AbstractA non-uniform, variational refinement scheme is presented for computing piecewise linear curves that minimize a certain discrete energy functional subject to convex constraints on the error from interpolation. Optimality conditions are derived for both the fixed and free-knot problems. These conditions are expressed in terms of jumps in certain (discrete) derivatives. A computational algorithm is given that applies to constraints whose boundaries are either piecewise linear or spherical. The results are applied to closed periodic curves, open curves with various boundary conditions, and (approximate) Hermite interpolation
In this paper we present a family of Non-Uniform Local Interpolatory (NULI) subdivision schemes, der...
In this paper, the theory of abstract splines is applied to the variational refinement of (periodic)...
AbstractWe propose and analyze a class of algorithms for the generation of curves and surfaces. Thes...
AbstractA non-uniform, variational refinement scheme is presented for computing piecewise linear cur...
A non-uniform, variational refinement scheme is presented for computing piecewise linear curves that...
Sufficient conditions are given for C1 and C2 (subdivision) curves generated by a particular non-uni...
Methods for the construction of constrained and smoothing subdivided surfaces will be presented. The...
We solve various variational spline curve problems subject to polygonal constraints, including best ...
The aim of the present paper is to review the basic ideas of the so called abstract schemes (AS) and...
In this paper we present a family of Non-Uniform Local Interpolatory (NULI) subdivision schemes, der...
A constrained variational curve is a curve that minimizes some energy functional under certain inter...
International audienceThis article introduces a new class of constraints for spline variational mode...
Abstract. In this paper, the conditions derived in [10] for the existence of minimizers to the nonli...
This paper is concerned with the computation of solutions to the problem of best near-interpolation ...
AbstractIn this paper, the theory of abstract splines is applied to the variational refinement of (p...
In this paper we present a family of Non-Uniform Local Interpolatory (NULI) subdivision schemes, der...
In this paper, the theory of abstract splines is applied to the variational refinement of (periodic)...
AbstractWe propose and analyze a class of algorithms for the generation of curves and surfaces. Thes...
AbstractA non-uniform, variational refinement scheme is presented for computing piecewise linear cur...
A non-uniform, variational refinement scheme is presented for computing piecewise linear curves that...
Sufficient conditions are given for C1 and C2 (subdivision) curves generated by a particular non-uni...
Methods for the construction of constrained and smoothing subdivided surfaces will be presented. The...
We solve various variational spline curve problems subject to polygonal constraints, including best ...
The aim of the present paper is to review the basic ideas of the so called abstract schemes (AS) and...
In this paper we present a family of Non-Uniform Local Interpolatory (NULI) subdivision schemes, der...
A constrained variational curve is a curve that minimizes some energy functional under certain inter...
International audienceThis article introduces a new class of constraints for spline variational mode...
Abstract. In this paper, the conditions derived in [10] for the existence of minimizers to the nonli...
This paper is concerned with the computation of solutions to the problem of best near-interpolation ...
AbstractIn this paper, the theory of abstract splines is applied to the variational refinement of (p...
In this paper we present a family of Non-Uniform Local Interpolatory (NULI) subdivision schemes, der...
In this paper, the theory of abstract splines is applied to the variational refinement of (periodic)...
AbstractWe propose and analyze a class of algorithms for the generation of curves and surfaces. Thes...