# # Poly2Tri # Copyright (c) 2009, Mason Green # http://code.google.com/p/poly2tri/ # # All rights reserved. # # Redistribution and use in source and binary forms, with or without modification, # are permitted provided that the following conditions are met: # # Redistributions of source code must retain the above copyright notice, # self list of conditions and the following disclaimer. # Redistributions in binary form must reproduce the above copyright notice, # self list of conditions and the following disclaimer in the documentation # and/or other materials provided with the distribution. # Neither the name of Poly2Tri nor the names of its contributors may be # used to endorse or promote products derived from self software without specific # prior written permission. # # THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS # "AS IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT # LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR # A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT OWNER OR # CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, # EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, # PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR # PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF # LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING # NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF THIS # SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. # from random import shuffle ## ## Based on Raimund Seidel'e paper "A simple and fast incremental randomized ## algorithm for computing trapezoidal decompositions and for triangulating polygons" ## (Ported from poly2tri) ## # Shear transform. May effect numerical robustness SHEAR = 1e-6 cdef extern from 'math.h': double atan2(double, double) cdef extern from 'predicates.h': double orient2d(double *pa, double *pb, double *pc) class Point(object): def __init__(self, x, y): self.x = x self.y = y self.next, self.prev = None, None def __sub__(self, other): if isinstance(other, Point): return Point(self.x - other.x, self.y - other.y) else: return Point(self.x - other, self.y - other) def __add__(self, other): if isinstance(other, Point): return Point(self.x + other.x, self.y + other.y) else: return Point(self.x + other, self.y + other) def __mul__(self, f): return Point(self.x * f, self.y * f) def __div__(self, a): return Point(self.x / a, self.y / a) def cross(self, p): return self.x * p.y - self.y * p.x def dot(self, p): return self.x * p.x + self.y * p.y def length(self): return sqrt(self.x * self.x + self.y * self.y) def normalize(self): return self / self.length() def less(self, p): return self.x < p.x def neq(self, other): return other.x != self.x or other.y != self.y def clone(self): return Point(self.x, self.y) class Edge(object): def __init__(self, p, q): self.p = p self.q = q self.slope = (q.y - p.y) / (q.x - p.x) self.b = p.y - (p.x * self.slope) self.above, self.below = None, None self.mpoints = [] self.mpoints.append(p) self.mpoints.append(q) ## ## NOTE Rounding accuracy significantly effects numerical robustness!!! ## def is_above(self, point): cdef double *a = [self.p.x, self.p.y] cdef double *b = [self.q.x, self.q.y] cdef double *c = [point.x, point.y] return orient2d(a, b, c) < 0 def is_below(self, point): cdef double *a = [self.p.x, self.p.y] cdef double *b = [self.q.x, self.q.y] cdef double *c = [point.x, point.y] return orient2d(a, b, c) > 0 def intersect(self, c, d): a = self.p b = self.q a1 = self.signed_area(a, b, d) a2 = self.signed_area(a, b, c) if a1 != 0.0 and a2 != 0.0 and (a1 * a2) < 0.0: a3 = self.signed_area(c, d, a) a4 = a3 + a2 - a1 if a3 * a4 < 0.0: t = a3 / (a3 - a4) return a + ((b - a) * t) return 0.0 def signed_area(self, a, b, c): return (a.x - c.x) * (b.y - c.y) - (a.y - c.y) * (b.x - c.x) class Trapezoid(object): def __init__(self, left_point, right_point, top, bottom): self.left_point = left_point self.right_point = right_point self.top = top self.bottom = bottom self.upper_left = None self.upper_right = None self.lower_left = None self.lower_right = None self.inside = True self.sink = None self.key = hash(self) def update_left(self, ul, ll): self.upper_left = ul if ul != None: ul.upper_right = self self.lower_left = ll if ll != None: ll.lower_right = self def update_right(self, ur, lr): self.upper_right = ur if ur != None: ur.upper_left = self self.lower_right = lr if lr != None: lr.lower_left = self def update_left_right(self, ul, ll, ur, lr): self.upper_left = ul if ul != None: ul.upper_right = self self.lower_left = ll if ll != None: ll.lower_right = self self.upper_right = ur if ur != None: ur.upper_left = self self.lower_right = lr if lr != None: lr.lower_left = self def trim_neighbors(self): if self.inside: self.inside = False if self.upper_left != None: self.upper_left.trim_neighbors() if self.lower_left != None: self.lower_left.trim_neighbors() if self.upper_right != None: self.upper_right.trim_neighbors() if self.lower_right != None: self.lower_right.trim_neighbors() def contains(self, point): return (point.x > self.left_point.x and point.x < self.right_point.x and self.top.is_above(point) and self.bottom.is_below(point)) def vertices(self): v1 = line_intersect(self.top, self.left_point.x) v2 = line_intersect(self.bottom, self.left_point.x) v3 = line_intersect(self.bottom, self.right_point.x) v4 = line_intersect(self.top, self.right_point.x) return v1, v2, v3, v4 def add_points(self): if self.left_point != self.bottom.p: self.bottom.mpoints.append(self.left_point.clone()) if self.right_point != self.bottom.q: self.bottom.mpoints.append(self.right_point.clone()) if self.left_point != self.top.p: self.top.mpoints.append(self.left_point.clone()) if self.right_point != self.top.q: self.top.mpoints.append(self.right_point.clone()) def line_intersect(edge, x): y = edge.slope * x + edge.b return x, y class Triangulator(object): def __init__(self, poly_line): assert len(poly_line) > 3, "Number of points must be > 3" self.polygons = [] self.trapezoids = [] self.xmono_poly = [] self.edge_list = self.init_edges(poly_line) self.trapezoidal_map = TrapezoidalMap() self.bounding_box = self.trapezoidal_map.bounding_box(self.edge_list) self.query_graph = QueryGraph(isink(self.bounding_box)) self.process() def triangles(self): triangles = [] for p in self.polygons: verts = [] for v in p: verts.append((v.x, v.y)) triangles.append(verts) return triangles def trapezoid_map(self): return self.trapezoidal_map.map # Build the trapezoidal map and query graph def process(self): for edge in self.edge_list: traps = self.query_graph.follow_edge(edge) for t in traps: # Remove old trapezods del self.trapezoidal_map.map[t.key] # Bisect old trapezoids and create new cp = t.contains(edge.p) cq = t.contains(edge.q) if cp and cq: tlist = self.trapezoidal_map.case1(t, edge) self.query_graph.case1(t.sink, edge, tlist) elif cp and not cq: tlist = self.trapezoidal_map.case2(t, edge) self.query_graph.case2(t.sink, edge, tlist) elif not cp and not cq: tlist = self.trapezoidal_map.case3(t, edge) self.query_graph.case3(t.sink, edge, tlist) else: tlist = self.trapezoidal_map.case4(t, edge) self.query_graph.case4(t.sink, edge, tlist) # Add new trapezoids to map for t in tlist: self.trapezoidal_map.map[t.key] = t self.trapezoidal_map.clear() # Mark outside trapezoids w/ depth-first search for k, t in self.trapezoidal_map.map.items(): self.mark_outside(t) # Collect interior trapezoids for k, t in self.trapezoidal_map.map.items(): if t.inside: self.trapezoids.append(t) t.add_points() # Generate the triangles self.create_mountains() def mono_polies(self): polies = [] for x in self.xmono_poly: polies.append(x.monoPoly) return polies def create_mountains(self): for edge in self.edge_list: if len(edge.mpoints) > 2: mountain = MonotoneMountain() points = merge_sort(edge.mpoints) for p in points: mountain.add(p) mountain.process() for t in mountain.triangles: self.polygons.append(t) self.xmono_poly.append(mountain) def mark_outside(self, t): if t.top is self.bounding_box.top or t.bottom is self.bounding_box.bottom: t.trim_neighbors() def init_edges(self, points): edge_list = [] size = len(points) for i in range(size): j = i + 1 if i < size-1 else 0 p = points[i][0], points[i][1] q = points[j][0], points[j][1] edge_list.append((p, q)) return self.order_edges(edge_list) def order_edges(self, edge_list): edges = [] for e in edge_list: p = shear_transform(e[0]) q = shear_transform(e[1]) if p.x > q.x: edges.append(Edge(q, p)) else: edges.append(Edge(p, q)) # Randomized incremental algorithm shuffle(edges) return edges def shear_transform(point): return Point(point[0] + SHEAR * point[1], point[1]) def merge_sort(l): if len(l)>1 : lleft = merge_sort(l[:len(l)/2]) lright = merge_sort(l[len(l)/2:]) p1, p2, p = 0, 0, 0 while p1 max.x: max = Point(e.p.x + margin, max.y) if e.p.y > max.y: max = Point(max.x, e.p.y + margin) if e.q.x > max.x: max = Point(e.q.x + margin, max.y) if e.q.y > max.y: max = Point(max.x, e.q.y + margin) if e.p.x < min.x: min = Point(e.p.x - margin, min.y) if e.p.y < min.y: min = Point(min.x, e.p.y - margin) if e.q.x < min.x: min = Point(e.q.x - margin, min.y) if e.q.y < min.y: min = Point(min.x, e.q.y - margin) top = Edge(Point(min.x, max.y), Point(max.x, max.y)) bottom = Edge(Point(min.x, min.y), Point(max.x, min.y)) left = top.p right = top.q trap = Trapezoid(left, right, top, bottom) self.map[trap.key] = trap return trap class Node(object): def __init__(self, lchild, rchild): self.parent_list = [] self.lchild = lchild self.rchild = rchild if lchild != None: lchild.parent_list.append(self) if rchild != None: rchild.parent_list.append(self) def replace(self, node): for parent in node.parent_list: if parent.lchild is node: parent.lchild = self else: parent.rchild = self self.parent_list += node.parent_list class Sink(Node): def __init__(self, trapezoid): super(Sink, self).__init__(None, None) self.trapezoid = trapezoid trapezoid.sink = self def locate(self, edge): return self def isink(trapezoid): if trapezoid.sink is None: return Sink(trapezoid) return trapezoid.sink class XNode(Node): def __init__(self, point, lchild, rchild): super(XNode, self).__init__(lchild, rchild) self.point = point def locate(self, edge): if edge.p.x >= self.point.x: return self.rchild.locate(edge) return self.lchild.locate(edge) class YNode(Node): def __init__(self, edge, lchild, rchild): super(YNode, self).__init__(lchild, rchild) self.edge = edge def locate(self, edge): if self.edge.is_above(edge.p): return self.rchild.locate(edge) if self.edge.is_below(edge.p): return self.lchild.locate(edge) if edge.slope < self.edge.slope: return self.rchild.locate(edge) return self.lchild.locate(edge) class QueryGraph: def __init__(self, head): self.head = head def locate(self, edge): return self.head.locate(edge).trapezoid def follow_edge(self, edge): trapezoids = [self.locate(edge)] while(edge.q.x > trapezoids[-1].right_point.x): if edge.is_above(trapezoids[-1].right_point): trapezoids.append(trapezoids[-1].upper_right) else: trapezoids.append(trapezoids[-1].lower_right) return trapezoids def replace(self, sink, node): if sink.parent_list: node.replace(sink) else: self.head = node def case1(self, sink, edge, tlist): yNode = YNode(edge, isink(tlist[1]), isink(tlist[2])) qNode = XNode(edge.q, yNode, isink(tlist[3])) pNode = XNode(edge.p, isink(tlist[0]), qNode) self.replace(sink, pNode) def case2(self, sink, edge, tlist): yNode = YNode(edge, isink(tlist[1]), isink(tlist[2])) pNode = XNode(edge.p, isink(tlist[0]), yNode) self.replace(sink, pNode) def case3(self, sink, edge, tlist): yNode = YNode(edge, isink(tlist[0]), isink(tlist[1])) self.replace(sink, yNode) def case4(self, sink, edge, tlist): yNode = YNode(edge, isink(tlist[0]), isink(tlist[1])) qNode = XNode(edge.q, yNode, isink(tlist[2])) self.replace(sink, qNode) PI_SLOP = 3.1 class MonotoneMountain: def __init__(self): self.size = 0 self.tail = None self.head = None self.positive = False self.convex_points = [] self.mono_poly = [] self.triangles = [] self.convex_polies = [] def add(self, point): if self.size is 0: self.head = point self.size = 1 elif self.size is 1: if point.neq(self.head): self.tail = point self.tail.prev = self.head self.head.next = self.tail self.size = 2 else: if point.neq(self.tail): self.tail.next = point point.prev = self.tail self.tail = point self.size += 1 def remove(self, point): next = point.next prev = point.prev point.prev.next = next point.next.prev = prev self.size -= 1 def process(self): self.positive = self.angle_sign() self.gen_mono_poly() p = self.head.next while p != self.tail: a = self.angle(p) if a >= PI_SLOP or a <= -PI_SLOP or a == 0: self.remove(p) elif self.is_convex(p): self.convex_points.append(p) p = p.next self.triangulate() def triangulate(self): while self.convex_points: ear = self.convex_points.pop(0) a = ear.prev b = ear c = ear.next triangle = (a, b, c) self.triangles.append(triangle) self.remove(ear) if self.valid(a): self.convex_points.append(a) if self.valid(c): self.convex_points.append(c) #assert self.size <= 3, "Triangulation bug, please report" def valid(self, p): return p != self.head and p != self.tail and self.is_convex(p) def gen_mono_poly(self): p = self.head while(p != None): self.mono_poly.append(p) p = p.next def angle(self, p): a = p.next - p b = p.prev - p return atan2(a.cross(b), a.dot(b)) def angle_sign(self): a = self.head.next - self.head b = self.tail - self.head return atan2(a.cross(b), a.dot(b)) >= 0 def is_convex(self, p): if self.positive != (self.angle(p) >= 0): return False return True