OpenCASCADE 參數(shù)曲面面積
eryar@163.com
Abstract. 本文介紹了參數(shù)曲面的第一基本公式,并應用曲面的第一基本公式,結合OpenCASCADE中計算多重積分的類,對任意參數(shù)曲面的面積進行計算。
Key Words. Parametric Curve, Parametric Surface, Gauss Integration, Global Properties
1.Introduction
我們知道一元函數(shù)y=f(x)的圖像是一條曲線,二元函數(shù)z=f(x,y)的圖像是一張曲面。但是,把曲線曲面表示成參數(shù)方程則更加便利于研究,這種表示方法首先是由歐洲瑞士數(shù)學家Euler引進的。例如,在空間中的一條曲線可以表示為三個一元函數(shù):
X=x(t), Y=y(t), Z=z(t)
在向量的概念出現(xiàn)后,空間中的一條曲線可以自然地表示為一個一元向量函數(shù):
r=r(t)=(x(t), y(t), z(t))
用向量函數(shù)來表示曲線和曲面后,使曲線曲面一些量的計算方式比較統(tǒng)一。如曲線可以表示為一元向量函數(shù),曲面可以表示為二元向量函數(shù)。
本文結合OpenCASCADE來介紹參數(shù)曲線曲面積分分別計算曲線弧長和曲面的面積。結合《微分幾何》來更好地理解曲線曲面相關知識。
2.Curve Natural Parametric Equations
設曲線C的參數(shù)方程是r=r(t),命:
則s是該曲線的一個不變量,即它與空間中的坐標系的選擇無關,也與該曲線的參數(shù)變換無關。前者是因為在笛卡爾直角坐標變換下,切向量的長度|r’(t)|是不變的,故s不變。關于后者可以通過積分的變量的替換來證明,設參數(shù)變換是:
并且
因此
根據(jù)積分的變量替換公式有:
不變量s的幾何意義就是曲線段的弧長。這說明曲線參數(shù)t可以是任意的,但選擇不同的參數(shù)得到的參數(shù)方程會有不同,但是曲線段的弧長是不變的。以曲線弧長作為曲線方程的參數(shù),這樣的方程稱為曲線的自然參數(shù)方程Natural Parametric Equations。
由曲線的參數(shù)方程可知,曲線弧長的計算公式為:
幾何意義就是在每個微元處的切向量的長度求和。
3.Gauss Integration for Arc Length
曲線弧長的計算就是一元函數(shù)的積分。OpenCASCADE中是如何計算任意曲線弧長的呢?直接找到相關的源碼列舉如下:(在類CPnts_AbscissaPoint中)
// auxiliary functions to compute the length of the derivative
static Standard_Real f3d(const Standard_Real X, const Standard_Address C)
{
gp_Pnt P;
gp_Vec V;
((Adaptor3d_Curve*)C)->D1(X,P,V);
return V.Magnitude();
}
static Standard_Real f2d(const Standard_Real X, const Standard_Address C)
{
gp_Pnt2d P;
gp_Vec2d V;
((Adaptor2d_Curve2d*)C)->D1(X,P,V);
return V.Magnitude();
}
//==================================================================
//function : Length
//purpose : 3d with parameters
//==================================================================
Standard_Real CPnts_AbscissaPoint::Length(const Adaptor3d_Curve& C,
const Standard_Real U1,
const Standard_Real U2)
{
CPnts_MyGaussFunction FG;
//POP pout WNT
CPnts_RealFunction rf = f3d;
FG.Init(rf,(Standard_Address)&C);
// FG.Init(f3d,(Standard_Address)&C);
math_GaussSingleIntegration TheLength(FG, U1, U2, order(C));
if (!TheLength.IsDone()) {
throw Standard_ConstructionError();
}
return Abs(TheLength.Value());
}
//==================================================================
//function : Length
//purpose : 2d with parameters
//==================================================================
Standard_Real CPnts_AbscissaPoint::Length(const Adaptor2d_Curve2d& C,
const Standard_Real U1,
const Standard_Real U2)
{
CPnts_MyGaussFunction FG;
//POP pout WNT
CPnts_RealFunction rf = f2d;
FG.Init(rf,(Standard_Address)&C);
// FG.Init(f2d,(Standard_Address)&C);
math_GaussSingleIntegration TheLength(FG, U1, U2, order(C));
if (!TheLength.IsDone()) {
throw Standard_ConstructionError();
}
return Abs(TheLength.Value());
}
上述代碼的意思是直接對曲線的一階導數(shù)的長度求積分,即是弧長。OpenCASCADE的代碼寫得有點難懂,根據(jù)意思把對三維曲線求弧長的代碼改寫下,更便于理解:
//! Function for curve length evaluation.
class math_LengthFunction : public math_Function
{
public:
math_LengthFunction(const Handle(Geom_Curve)& theCurve)
: myCurve(theCurve)
{
}
virtual Standard_Boolean Value(const Standard_Real X, Standard_Real& F)
{
gp_Pnt aP;
gp_Vec aV;
myCurve->D1(X, aP, aV);
F = aV.Magnitude();
return Standard_True;
}
private:
Handle(Geom_Curve) myCurve;
};
4.First Fundamental Form of a Surface
曲面參數(shù)方程是個二元向量函數(shù)。根據(jù)《微分幾何》中曲面的第一基本公式(First Fundamental Form of a Surface)可知,曲面上曲線的表達式為:
r=r(u(t), v(t)) = (x(t), y(t), z(t))
若以s表示曲面上曲線的弧長,則由復合函數(shù)求導公式可得弧長微分公式:
在古典微分幾何中,上式稱為曲面的第一基本公式,E、F、G稱為第一基本量。在曲面上,每一點的第一基本量與參數(shù)化無關。
利用曲面第一基本公式可以用于計算曲面的面積。參數(shù)曲面上與u,v參數(shù)空間的元素dudv對應的面積元為:
由參數(shù)曲面法向的計算可知,曲面的面積元素即為u,v方向上的偏導數(shù)的乘積的模。
其幾何意義可以理解為參數(shù)曲面的面積微元是由u,v方向的偏導數(shù)的向量圍成的一個四邊形的面積,則整個曲面的面積即是對面積元素求積分。由于參數(shù)曲面有兩個參數(shù),所以若要計算曲面的面積,只需要對面積元素計算二重積分即可。
5.Gauss Integration for Area
OpenCASCADE的math包中提供了多重積分的計算類math_GaussMultipleIntegration,由類名可知積分算法采用了Gauss積分算法。下面通過具體代碼來說明OpenCASCADE中計算曲面積分的過程。要計算積分,先要定義被積函數(shù)。因為參數(shù)曲面與參數(shù)曲線不同,參數(shù)曲線只有一個參數(shù),而參數(shù)曲面有兩個參數(shù),所以是一個多元函數(shù)。
//! 2D variable function for surface area evaluation.
class math_AreaFunction : public math_MultipleVarFunction
{
public:
math_AreaFunction(const Handle(Geom_Surface)& theSurface)
: mySurface(theSurface)
{
}
virtual Standard_Integer NbVariables() const
{
return 2;
}
virtual Standard_Boolean Value(const math_Vector& X, Standard_Real& Y)
{
gp_Pnt aP;
gp_Vec aDu;
gp_Vec aDv;
mySurface->D1(X(1), X(2), aP, aDu, aDv);
Y = aDu.Crossed(aDv).Magnitude();
return Standard_True;
}
private:
Handle(Geom_Surface) mySurface;
};
由于參數(shù)曲面是多元函數(shù),所以從類math_MultipleVarFunction派生,并在虛函數(shù)NbVariables()中說明有兩個變量。在虛函數(shù)Value()中計算面積元素的值,即根據(jù)曲面第一基本公式中面積元素的定義,對參數(shù)曲面求一階導數(shù),計算兩個偏導數(shù)向量的叉乘的模。
有了被積函數(shù),只需要在定義域對其計算二重積分,相應代碼如下所示:
void evalArea(const Handle(Geom_Surface)& theSurface, const math_Vector& theLower, const math_Vector& theUpper)
{
math_IntegerVector aOrder(1, 2, math::GaussPointsMax());
math_AreaFunction aFunction(theSurface);
math_GaussMultipleIntegration anIntegral(aFunction, theLower, theUpper, aOrder);
if (anIntegral.IsDone())
{
anIntegral.Dump(std::cout);
}
}
通過theLower和theUpper指定定義域,由于采用了Gauss-Legendre算法計算二重積分,所以需要指定階數(shù),且階數(shù)越高積分結果精度越高,這里使用了OpenCASCADE中最高的階數(shù)。
下面通過對基本曲面的面積計算來驗證結果的正確性,并將計算結果和OpenCASCADE中計算面積的類BRepGProp::SurfaceProperties()結果進行對比。
6.Elementary Surface Area Test
下面通過對OpenCASCADE中幾個初等曲面的面積進行計算,代碼如下所示:
/*
Copyright(C) 2017 Shing Liu(eryar@163.com)
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#include <gp_Pnt.hxx>
#include <gp_Vec.hxx>
#include <math.hxx>
#include <math_Function.hxx>
#include <math_MultipleVarFunction.hxx>
#include <math_GaussMultipleIntegration.hxx>
#include <Geom_Plane.hxx>
#include <Geom_ConicalSurface.hxx>
#include <Geom_CylindricalSurface.hxx>
#include <Geom_SphericalSurface.hxx>
#include <Geom_ToroidalSurface.hxx>
#include <Geom_BSplineSurface.hxx>
#include <Geom_RectangularTrimmedSurface.hxx>
#include <GeomConvert.hxx>
#include <GProp_GProps.hxx>
#include <TopoDS_Face.hxx>
#include <BRepGProp.hxx>
#include <BRepBuilderAPI_MakeFace.hxx>
#pragma comment(lib, "TKernel.lib")
#pragma comment(lib, "TKMath.lib")
#pragma comment(lib, "TKG2d.lib")
#pragma comment(lib, "TKG3d.lib")
#pragma comment(lib, "TKGeomBase.lib")
#pragma comment(lib, "TKGeomAlgo.lib")
#pragma comment(lib, "TKBRep.lib")
#pragma comment(lib, "TKTopAlgo.lib")
//! 2D variable function for surface area evaluation.
class math_AreaFunction : public math_MultipleVarFunction
{
public:
math_AreaFunction(const Handle(Geom_Surface)& theSurface)
: mySurface(theSurface)
{
}
virtual Standard_Integer NbVariables() const
{
return 2;
}
virtual Standard_Boolean Value(const math_Vector& X, Standard_Real& Y)
{
gp_Pnt aP;
gp_Vec aDu;
gp_Vec aDv;
Standard_Real E = 0.0;
Standard_Real F = 0.0;
Standard_Real G = 0.0;
mySurface->D1(X(1), X(2), aP, aDu, aDv);
E = aDu.Dot(aDu);
F = aDu.Dot(aDv);
G = aDv.Dot(aDv);
Y = Sqrt(E * G - F * F);
//Y = aDu.Crossed(aDv).Magnitude();
return Standard_True;
}
private:
Handle(Geom_Surface) mySurface;
};
void evalArea(const Handle(Geom_Surface)& theSurface, const math_Vector& theLower, const math_Vector& theUpper)
{
math_IntegerVector aOrder(1, 2, math::GaussPointsMax());
math_AreaFunction aFunction(theSurface);
math_GaussMultipleIntegration anIntegral(aFunction, theLower, theUpper, aOrder);
if (anIntegral.IsDone())
{
anIntegral.Dump(std::cout);
}
}
void evalArea(const Handle(Geom_BoundedSurface)& theSurface)
{
math_IntegerVector aOrder(1, 2, math::GaussPointsMax());
math_Vector aLower(1, 2, 0.0);
math_Vector aUpper(1, 2, 0.0);
theSurface->Bounds(aLower(1), aUpper(1), aLower(2), aUpper(2));
math_AreaFunction aFunction(theSurface);
math_GaussMultipleIntegration anIntegral(aFunction, aLower, aUpper, aOrder);
if (anIntegral.IsDone())
{
anIntegral.Dump(std::cout);
}
}
void testFace(const TopoDS_Shape& theFace)
{
GProp_GProps aSurfaceProps;
BRepGProp::SurfaceProperties(theFace, aSurfaceProps);
std::cout << "Face area: " << aSurfaceProps.Mass() << std::endl;
}
void testPlane()
{
std::cout << "====== Test Plane Area =====" << std::endl;
Handle(Geom_Plane) aPlaneSurface = new Geom_Plane(gp::XOY());
math_Vector aLower(1, 2);
math_Vector aUpper(1, 2);
// Parameter U range.
aLower(1) = 0.0;
aUpper(1) = 2.0;
// Parameter V range.
aLower(2) = 0.0;
aUpper(2) = 3.0;
evalArea(aPlaneSurface, aLower, aUpper);
// Convert to BSpline Surface.
Handle(Geom_RectangularTrimmedSurface) aTrimmedSurface =
new Geom_RectangularTrimmedSurface(aPlaneSurface, aLower(1), aUpper(1), aLower(2), aUpper(2));
Handle(Geom_BSplineSurface) aBSplineSurface = GeomConvert::SurfaceToBSplineSurface(aTrimmedSurface);
evalArea(aBSplineSurface);
// Test Face.
TopoDS_Face aFace = BRepBuilderAPI_MakeFace(aTrimmedSurface, Precision::Confusion()).Face();
testFace(aFace);
aFace = BRepBuilderAPI_MakeFace(aBSplineSurface, Precision::Confusion()).Face();
testFace(aFace);
}
void testCylinder()
{
std::cout << "====== Test Cylinder Area =====" << std::endl;
Handle(Geom_CylindricalSurface) aCylindrialSurface = new Geom_CylindricalSurface(gp::XOY(), 1.0);
math_Vector aLower(1, 2);
math_Vector aUpper(1, 2);
aLower(1) = 0.0;
aUpper(1) = M_PI * 2.0;
aLower(2) = 0.0;
aUpper(2) = 3.0;
evalArea(aCylindrialSurface, aLower, aUpper);
// Convert to BSpline Surface.
Handle(Geom_RectangularTrimmedSurface) aTrimmedSurface =
new Geom_RectangularTrimmedSurface(aCylindrialSurface, aLower(1), aUpper(1), aLower(2), aUpper(2));
Handle(Geom_BSplineSurface) aBSplineSurface = GeomConvert::SurfaceToBSplineSurface(aTrimmedSurface);
evalArea(aBSplineSurface);
// Test Face.
TopoDS_Face aFace = BRepBuilderAPI_MakeFace(aTrimmedSurface, Precision::Confusion()).Face();
testFace(aFace);
aFace = BRepBuilderAPI_MakeFace(aBSplineSurface, Precision::Confusion()).Face();
testFace(aFace);
}
void testSphere()
{
std::cout << "====== Test Sphere Area =====" << std::endl;
Handle(Geom_SphericalSurface) aSphericalSurface = new Geom_SphericalSurface(gp::XOY(), 1.0);
math_Vector aLower(1, 2);
math_Vector aUpper(1, 2);
aSphericalSurface->Bounds(aLower(1), aUpper(1), aLower(2), aUpper(2));
evalArea(aSphericalSurface, aLower, aUpper);
// Convert to BSpline Surface.
Handle(Geom_BSplineSurface) aBSplineSurface = GeomConvert::SurfaceToBSplineSurface(aSphericalSurface);
evalArea(aBSplineSurface);
// Test Face.
TopoDS_Face aFace = BRepBuilderAPI_MakeFace(aSphericalSurface, Precision::Confusion()).Face();
testFace(aFace);
aFace = BRepBuilderAPI_MakeFace(aBSplineSurface, Precision::Confusion()).Face();
testFace(aFace);
}
void test()
{
testPlane();
testSphere();
testCylinder();
}
int main(int argc, char* argv[])
{
test();
return 0;
}
計算結果如下圖所示:
上述代碼計算了曲面的面積,再將曲面轉換成B樣條曲面,再使用算法計算面積。再將曲面和轉換的B樣條曲面生成拓樸面,利用OpenCASCADE中計算曲面面積功能進行對比。使用自定義函數(shù)math_AreaFunction利用多重積分類計算的結果與OpenCASCADE中計算曲面面積的值是一致的。當把曲面轉換成B樣條曲面后,OpenCASCADE計算的曲面面積偏大。
7.Conclusion
在學習《高等數(shù)學》的積分時,其主要的一個應用就是計算弧長、面積和體積等。學習高數(shù)抽象概念時,總會問學了高數(shù)有什么用?就從計算機圖形方面來看,可以利用數(shù)學工具對任意曲線求弧長,對任意曲面計算面積等,更具一般性。
通過自定義被積函數(shù)再利用積分算法來計算任意曲面的面積,將理論與實踐結合起來了。即將曲面的第一基本公式與具體的代碼甚至可以利用OpenCASCADE生成對應的圖形,這樣抽象的理論就直觀了,更便于理解相應的概念。
8.References
1.朱心雄. 自由曲線曲面造型技術. 科學出版社. 2000
2.陳維桓. 微分幾何. 北京大學出版社. 2006
3.同濟大學數(shù)學教研室. 高等數(shù)學. 高等教育出版社. 1996