一種低效但邏輯簡單清晰的Delaunay三角網生成演算法
阿新 • • 發佈:2019-02-08
由離散樣本點生成Delaunay三角網有多種演算法,每個演算法的執行效率都不一樣,這裡介紹一種最簡單,最低效,但是演算法邏輯最清晰的一種。
Delaunay三角網必須滿足的一個條件是任何一個三角形的外接圓都不能包含其他任何一個樣本點,因此,本演算法通過列舉所有可能的三角形,再經過其外接圓不包含任何其他樣本點的判斷,如果滿足,則記錄該三角形,直到所有三角形列舉完畢。
效果圖:
本演算法用C++實現,核心程式碼如下:
const double EP = 0.00000001; // 點結構 typedef struct PT{ double x; double y; }PT; //線結構 typedef struct SEGMENT { PT* ptStart; PT* ptEnd; }SEGMENT; //三角形類 class TRIANGLE { public: TRIANGLE(PT* pt1, PT* pt2, PT* pt3) { //確保三個點x座標升序排序 PT* temp; if(pt1->x > pt2->x){temp = pt1; pt1 = pt2; pt2 = temp;} if(pt3->x < pt1->x && pt3->x ) { temp = pt3; pt3 = pt1; pt1 = temp; if(pt3->x < pt2->x){temp=pt3;pt3=pt2;pt2=temp;} } if(pt3->x < pt2->x){temp=pt3;pt3=pt2;pt2=temp;} _ptFirst = pt1; _ptSecond = pt2; _ptThird = pt3; InitData(); } PT* GetFirstPt(){return _ptFirst;} PT* GetSecondPt(){return _ptSecond;} PT* GetThirdPt(){return _ptThird;} SEGMENT GetSegment1(){SEGMENT seg = {_ptFirst,_ptSecond};return seg;} SEGMENT GetSegment2(){SEGMENT seg = {_ptFirst,_ptThird};return seg;} SEGMENT GetSegment3(){SEGMENT seg = {_ptSecond,_ptThird};return seg;} BOOL IsTriangleSame(TRIANGLE& tri) { if(tri.GetFirstPt() == _ptFirst && tri.GetSecondPt() == _ptSecond && tri.GetThirdPt() == _ptThird) return TRUE; return FALSE; } BOOL IsPtInCircle(PT* pt) { double offsetx = pt->x - _ptCenter.x; double offsety = pt->y - _ptCenter.y; if(sqrt(offsetx*offsetx + offsety*offsety) <= _Radius) return TRUE; return FALSE; } protected: // 獲取三角形外接圓中心點及半徑 void InitData() { double x0 = _ptFirst->x; double y0 = _ptFirst->y; double x1 = _ptSecond->x; double y1 = _ptSecond->y; double x2 = _ptThird->x; double y2 = _ptThird->y; double y10 = y1 - y0; double y21 = y2 - y1; bool b21zero = y21 > -REAL_EPSILON && y21 < REAL_EPSILON; if (y10 > -REAL_EPSILON && y10 < REAL_EPSILON) { if (b21zero) { if (x1 > x0) { if (x2 > x1) x1 = x2; } else { if (x2 < x0) x0 = x2; } _ptCenter.x = (x0 + x1) * .5F; _ptCenter.y = y0; } else { double m1 = - (x2 - x1) / y21; double mx1 = (x1 + x2) * .5F; double my1 = (y1 + y2) * .5F; _ptCenter.x = (x0 + x1) * .5F; _ptCenter.y = m1 * (_ptCenter.x - mx1) + my1; } } else if (b21zero) { double m0 = - (x1 - x0) / y10; double mx0 = (x0 + x1) * .5F; double my0 = (y0 + y1) * .5F; _ptCenter.x = (x1 + x2) * .5F; _ptCenter.y = m0 * (_ptCenter.x - mx0) + my0; } else { double m0 = - (x1 - x0) / y10; double m1 = - (x2 - x1) / y21; double mx0 = (x0 + x1) * .5F; double my0 = (y0 + y1) * .5F; double mx1 = (x1 + x2) * .5F; double my1 = (y1 + y2) * .5F; _ptCenter.x = (m0 * mx0 - m1 * mx1 + my1 - my0) / (m0 - m1); _ptCenter.y = m0 * (_ptCenter.x - mx0) + my0; } double dx = x0 - _ptCenter.x; double dy = y0 - _ptCenter.y; _Radius2 = dx * dx + dy * dy; // the radius of the circumcircle, squared _Radius = (double) sqrt(_Radius2); // the proper radius _Radius2 *= 1.000001f; } private: PT* _ptFirst; PT* _ptSecond; PT* _ptThird; PT _ptCenter; double _Radius2; double _Radius; }; class CMyDelaunay { public: // 通過樣本點集,生成三角形集,由vecTriangleWork輸出 void BuildDelaunayEx(vector<PT>& vecPT, vector<TRIANGLE>& vecTriangleWork); BOOL IsPtsBuildTriangle(PT* pt1, PT* pt2, PT* pt3); public: CMyDelaunay(); virtual ~CMyDelaunay(); }; //判斷三個點能否組成一個三角形 BOOL CMyDelaunay::IsPtsBuildTriangle(PT* pt1, PT* pt2, PT* pt3) { double offset_x1 = pt2->x - pt1->x; double offset_x2 = pt3->x - pt2->x; double offset_y1 = pt2->y - pt1->y; double offset_y2 = pt3->y - pt2->y; if((fabs(offset_x1) < EP) && (fabs(offset_x2) < EP)) //豎直 { return FALSE; } if(fabs(offset_x1) > EP && fabs(offset_x2) > EP) { if(fabs(offset_y1/offset_x1 - offset_y2/offset_x2) < EP) return FALSE; } return TRUE; } void CMyDelaunay::BuildDelaunayEx(vector<PT>& vecPT, vector<TRIANGLE>& vecTriangleWork) { int nSize = vecPT.size(); if(nSize < 3) return; for(int i = 0; i < nSize - 2; ++i) { for(int j = i + 1; j < nSize - 1; ++j) { for(int k = j + 1; k < nSize; ++k) { PT* pt1 = &vecPT[i]; PT* pt2 = &vecPT[j]; PT* pt3 = &vecPT[k]; BOOL bFind = TRUE; for(int m = 0; m < nSize; ++m) { PT* pt = &vecPT[m]; if(pt != pt1 && pt != pt2 && pt != pt3 && IsPtsBuildTriangle(pt1, pt2, pt3)) { TRIANGLE tri(pt1, pt2, pt3); if(tri.IsPtInCircle(pt)) { bFind = FALSE; break; } } } if(bFind) { vecTriangleWork.push_back(tri); } } } } }