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// clang-format off
// http://voxels.blogspot.de/2014/05/quadric-mesh-simplification-with-source.html
// https://github.com/sp4cerat/Fast-Quadric-Mesh-Simplification
//
// MIT License
// Changes:
// * Use Base::Vector3f as vec3f class
// * Move global variables to a class to make the algorithm usable for multi-threading
// * Comment out printf statements
// * Fix compiler warnings
// * Remove macros loop,i,j,k
#include <vector>
using vec3f = Base::Vector3f;
class SymmetricMatrix {
public:
// Constructor
SymmetricMatrix(double c=0) { for (std::size_t i=0;i<10;++i ) m[i] = c; }
SymmetricMatrix(double m11, double m12, double m13, double m14,
double m22, double m23, double m24,
double m33, double m34,
double m44) {
m[0] = m11; m[1] = m12; m[2] = m13; m[3] = m14;
m[4] = m22; m[5] = m23; m[6] = m24;
m[7] = m33; m[8] = m34;
m[9] = m44;
}
// Make plane
SymmetricMatrix(double a,double b,double c,double d)
{
m[0] = a*a; m[1] = a*b; m[2] = a*c; m[3] = a*d;
m[4] = b*b; m[5] = b*c; m[6] = b*d;
m[7 ] =c*c; m[8 ] = c*d;
m[9 ] = d*d;
}
double operator[](int c) const { return m[c]; }
// Determinant
double det(int a11, int a12, int a13,
int a21, int a22, int a23,
int a31, int a32, int a33)
{
double det = m[a11]*m[a22]*m[a33] + m[a13]*m[a21]*m[a32] + m[a12]*m[a23]*m[a31]
- m[a13]*m[a22]*m[a31] - m[a11]*m[a23]*m[a32] - m[a12]*m[a21]*m[a33];
return det;
}
const SymmetricMatrix operator+(const SymmetricMatrix& n) const
{
return SymmetricMatrix( m[0]+n[0], m[1]+n[1], m[2]+n[2], m[3]+n[3],
m[4]+n[4], m[5]+n[5], m[6]+n[6],
m[7]+n[7], m[8]+n[8],
m[9]+n[9]);
}
SymmetricMatrix& operator+=(const SymmetricMatrix& n)
{
m[0]+=n[0]; m[1]+=n[1]; m[2]+=n[2]; m[3]+=n[3];
m[4]+=n[4]; m[5]+=n[5]; m[6]+=n[6]; m[7]+=n[7];
m[8]+=n[8]; m[9]+=n[9];
return *this;
}
double m[10];
};
///////////////////////////////////////////
class Simplify
{
public:
struct Triangle { int v[3];double err[4];int deleted,dirty;vec3f n; };
struct Vertex { vec3f p;int tstart,tcount;SymmetricMatrix q;int border;};
struct Ref { int tid,tvertex; };
std::vector<Triangle> triangles;
std::vector<Vertex> vertices;
std::vector<Ref> refs;
void simplify_mesh(int target_count, double tolerance, double aggressiveness=7);
private:
// Helper functions
double vertex_error(const SymmetricMatrix& q, double x, double y, double z);
double calculate_error(int id_v1, int id_v2, vec3f &p_result);
bool flipped(vec3f p,int i0,int i1,Vertex &v0,Vertex &v1,std::vector<int> &deleted);
void update_triangles(int i0,Vertex &v,std::vector<int> &deleted,int &deleted_triangles);
void update_mesh(int iteration);
void compact_mesh();
};
//
// Main simplification function
//
// target_count : target nr. of triangles
// tolerance : tolerance for the quadratic errors
// aggressiveness : sharpness to increase the threshold.
// 5..8 are good numbers
// more iterations yield higher quality
// If the passed tolerance is > 0 then this will be used to check
// the quadratic error metric of all triangles. If none of them is below
// the tolerance the algorithm will stop at this point. The number of the
// remaining triangles usually will be higher than \a target_count
//
void Simplify::simplify_mesh(int target_count, double tolerance, double aggressiveness)
{
// init
//printf("%s - start\n",__FUNCTION__);
//int timeStart=timeGetTime();
for (std::size_t i=0;i<triangles.size();++i)
triangles[i].deleted=0;
// main iteration loop
int deleted_triangles=0;
std::vector<int> deleted0,deleted1;
int triangle_count=triangles.size();
for (int iteration=0;iteration<100;++iteration)
{
// target number of triangles reached ? Then break
//printf("iteration %d - triangles %d\n",iteration,triangle_count-deleted_triangles);
if (triangle_count-deleted_triangles<=target_count)
break;
// update mesh once in a while
if (iteration%5==0)
{
update_mesh(iteration);
}
// clear dirty flag
for (std::size_t i=0;i<triangles.size();++i)
triangles[i].dirty=0;
//
// All triangles with edges below the threshold will be removed
//
// The following numbers works well for most models.
// If it does not, try to adjust the 3 parameters
//
double threshold = 0.000000001*pow(double(iteration+3),aggressiveness);
if (tolerance > 0.0)
{
bool canContinue = false;
for (std::size_t i=0;i<triangles.size();++i)
{
Triangle &t=triangles[i];
if (t.deleted)
continue;
if (t.dirty)
continue;
if (fabs(t.err[3])<tolerance)
{
canContinue = true;
break;
}
}
if (!canContinue)
break;
}
// remove vertices & mark deleted triangles
for (std::size_t i=0;i<triangles.size();++i)
{
Triangle &t=triangles[i];
if (t.err[3]>threshold)
continue;
if (t.deleted)
continue;
if (t.dirty)
continue;
for (std::size_t j=0;j<3;++j)
{
if (t.err[j]<threshold)
{
int i0=t.v[ j ]; Vertex &v0 = vertices[i0];
int i1=t.v[(j+1)%3]; Vertex &v1 = vertices[i1];
// Border check
if (v0.border != v1.border)
continue;
// Compute vertex to collapse to
vec3f p;
calculate_error(i0,i1,p);
deleted0.resize(v0.tcount); // normals temporarily
deleted1.resize(v1.tcount); // normals temporarily
// don't remove if flipped
if (flipped(p,i0,i1,v0,v1,deleted0))
continue;
if (flipped(p,i1,i0,v1,v0,deleted1))
continue;
// not flipped, so remove edge
v0.p=p;
v0.q=v1.q+v0.q;
int tstart=refs.size();
update_triangles(i0,v0,deleted0,deleted_triangles);
update_triangles(i0,v1,deleted1,deleted_triangles);
int tcount=refs.size()-tstart;
if (tcount<=v0.tcount)
{
// save ram
if (tcount)
memcpy(&refs[v0.tstart],&refs[tstart],tcount*sizeof(Ref));
}
else
{
// append
v0.tstart=tstart;
}
v0.tcount=tcount;
break;
}
}
// done?
if (triangle_count-deleted_triangles<=target_count)
break;
}
}
// clean up mesh
compact_mesh();
// ready
//int timeEnd=timeGetTime();
//printf("%s - %d/%d %d%% removed in %d ms\n",__FUNCTION__,
// triangle_count-deleted_triangles,
// triangle_count,deleted_triangles*100/triangle_count,
// timeEnd-timeStart);
}
// Check if a triangle flips when this edge is removed
bool Simplify::flipped(vec3f p, int i0, int i1,
Vertex &v0,
Vertex &v1,
std::vector<int> &deleted)
{
(void)i0; (void)v1;
for (int k=0;k<v0.tcount;++k)
{
Triangle &t=triangles[refs[v0.tstart+k].tid];
if (t.deleted)
continue;
int s=refs[v0.tstart+k].tvertex;
int id1=t.v[(s+1)%3];
int id2=t.v[(s+2)%3];
if (id1==i1 || id2==i1) // delete ?
{
deleted[k]=1;
continue;
}
vec3f d1 = vertices[id1].p-p; d1.Normalize();
vec3f d2 = vertices[id2].p-p; d2.Normalize();
if (fabs(d1.Dot(d2))>0.999)
return true;
vec3f n;
n = d1.Cross(d2);
n.Normalize();
deleted[k]=0;
if (n.Dot(t.n)<0.2)
return true;
}
return false;
}
// Update triangle connections and edge error after a edge is collapsed
void Simplify::update_triangles(int i0,Vertex &v,std::vector<int> &deleted,int &deleted_triangles)
{
vec3f p;
for (int k=0;k<v.tcount;++k)
{
Ref &r=refs[v.tstart+k];
Triangle &t=triangles[r.tid];
if (t.deleted)
continue;
if (deleted[k])
{
t.deleted=1;
deleted_triangles++;
continue;
}
t.v[r.tvertex]=i0;
t.dirty=1;
t.err[0]=calculate_error(t.v[0],t.v[1],p);
t.err[1]=calculate_error(t.v[1],t.v[2],p);
t.err[2]=calculate_error(t.v[2],t.v[0],p);
t.err[3]=std::min(t.err[0],std::min(t.err[1],t.err[2]));
refs.push_back(r);
}
}
// compact triangles, compute edge error and build reference list
void Simplify::update_mesh(int iteration)
{
if(iteration>0) // compact triangles
{
int dst=0;
for (std::size_t i=0;i<triangles.size();++i)
{
if (!triangles[i].deleted)
{
triangles[dst++]=triangles[i];
}
}
triangles.resize(dst);
}
//
// Init Quadrics by Plane & Edge Errors
//
// required at the beginning ( iteration == 0 )
// recomputing during the simplification is not required,
// but mostly improves the result for closed meshes
//
if (iteration == 0)
{
for (std::size_t i=0;i<vertices.size();++i)
vertices[i].q=SymmetricMatrix(0.0);
for (std::size_t i=0;i<triangles.size();++i)
{
Triangle &t=triangles[i];
vec3f n,p[3];
for (std::size_t j=0;j<3;++j)
p[j]=vertices[t.v[j]].p;
n = (p[1]-p[0]).Cross(p[2]-p[0]);
n.Normalize();
t.n=n;
for (std::size_t j=0;j<3;++j)
vertices[t.v[j]].q = vertices[t.v[j]].q+SymmetricMatrix(n.x,n.y,n.z,-n.Dot(p[0]));
}
for (std::size_t i=0;i<triangles.size();++i)
{
// Calc Edge Error
Triangle &t=triangles[i];vec3f p;
for (std::size_t j=0;j<3;++j)
t.err[j] = calculate_error(t.v[j],t.v[(j+1)%3],p);
t.err[3]=std::min(t.err[0],std::min(t.err[1],t.err[2]));
}
}
// Init Reference ID list
for (std::size_t i=0;i<vertices.size();++i)
{
vertices[i].tstart=0;
vertices[i].tcount=0;
}
for (std::size_t i=0;i<triangles.size();++i)
{
Triangle &t=triangles[i];
for (std::size_t j=0;j<3;++j)
vertices[t.v[j]].tcount++;
}
int tstart=0;
for (std::size_t i=0;i<vertices.size();++i)
{
Vertex &v=vertices[i];
v.tstart=tstart;
tstart+=v.tcount;
v.tcount=0;
}
// Write References
refs.resize(triangles.size()*3);
for (std::size_t i=0;i<triangles.size();++i)
{
Triangle &t=triangles[i];
for (std::size_t j=0;j<3;++j)
{
Vertex &v=vertices[t.v[j]];
refs[v.tstart+v.tcount].tid=i;
refs[v.tstart+v.tcount].tvertex=j;
v.tcount++;
}
}
// Identify boundary : vertices[].border=0,1
if (iteration == 0)
{
std::vector<int> vcount,vids;
for (std::size_t i=0;i<vertices.size();++i)
vertices[i].border=0;
for (std::size_t i=0;i<vertices.size();++i)
{
Vertex &v=vertices[i];
vcount.clear();
vids.clear();
for (int j=0; j<v.tcount; ++j)
{
int k=refs[v.tstart+j].tid;
Triangle &t=triangles[k];
for (int k=0;k<3;++k)
{
std::size_t ofs=0; int id=t.v[k];
while(ofs<vcount.size())
{
if (vids[ofs]==id)
break;
ofs++;
}
if(ofs==vcount.size())
{
vcount.push_back(1);
vids.push_back(id);
}
else
{
vcount[ofs]++;
}
}
}
for (std::size_t j=0;j<vcount.size();++j) {
if (vcount[j]==1)
vertices[vids[j]].border=1;
}
}
}
}
// Finally compact mesh before exiting
void Simplify::compact_mesh()
{
int dst=0;
for (std::size_t i=0;i<vertices.size();++i)
{
vertices[i].tcount=0;
}
for (std::size_t i=0;i<triangles.size();++i)
{
if (!triangles[i].deleted)
{
Triangle &t=triangles[i];
triangles[dst++]=t;
for (std::size_t j=0;j<3;++j)
vertices[t.v[j]].tcount=1;
}
}
triangles.resize(dst);
dst=0;
for (std::size_t i=0;i<vertices.size();++i)
{
if (vertices[i].tcount)
{
vertices[i].tstart=dst;
vertices[dst].p=vertices[i].p;
dst++;
}
}
for (std::size_t i=0;i<triangles.size();++i)
{
Triangle &t=triangles[i];
for (std::size_t j=0;j<3;++j)
t.v[j]=vertices[t.v[j]].tstart;
}
vertices.resize(dst);
}
// Error between vertex and Quadric
double Simplify::vertex_error(const SymmetricMatrix& q, double x, double y, double z)
{
return q[0]*x*x + 2*q[1]*x*y + 2*q[2]*x*z + 2*q[3]*x + q[4]*y*y
+ 2*q[5]*y*z + 2*q[6]*y + q[7]*z*z + 2*q[8]*z + q[9];
}
// Error for one edge
double Simplify::calculate_error(int id_v1, int id_v2, vec3f &p_result)
{
// compute interpolated vertex
SymmetricMatrix q = vertices[id_v1].q + vertices[id_v2].q;
bool border = vertices[id_v1].border & vertices[id_v2].border;
double error=0;
double det = q.det(0, 1, 2, 1, 4, 5, 2, 5, 7);
if (det != 0 && !border)
{
// q_delta is invertible
p_result.x = -1/det*(q.det(1, 2, 3, 4, 5, 6, 5, 7 , 8)); // vx = A41/det(q_delta)
p_result.y = 1/det*(q.det(0, 2, 3, 1, 5, 6, 2, 7 , 8)); // vy = A42/det(q_delta)
p_result.z = -1/det*(q.det(0, 1, 3, 1, 4, 6, 2, 5, 8)); // vz = A43/det(q_delta)
error = vertex_error(q, p_result.x, p_result.y, p_result.z);
}
else
{
// det = 0 -> try to find best result
vec3f p1=vertices[id_v1].p;
vec3f p2=vertices[id_v2].p;
vec3f p3=(p1+p2)/2;
double error1 = vertex_error(q, p1.x,p1.y,p1.z);
double error2 = vertex_error(q, p2.x,p2.y,p2.z);
double error3 = vertex_error(q, p3.x,p3.y,p3.z);
error = std::min(error1, std::min(error2, error3));
if (error1 == error)
p_result=p1;
if (error2 == error)
p_result=p2;
if (error3 == error)
p_result=p3;
}
return error;
}
///////////////////////////////////////////
// clang-format on
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