// Created on: 1993-03-10 // Created by: JCV // Copyright (c) 1993-1999 Matra Datavision // Copyright (c) 1999-2014 OPEN CASCADE SAS // // This file is part of Open CASCADE Technology software library. // // This library is free software; you can redistribute it and/or modify it under // the terms of the GNU Lesser General Public License version 2.1 as published // by the Free Software Foundation, with special exception defined in the file // OCCT_LGPL_EXCEPTION.txt. Consult the file LICENSE_LGPL_21.txt included in OCCT // distribution for complete text of the license and disclaimer of any warranty. // // Alternatively, this file may be used under the terms of Open CASCADE // commercial license or contractual agreement. #ifndef _Geom_BoundedCurve_HeaderFile #define _Geom_BoundedCurve_HeaderFile #include #include #include class gp_Pnt; class Geom_BoundedCurve; DEFINE_STANDARD_HANDLE(Geom_BoundedCurve, Geom_Curve) //! The abstract class BoundedCurve describes the //! common behavior of bounded curves in 3D space. A //! bounded curve is limited by two finite values of the //! parameter, termed respectively "first parameter" and //! "last parameter". The "first parameter" gives the "start //! point" of the bounded curve, and the "last parameter" //! gives the "end point" of the bounded curve. //! The length of a bounded curve is finite. //! The Geom package provides three concrete classes of bounded curves: //! - two frequently used mathematical formulations of complex curves: //! - Geom_BezierCurve, //! - Geom_BSplineCurve, and //! - Geom_TrimmedCurve to trim a curve, i.e. to only //! take part of the curve limited by two values of the //! parameter of the basis curve. class Geom_BoundedCurve : public Geom_Curve { public: //! Returns the end point of the curve. Standard_EXPORT virtual gp_Pnt EndPoint() const = 0; //! Returns the start point of the curve. Standard_EXPORT virtual gp_Pnt StartPoint() const = 0; DEFINE_STANDARD_RTTIEXT(Geom_BoundedCurve,Geom_Curve) protected: private: }; #endif // _Geom_BoundedCurve_HeaderFile