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/* Copyright (c) 2012 Patrick Ruoff
*
* Permission to use, copy, modify, and/or distribute this software for any
* purpose with or without fee is hereby granted, provided that the above
* copyright notice and this permission notice appear in all copies.
*/
#include "point_tracker.h"
#include "ftnoir_tracker_pt_settings.h"
using namespace pt_types;
#include "compat/nan.hpp"
#include <vector>
#include <algorithm>
#include <cmath>
#include <QDebug>
constexpr unsigned PointModel::N_POINTS;
static void get_row(const mat33& m, int i, vec3& v)
{
v[0] = m(i,0);
v[1] = m(i,1);
v[2] = m(i,2);
}
static void set_row(mat33& m, int i, const vec3& v)
{
m(i,0) = v[0];
m(i,1) = v[1];
m(i,2) = v[2];
}
PointModel::PointModel(settings_pt& s)
{
set_model(s);
// calculate u
u = M01.cross(M02);
u /= norm(u);
// calculate projection matrix on M01,M02 plane
f s11 = M01.dot(M01);
f s12 = M01.dot(M02);
f s22 = M02.dot(M02);
P = 1/(s11*s22-s12*s12) * mat22(s22, -s12, -s12, s11);
}
void PointModel::set_model(settings_pt& s)
{
switch (s.active_model_panel)
{
case Clip:
M01 = vec3(0, static_cast<f>(s.clip_ty), -static_cast<f>(s.clip_tz));
M02 = vec3(0, -static_cast<f>(s.clip_by), -static_cast<f>(s.clip_bz));
break;
case Cap:
M01 = vec3(-static_cast<f>(s.cap_x), -static_cast<f>(s.cap_y), -static_cast<f>(s.cap_z));
M02 = vec3(static_cast<f>(s.cap_x), -static_cast<f>(s.cap_y), -static_cast<f>(s.cap_z));
break;
case Custom:
M01 = vec3(s.m01_x, s.m01_y, s.m01_z);
M02 = vec3(s.m02_x, s.m02_y, s.m02_z);
break;
}
}
void PointModel::get_d_order(const std::vector<vec2>& points, int* d_order, const vec2& d) const
{
// fit line to orthographically projected points
using t = std::pair<f,int>;
std::vector<t> d_vals;
// get sort indices with respect to d scalar product
for (unsigned i = 0; i < PointModel::N_POINTS; ++i)
d_vals.push_back(std::pair<f, int>(d.dot(points[i]), i));
std::sort(d_vals.begin(),
d_vals.end(),
[](const t& a, const t& b) { return a.first < b.first; });
for (unsigned i = 0; i < PointModel::N_POINTS; ++i)
d_order[i] = d_vals[i].second;
}
PointTracker::PointTracker() : init_phase(true)
{
}
PointTracker::PointOrder PointTracker::find_correspondences_previous(const std::vector<vec2>& points,
const PointModel& model,
f focal_length,
int w,
int h)
{
PointTracker::PointOrder p;
p[0] = project(vec3(0,0,0), focal_length);
p[1] = project(model.M01, focal_length);
p[2] = project(model.M02, focal_length);
const int diagonal = int(std::sqrt(w*w + h*h));
static constexpr int div = 100;
const int max_dist = diagonal / div; // 8 pixels for 640x480
// set correspondences by minimum distance to projected model point
bool point_taken[PointModel::N_POINTS];
for (unsigned i=0; i<PointModel::N_POINTS; ++i)
point_taken[i] = false;
for (unsigned i=0; i<PointModel::N_POINTS; ++i)
{
f min_sdist = 0;
unsigned min_idx = 0;
// find closest point to projected model point i
for (unsigned j=0; j<PointModel::N_POINTS; ++j)
{
vec2 d = p[i]-points[j];
f sdist = d.dot(d);
if (sdist < min_sdist || j==0)
{
min_idx = j;
min_sdist = sdist;
}
}
if (min_sdist > max_dist)
return find_correspondences(points, model);
// if one point is closest to more than one model point, fallback
if (point_taken[min_idx])
{
init_phase = true;
return find_correspondences(points, model);
}
point_taken[min_idx] = true;
p[i] = points[min_idx];
}
return p;
}
void PointTracker::track(const std::vector<vec2>& points,
const PointModel& model,
f focal_length,
bool dynamic_pose,
int init_phase_timeout,
int w,
int h)
{
PointOrder order;
if (t.elapsed_ms() > init_phase_timeout)
{
t.start();
init_phase = true;
}
if (!dynamic_pose || init_phase)
order = find_correspondences(points, model);
else
{
order = find_correspondences_previous(points, model, focal_length, w, h);
}
POSIT(model, order, focal_length);
init_phase = false;
t.start();
}
PointTracker::PointOrder PointTracker::find_correspondences(const std::vector<vec2>& points, const PointModel& model)
{
// We do a simple freetrack-like sorting in the init phase...
// sort points
int point_d_order[PointModel::N_POINTS];
int model_d_order[PointModel::N_POINTS];
vec2 d(model.M01[0]-model.M02[0], model.M01[1]-model.M02[1]);
model.get_d_order(points, point_d_order, d);
// calculate d and d_order for simple freetrack-like point correspondence
model.get_d_order(std::vector<vec2> {
vec2{0,0},
vec2(model.M01[0], model.M01[1]),
vec2(model.M02[0], model.M02[1])
},
model_d_order,
d);
// set correspondences
PointOrder p;
for (unsigned i = 0; i < PointModel::N_POINTS; ++i)
p[model_d_order[i]] = points[point_d_order[i]];
return p;
}
int PointTracker::POSIT(const PointModel& model, const PointOrder& order, f focal_length)
{
// POSIT algorithm for coplanar points as presented in
// [Denis Oberkampf, Daniel F. DeMenthon, Larry S. Davis: "Iterative Pose Estimation Using Coplanar Feature Points"]
// we use the same notation as in the paper here
// The expected rotation used for resolving the ambiguity in POSIT:
// In every iteration step the rotation closer to R_expected is taken
mat33 R_expected = mat33::eye();
// initial pose = last (predicted) pose
vec3 k;
get_row(R_expected, 2, k);
f Z0 = f(1000);
f old_epsilon_1 = 0;
f old_epsilon_2 = 0;
f epsilon_1 = 1;
f epsilon_2 = 1;
vec3 I0, J0;
vec2 I0_coeff, J0_coeff;
vec3 I_1, J_1, I_2, J_2;
mat33 R_1, R_2;
mat33* R_current = &R_1;
static constexpr int max_iter = 100;
using std::sqrt;
using std::atan;
using std::cos;
using std::sin;
using std::fabs;
int i=1;
for (; i<max_iter; ++i)
{
epsilon_1 = k.dot(model.M01)/Z0;
epsilon_2 = k.dot(model.M02)/Z0;
// vector of scalar products <I0, M0i> and <J0, M0i>
vec2 I0_M0i(order[1][0]*(1 + epsilon_1) - order[0][0],
order[2][0]*(1 + epsilon_2) - order[0][0]);
vec2 J0_M0i(order[1][1]*(1 + epsilon_1) - order[0][1],
order[2][1]*(1 + epsilon_2) - order[0][1]);
// construct projection of I, J onto M0i plane: I0 and J0
I0_coeff = model.P * I0_M0i;
J0_coeff = model.P * J0_M0i;
I0 = I0_coeff[0]*model.M01 + I0_coeff[1]*model.M02;
J0 = J0_coeff[0]*model.M01 + J0_coeff[1]*model.M02;
// calculate u component of I, J
f II0 = I0.dot(I0);
f IJ0 = I0.dot(J0);
f JJ0 = J0.dot(J0);
f rho, theta;
// CAVEAT don't change to comparison with an epsilon -sh 20160423
if (JJ0 == II0) {
rho = sqrt(fabs(2*IJ0));
theta = -M_PI/4;
if (IJ0<0) theta *= -1;
}
else {
rho = sqrt(sqrt( (JJ0-II0)*(JJ0-II0) + 4*IJ0*IJ0 ));
theta = atan( -2*IJ0 / (JJ0-II0) );
// avoid branch misprediction
theta += (JJ0 - II0 < 0) * M_PI;
theta *= f(.5);
}
// construct the two solutions
I_1 = I0 + rho*cos(theta)*model.u;
I_2 = I0 - rho*cos(theta)*model.u;
J_1 = J0 + rho*sin(theta)*model.u;
J_2 = J0 - rho*sin(theta)*model.u;
f norm_const = 1/cv::norm(I_1); // all have the same norm
// create rotation matrices
I_1 *= norm_const; J_1 *= norm_const;
I_2 *= norm_const; J_2 *= norm_const;
set_row(R_1, 0, I_1);
set_row(R_1, 1, J_1);
set_row(R_1, 2, I_1.cross(J_1));
set_row(R_2, 0, I_2);
set_row(R_2, 1, J_2);
set_row(R_2, 2, I_2.cross(J_2));
// the single translation solution
Z0 = norm_const * focal_length;
// pick the rotation solution closer to the expected one
// in simple metric d(A,B) = || I - A * B^T ||
f R_1_deviation = cv::norm(mat33::eye() - R_expected * R_1.t());
f R_2_deviation = cv::norm(mat33::eye() - R_expected * R_2.t());
if (R_1_deviation < R_2_deviation)
R_current = &R_1;
else
R_current = &R_2;
get_row(*R_current, 2, k);
// check for convergence condition
const f delta = fabs(epsilon_1 - old_epsilon_1) + fabs(epsilon_2 - old_epsilon_2);
if (!(delta > constants::eps))
break;
old_epsilon_1 = epsilon_1;
old_epsilon_2 = epsilon_2;
}
const f t[3] = {
order[0][0] * Z0/focal_length,
order[0][1] * Z0/focal_length,
Z0
};
const mat33& r = *R_current;
for (int i = 0; i < 3; i++)
for (int j = 0; j < 3; j++)
if (nanp(r(i, j)))
{
qDebug() << "posit nan";
return -1;
}
for (unsigned i = 0; i < 3; i++)
if (nanp(t[i]))
{
qDebug() << "posit nan";
return -1;
}
// apply results
X_CM.R = r;
X_CM.t[0] = t[0];
X_CM.t[1] = t[1];
X_CM.t[2] = t[2];
//qDebug() << "iter:" << i;
return i;
}
vec2 PointTracker::project(const vec3& v_M, f focal_length)
{
vec3 v_C = X_CM * v_M;
return vec2(focal_length*v_C[0]/v_C[2], focal_length*v_C[1]/v_C[2]);
}
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