1 files changed, 245 insertions, 0 deletions
diff --git a/src/3rdparty/2geom/src/2geom/solve-bezier-one-d.cpp b/src/3rdparty/2geom/src/2geom/solve-bezier-one-d.cpp
new file mode 100644
index 0000000..3a25e98
--- /dev/null
+++ b/src/3rdparty/2geom/src/2geom/solve-bezier-one-d.cpp
@@ -0,0 +1,245 @@
+
+#include <2geom/solver.h>
+#include <2geom/choose.h>
+#include <2geom/bezier.h>
+#include <2geom/point.h>
+
+#include <cmath>
+#include <algorithm>
+//#include <valarray>
+
+/*** Find the zeros of the bernstein function.  The code subdivides until it is happy with the
+ * linearity of the function.  This requires an O(degree^2) subdivision for each step, even when
+ * there is only one solution.
+ */
+
+namespace Geom{
+
+template<class t>
+static int SGN(t x) { return (x > 0 ? 1 : (x < 0 ? -1 : 0)); }
+
+//const unsigned MAXDEPTH = 23; // Maximum depth for recursion.  Using floats means 23 bits precision max
+
+//const double BEPSILON = ldexp(1.0,(-MAXDEPTH-1)); /*Flatness control value */
+//const double SECANT_EPSILON = 1e-13; // secant method converges much faster, get a bit more precision
+/**
+ * This function is called _a lot_.  We have included various manual memory management stuff to reduce the amount of mallocing that goes on.  In the future it is possible that this will hurt performance.
+ **/
+class Bernsteins{
+public:
+    static const size_t MAX_DEPTH = 53;
+    size_t degree, N;
+    std::vector<double> &solutions;
+    //std::vector<double> bc;
+    BinomialCoefficient<double> bc;
+
+    Bernsteins(size_t _degree, std::vector<double> & sol)
+        : degree(_degree), N(degree+1), solutions(sol), bc(degree)
+    {
+    }
+
+    unsigned
+    control_poly_flat_enough(double const *V);
+
+    void
+    find_bernstein_roots(double const *w, /* The control points  */
+                         unsigned depth,  /* The depth of the recursion */
+                         double left_t, double right_t);
+};
+/*
+ *  find_bernstein_roots : Given an equation in Bernstein-Bernstein form, find all
+ *    of the roots in the open interval (0, 1).  Return the number of roots found.
+ */
+void
+find_bernstein_roots(double const *w, /* The control points  */
+                     unsigned degree,   /* The degree of the polynomial */
+                     std::vector<double> &solutions, /* RETURN candidate t-values */
+                     unsigned depth,    /* The depth of the recursion */
+                     double left_t, double right_t, bool /*use_secant*/)
+{
+    Bernsteins B(degree, solutions);
+    B.find_bernstein_roots(w, depth, left_t, right_t);
+}
+
+void
+find_bernstein_roots(std::vector<double> &solutions, /* RETURN candidate t-values */
+                     Geom::Bezier const &bz, /* The control points  */
+                     double left_t, double right_t)
+{
+    Bernsteins B(bz.degree(), solutions);
+    Geom::Bezier& bzl = const_cast<Geom::Bezier&>(bz);
+    double* w = &(bzl[0]);
+    B.find_bernstein_roots(w, 0, left_t, right_t);
+}
+
+
+
+void Bernsteins::find_bernstein_roots(double const *w, /* The control points  */
+                          unsigned depth,    /* The depth of the recursion */
+                          double left_t,
+                          double right_t)
+{
+
+    size_t n_crossings = 0;
+
+    int old_sign = SGN(w[0]);
+    //std::cout << "w[0] = " << w[0] << std::endl;
+    for (size_t i = 1; i < N; i++)
+    {
+        //std::cout << "w[" << i << "] = " << w[i] << std::endl;
+        int sign = SGN(w[i]);
+        if (sign != 0)
+        {
+            if (sign != old_sign && old_sign != 0)
+            {
+               ++n_crossings;
+            }
+            old_sign = sign;
+        }
+    }
+    //std::cout << "n_crossings = " << n_crossings << std::endl;
+    if (n_crossings == 0)  return; // no solutions here
+
+    if (n_crossings == 1) /* Unique solution  */
+    {
+        //std::cout << "depth = " << depth << std::endl;
+        /* Stop recursion when the tree is deep enough  */
+        /* if deep enough, return 1 solution at midpoint  */
+        if (depth > MAX_DEPTH)
+        {
+            //printf("bottom out %d\n", depth);
+            const double Ax = right_t - left_t;
+            const double Ay = w[degree] - w[0];
+
+            solutions.push_back(left_t - Ax*w[0] / Ay);
+            return;
+        }
+
+
+        double s = 0, t = 1;
+        double e = 1e-10;
+        int side = 0;
+        double r, fs = w[0], ft = w[degree];
+
+        for (size_t n = 0; n < 100; ++n)
+        {
+            r = (fs*t - ft*s) / (fs - ft);
+            if (fabs(t-s) < e * fabs(t+s))  break;
+
+            double fr = bernstein_value_at(r, w, degree);
+
+            if (fr * ft > 0)
+            {
+                t = r; ft = fr;
+                if (side == -1) fs /= 2;
+                side = -1;
+            }
+            else if (fs * fr > 0)
+            {
+                s = r;  fs = fr;
+                if (side == +1) ft /= 2;
+                side = +1;
+            }
+            else break;
+        }
+        solutions.push_back(r*right_t + (1-r)*left_t);
+        return;
+
+    }
+
+    /* Otherwise, solve recursively after subdividing control polygon  */
+//    double Left[N], /* New left and right  */
+//           Right[N];    /* control polygons  */
+    //const double t = 0.5;
+    double* LR = new double[2*N];
+    double* Left = LR;
+    double* Right = LR + N;
+
+    std::copy(w, w + N, Right);
+
+    Left[0] = Right[0];
+    for (size_t i = 1; i < N; ++i)
+    {
+        for (size_t j = 0; j < N-i; ++j)
+        {
+            Right[j] = (Right[j] + Right[j+1]) * 0.5;
+        }
+        Left[i] = Right[0];
+    }
+
+    double mid_t = (left_t + right_t) * 0.5;
+
+
+    find_bernstein_roots(Left, depth+1, left_t, mid_t);
+
+
+    /* Solution is exactly on the subdivision point. */
+    if (Right[0] == 0)
+    {
+        solutions.push_back(mid_t);
+    }
+
+    find_bernstein_roots(Right, depth+1, mid_t, right_t);
+    delete[] LR;
+}
+
+#if 0
+/*
+ *  control_poly_flat_enough :
+ *	Check if the control polygon of a Bernstein curve is flat enough
+ *	for recursive subdivision to bottom out.
+ *
+ */
+unsigned
+Bernsteins::control_poly_flat_enough(double const *V)
+{
+    /* Find the perpendicular distance from each interior control point to line connecting V[0] and
+     * V[degree] */
+
+    /* Derive the implicit equation for line connecting first */
+    /*  and last control points */
+    const double a = V[0] - V[degree];
+
+    double max_distance_above = 0.0;
+    double max_distance_below = 0.0;
+    double ii = 0, dii = 1./degree;
+    for (unsigned i = 1; i < degree; i++) {
+        ii += dii;
+        /* Compute distance from each of the points to that line */
+        const double d = (a + V[i]) * ii  - a;
+        double dist = d*d;
+    // Find the largest distance
+        if (d < 0.0)
+            max_distance_below = std::min(max_distance_below, -dist);
+        else
+            max_distance_above = std::max(max_distance_above, dist);
+    }
+
+    const double abSquared = 1./((a * a) + 1);
+
+    const double intercept_1 = (a - max_distance_above * abSquared);
+    const double intercept_2 = (a - max_distance_below * abSquared);
+
+    /* Compute bounding interval*/
+    const double left_intercept = std::min(intercept_1, intercept_2);
+    const double right_intercept = std::max(intercept_1, intercept_2);
+
+    const double error = 0.5 * (right_intercept - left_intercept);
+    //printf("error %g %g %g\n", error, a, BEPSILON * a);
+    return error < BEPSILON * a;
+}
+#endif
+
+
+};
+
+/*
+  Local Variables:
+  mode:c++
+  c-file-style:"stroustrup"
+  c-file-offsets:((innamespace . 0)(inline-open . 0)(case-label . +))
+  indent-tabs-mode:nil
+  fill-column:99
+  End:
+*/
+// vim: filetype=cpp:expandtab:shiftwidth=4:tabstop=8:softtabstop=4:fileencoding=utf-8:textwidth=99 :