Add to ORKGOne of the fundamental results in spline interpolation theory is the famous Schoenberg-Whitney Theorem, which completely characterizes those distributions of interpolation points which admit unique interpolation by splines. However, until now there exists no iterative algorithm for the explicit computation of the interpolating spline function, and the only practicable method to obtain this function is to solve explicitly the corresponding system of linear equation's. In this paper we suggest a method which computes iteratively the coefficients of the interpolating function in its B-spline basis representation; the starting values of our one-step iteration scheme are quotients of two low order determinants in general,and sometimes even just ...
AbstractIn the context of local spline interpolation methods, nodal splines have been introduced as ...
It is an important fact that general families of Chebyshev and L-splines can be locally represented,...
AbstractThe usual interpolation method is that of Lagrange. The disadvantage of the method is that i...
One of the fundamental results in spline interpolation theory is the famous Schoenberg-Whitney Theor...
One of the fundamental results in spline interpolation theory is the famous Schoenberg-Whitney Theor...
AbstractSeveral properties of a class of interpolatory splines are studied. This class is a generali...
AbstractIn this article, we introduce some explicit formulas for the generalized case of (0,m1,m2,…,...
AbstractA method is described for the interpolation of N arbitrarily given data points using fifth d...
AbstractFor the evaluation of a polynomial spline function on a set of equidistant points the differ...
AbstractThe properties of cardinal splines satisfying a linear recurrence relation and interpolating...
It is often important in practice to obtain approximate representations of physical data by relative...
AbstractThis paper is concerned with interpolation of real functions on compact intervals by nonline...
AbstractThe aim of this paper is to describe an algorithm for computing co-monotone and/or co-convex...
AbstractThis paper is concerned with interpolation of real functions on compact intervals by nonline...
AbstractGiven an integrable function f, we are concerned with the construction of a spline Hn(f) of ...
AbstractIn the context of local spline interpolation methods, nodal splines have been introduced as ...
It is an important fact that general families of Chebyshev and L-splines can be locally represented,...
AbstractThe usual interpolation method is that of Lagrange. The disadvantage of the method is that i...
One of the fundamental results in spline interpolation theory is the famous Schoenberg-Whitney Theor...
One of the fundamental results in spline interpolation theory is the famous Schoenberg-Whitney Theor...
AbstractSeveral properties of a class of interpolatory splines are studied. This class is a generali...
AbstractIn this article, we introduce some explicit formulas for the generalized case of (0,m1,m2,…,...
AbstractA method is described for the interpolation of N arbitrarily given data points using fifth d...
AbstractFor the evaluation of a polynomial spline function on a set of equidistant points the differ...
AbstractThe properties of cardinal splines satisfying a linear recurrence relation and interpolating...
It is often important in practice to obtain approximate representations of physical data by relative...
AbstractThis paper is concerned with interpolation of real functions on compact intervals by nonline...
AbstractThe aim of this paper is to describe an algorithm for computing co-monotone and/or co-convex...
AbstractThis paper is concerned with interpolation of real functions on compact intervals by nonline...
AbstractGiven an integrable function f, we are concerned with the construction of a spline Hn(f) of ...
AbstractIn the context of local spline interpolation methods, nodal splines have been introduced as ...
It is an important fact that general families of Chebyshev and L-splines can be locally represented,...
AbstractThe usual interpolation method is that of Lagrange. The disadvantage of the method is that i...