AbstractIn this paper we first revisit a classical problem of computing variational splines. We propose to compute local variational splines in the sense that they are interpolatory splines which minimize the energy norm over a subinterval. We shall show that the error between local and global variational spline interpolants decays exponentially over a fixed subinterval as the support of the local variational spline increases. By piecing together these locally defined splines, one can obtain a very good C0 approximation of the global variational spline. Finally we generalize this idea to approximate global tensor product B-spline interpolatory surfaces
Abstract. The convergence of the minimal energy interpolatory splines on the unit sphere is studied ...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
Abstract. We give a recipe for deriving local spline approximation meth-ods which reproduce the whol...
AbstractIn this paper we present an approximation problem of parametric curves and surfaces from a L...
There are two grounds the spline theory stems from -- the algebraic one (where splines are understoo...
that is not a subset of a single straight line, then we prove that a sequence of thin plate spline i...
AbstractOptimal nodal spline interpolantsWfof ordermwhich have local support can be used to interpol...
AbstractA constructive proof is given of the existence of a local spline interpolant which also appr...
In this paper we describe methods for computing smoothing and near-interpolatory (variational) subdi...
In this paper we give an overview of the variational approach to interpolation. Our particular inter...
AbstractIn this paper we study variational properties and convergence of quadratic spline interpolat...
AbstractAn interpolating spline which interpolates positive function values is not necessarily posit...
In this paper we consider the problem of developing a variational theory for interpolation by radial...
The fundamental problem of geometric design is the representation of curved shapes. Traditionally su...
In order to improve the computational efficiency of data interpolation, we study the progressive ite...
Abstract. The convergence of the minimal energy interpolatory splines on the unit sphere is studied ...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
Abstract. We give a recipe for deriving local spline approximation meth-ods which reproduce the whol...
AbstractIn this paper we present an approximation problem of parametric curves and surfaces from a L...
There are two grounds the spline theory stems from -- the algebraic one (where splines are understoo...
that is not a subset of a single straight line, then we prove that a sequence of thin plate spline i...
AbstractOptimal nodal spline interpolantsWfof ordermwhich have local support can be used to interpol...
AbstractA constructive proof is given of the existence of a local spline interpolant which also appr...
In this paper we describe methods for computing smoothing and near-interpolatory (variational) subdi...
In this paper we give an overview of the variational approach to interpolation. Our particular inter...
AbstractIn this paper we study variational properties and convergence of quadratic spline interpolat...
AbstractAn interpolating spline which interpolates positive function values is not necessarily posit...
In this paper we consider the problem of developing a variational theory for interpolation by radial...
The fundamental problem of geometric design is the representation of curved shapes. Traditionally su...
In order to improve the computational efficiency of data interpolation, we study the progressive ite...
Abstract. The convergence of the minimal energy interpolatory splines on the unit sphere is studied ...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
Abstract. We give a recipe for deriving local spline approximation meth-ods which reproduce the whol...