Add to ORKGSince the free parameter and the two auxiliary points have effect on the shape of the Cardinal spline curves, a natural idea arises to find the optimal parameter and auxiliary points to obtain the smoothest curves. We use curvature variation minimization to achieve this goal in this paper. By minimizing an appropriate approximation of the curvature variation energy, the unique solution can be easily obtained. Some examples show that the Cardinal spline curves with minimum curvature variation are better than the Catmull-Rom spline curves in dealing with interpolation problems
Here we search for the curve which has the smallest integral of the square of curvature, while pas...
International audienceIn this article, we address the interpolation problem of data points per regul...
A rational cubic C2 spline curve is described which has interval and point tension weights for manip...
AbstractThe cubic spline represents an attempt to produce an interpolant with minimal rootmean-squar...
International audienceThis article introduces a new class of constraints for spline variational mode...
A basic technique for designing curved shapes in the plane is interpolating splines. The designer in...
The computations of visual pleasing and mathematically fair curve are an ongoing process. In the ear...
Variational interpolation in curved geometries has many applications, so there has always been deman...
Two-dimensional curves are conventionally designed using splines or Bézier curves. Although formally...
AbstractThis paper describes the use of cubic splines for interpolating monotonic data sets. Interpo...
AbstractIn this paper, we present an interpolation method for curves from a data set by means of the...
AbstractIn this paper, a classical problem of the construction of a cubic G1 continuous interpolator...
We study the curvature variation functional, i.e., the integral over the square of arc-length deriva...
Abstract:- A method to generate a quintic B-spline curve which passes through given points is descri...
In the context of direct/reverse engineering processes one of the main problem is the reconstruction...
Here we search for the curve which has the smallest integral of the square of curvature, while pas...
International audienceIn this article, we address the interpolation problem of data points per regul...
A rational cubic C2 spline curve is described which has interval and point tension weights for manip...
AbstractThe cubic spline represents an attempt to produce an interpolant with minimal rootmean-squar...
International audienceThis article introduces a new class of constraints for spline variational mode...
A basic technique for designing curved shapes in the plane is interpolating splines. The designer in...
The computations of visual pleasing and mathematically fair curve are an ongoing process. In the ear...
Variational interpolation in curved geometries has many applications, so there has always been deman...
Two-dimensional curves are conventionally designed using splines or Bézier curves. Although formally...
AbstractThis paper describes the use of cubic splines for interpolating monotonic data sets. Interpo...
AbstractIn this paper, we present an interpolation method for curves from a data set by means of the...
AbstractIn this paper, a classical problem of the construction of a cubic G1 continuous interpolator...
We study the curvature variation functional, i.e., the integral over the square of arc-length deriva...
Abstract:- A method to generate a quintic B-spline curve which passes through given points is descri...
In the context of direct/reverse engineering processes one of the main problem is the reconstruction...
Here we search for the curve which has the smallest integral of the square of curvature, while pas...
International audienceIn this article, we address the interpolation problem of data points per regul...
A rational cubic C2 spline curve is described which has interval and point tension weights for manip...