Open CASCADE Technology
7.0.0

This is used to reparameterize Rational BSpline Curves so that we can concatenate them later to build C1 Curves It builds and 1Dreparameterizing function starting from an Hermite interpolation and adding knots and modifying poles of the 1D BSpline obtained that way. The goal is to build a(u) so that if we consider a BSpline curve N(u) f(u) = — D(u) More...
#include <Hermit.hxx>
Static Public Member Functions  
static Handle< Geom2d_BSplineCurve >  Solution (const Handle< Geom_BSplineCurve > &BS, const Standard_Real TolPoles=0.000001, const Standard_Real TolKnots=0.000001) 
returns the correct spline a(u) which will be multiplicated with BS later. More...  
static Handle< Geom2d_BSplineCurve >  Solution (const Handle< Geom2d_BSplineCurve > &BS, const Standard_Real TolPoles=0.000001, const Standard_Real TolKnots=0.000001) 
returns the correct spline a(u) which will be multiplicated with BS later. More...  
static void  Solutionbis (const Handle< Geom_BSplineCurve > &BS, Standard_Real &Knotmin, Standard_Real &Knotmax, const Standard_Real TolPoles=0.000001, const Standard_Real TolKnots=0.000001) 
returns the knots to insert to a(u) to stay with a constant sign and in the tolerances. More...  
This is used to reparameterize Rational BSpline Curves so that we can concatenate them later to build C1 Curves It builds and 1Dreparameterizing function starting from an Hermite interpolation and adding knots and modifying poles of the 1D BSpline obtained that way. The goal is to build a(u) so that if we consider a BSpline curve N(u) f(u) = — D(u)
the function a(u)D(u) has value 1 at the umin and umax and has 0.0e0 derivative value a umin and umax. The details of the computation occuring in this package can be found by reading : " Etude sur la concatenation de NURBS en vue du balayage de surfaces" PFE n S85 Ensam Lille

static 
returns the correct spline a(u) which will be multiplicated with BS later.

static 
returns the correct spline a(u) which will be multiplicated with BS later.

static 
returns the knots to insert to a(u) to stay with a constant sign and in the tolerances.