian splines, we give a necessary and sufficient condition for the existence of blossoms (or, equivalently, of B-spline bases) for splines with connection matrices and with sections in different four-dimensional quasi-Chebyshev spaces. We apply this r

The aim of this paper is to describe applications of variable degree polynomials in the area of curve and surface construction. These polynomials have the same simple structure and the same properties as cubics with the advantage of a strong control on their shape, given by two degrees which play th

When using smoothing splines, a feature of the data, for example, a sharp turn, which we would like to retain is sometimes lost. If a smoothing spline with less than the usual order of continuity at the data points is fitted then we may retain this feature but at the cost of not smoothing out the pa