Add to ORKGInternational audienceThis article introduces a new class of constraints for spline variational modeling, which allows more flexible user specification, as a constrained point can `slide' along a spline curve. Such constraints can, for example, be used to preserve correct parameterization of the spline curve. The spline surface case is also studied. Efficient numerical schemes are discussed for real-time solving, as well as interactive visualization during the energy minimization process. Examples are shown, and numerical results discussed
Splines are piecewise polynomial, rational or trigonometric functions that are ubiquitous in a wide ...
AbstractThis paper deals with the problem of constructing some free-form curves and surfaces from gi...
Variational interpolation in curved geometries has many applications, so there has always been deman...
International audienceThis article introduces a new class of constraints for spline variational mode...
A constrained variational curve is a curve that minimizes some energy functional under certain inter...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
We solve various variational spline curve problems subject to polygonal constraints, including best ...
The fundamental problem of geometric design is the representation of curved shapes. Traditionally su...
International audienceThis article presents an adaptive approach to B-spline curve physical simulati...
A basic technique for designing curved shapes in the plane is interpolating splines. The designer in...
This paper describes a new spline formulation that supports deformation of polygonol shapes into smo...
International audienceWe present a variational framework for rapid shape prototyping. The modeled sh...
summary:There are two grounds the spline theory stems from - the algebraic one (where splines are un...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
Since the free parameter and the two auxiliary points have effect on the shape of the Cardinal splin...
Splines are piecewise polynomial, rational or trigonometric functions that are ubiquitous in a wide ...
AbstractThis paper deals with the problem of constructing some free-form curves and surfaces from gi...
Variational interpolation in curved geometries has many applications, so there has always been deman...
International audienceThis article introduces a new class of constraints for spline variational mode...
A constrained variational curve is a curve that minimizes some energy functional under certain inter...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
We solve various variational spline curve problems subject to polygonal constraints, including best ...
The fundamental problem of geometric design is the representation of curved shapes. Traditionally su...
International audienceThis article presents an adaptive approach to B-spline curve physical simulati...
A basic technique for designing curved shapes in the plane is interpolating splines. The designer in...
This paper describes a new spline formulation that supports deformation of polygonol shapes into smo...
International audienceWe present a variational framework for rapid shape prototyping. The modeled sh...
summary:There are two grounds the spline theory stems from - the algebraic one (where splines are un...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
Since the free parameter and the two auxiliary points have effect on the shape of the Cardinal splin...
Splines are piecewise polynomial, rational or trigonometric functions that are ubiquitous in a wide ...
AbstractThis paper deals with the problem of constructing some free-form curves and surfaces from gi...
Variational interpolation in curved geometries has many applications, so there has always been deman...