-- Created on: 1991-09-20 -- Created by: Laurent PAINNOT -- Copyright (c) 1991-1999 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 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. generic class Function from AppParCurves ( MultiLine as any; ToolLine as any; -- as ToolLine(MultiLine) Squares as any; ResolCons as any) inherits MultipleVarFunctionWithGradient from math ---Purpose: This function inherits MultipleVarFunctionWithGradient to be -- used in the mathematical algorithm BFGS. -- It computes the value of the function -- F=sum(||Qui - B*Pi||)2 where Pi are Poles of the Bezier curves -- approximating the given MultiLine SSP and ui the parameters -- associated to the points Qi of SSP. -- It also computes the gradient for values ui of the parameter. uses MultiCurve from AppParCurves, HArray1OfConstraintCouple from AppParCurves, Constraint from AppParCurves, Vector from math, Matrix from math, HArray1OfInteger from TColStd is Create(SSP: MultiLine; FirstPoint, LastPoint: Integer; TheConstraints: HArray1OfConstraintCouple; Parameters: Vector; Deg: Integer) ---Purpose: initializes the fields of the function. The approximating -- curve has the desired degree Deg. returns Function from AppParCurves; NbVariables(me) ---Purpose: returns the number of variables of the function. It -- corresponds to the number of MultiPoints. returns Integer is static; Perform(me: in out; X: Vector) ---Purpose: this method is used each time Value or Gradient is -- needed. is static protected; Value(me: in out; X: Vector; F: out Real) ---Purpose: this method computes the new approximation of the -- MultiLine -- SSP and calculates F = sum (||Pui - Bi*Pi||2) for each -- point of the MultiLine. returns Boolean is static; Gradient(me: in out; X: Vector; G: out Vector) ---Purpose: returns the gradient G of the sum above for the -- parameters Xi. returns Boolean is static; Values(me: in out; X: Vector; F: out Real; G: out Vector) ---Purpose: returns the value F=sum(||Pui - Bi*Pi||)2. -- returns the value G = grad(F) for the parameters Xi. returns Boolean is static; NewParameters(me) ---Purpose: returns the new parameters of the MultiLine. ---C++: return const& returns Vector is static; CurveValue(me: in out) ---Purpose: returns the MultiCurve approximating the set after -- computing the value F or Grad(F). ---C++: return const& returns MultiCurve from AppParCurves is static; Error(me; IPoint, CurveIndex: Integer) ---Purpose: returns the distance between the MultiPoint of range -- IPoint and the curve CurveIndex. returns Real is static; MaxError3d(me) ---Purpose: returns the maximum distance between the points -- and the MultiCurve. returns Real is static; MaxError2d(me) ---Purpose: returns the maximum distance between the points -- and the MultiCurve. returns Real is static; FirstConstraint(me; TheConstraints: HArray1OfConstraintCouple; FirstPoint: Integer) ---Purpose: returns Constraint from AppParCurves is static; LastConstraint(me; TheConstraints: HArray1OfConstraintCouple; LastPoint: Integer) ---Purpose: returns Constraint from AppParCurves is static; fields Done: Boolean; MyMultiLine : MultiLine; MyMultiCurve: MultiCurve from AppParCurves; Degre: Integer; myParameters: Vector; FVal: Real; ValGrad_F: Vector from math; MyF: Matrix from math; PTLX : Matrix from math; PTLY : Matrix from math; PTLZ : Matrix from math; A: Matrix from math; DA: Matrix from math; MyLeastSquare : Squares; Contraintes: Boolean; NbP: Integer; NbCu: Integer; Adeb: Integer; Afin: Integer; tabdim: HArray1OfInteger from TColStd; ERR3d: Real; ERR2d: Real; FirstP: Integer; LastP: Integer; myConstraints: HArray1OfConstraintCouple from AppParCurves; end Function;