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Adds a module for triangulation

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Bowyer-Watson algorithm.
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Johann Dreo 2014-03-25 20:59:35 +01:00
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import sys
import math
from utils import tour,LOG,LOGN
from itertools import ifilterfalse as filter_if_not
# Based on http://paulbourke.net/papers/triangulate/
# Efficient Triangulation Algorithm Suitable for Terrain Modelling
# An Algorithm for Interpolating Irregularly-Spaced Data
# with Applications in Terrain Modelling
# Written by Paul Bourke
# Presented at Pan Pacific Computer Conference, Beijing, China.
# January 1989
def x( point ):
return point[0]
def y( point ):
return point[1]
def mid( xy, pa, pb ):
return ( xy(pa) + xy(pb) ) / 2.0
def middle( pa, pb ):
return mid(x,pa,pb),mid(y,pa,pb)
def mtan( pa, pb ):
return -1 * ( x(pa) - x(pb) ) / ( y(pa) - y(pb) )
class CoincidentPointsError(Exception):
"""Coincident points"""
pass
def circumcircle( triangle, epsilon = sys.float_info.epsilon ):
"""Compute the circumscribed circle of a triangle and
Return a 2-tuple: ( (center_x, center_y), radius )"""
assert( len(triangle) == 3 )
p0,p1,p2 = triangle
assert( len(p0) == 2 )
assert( len(p1) == 2 )
assert( len(p2) == 2 )
dy01 = abs( y(p0) - y(p1) )
dy12 = abs( y(p1) - y(p2) )
if dy01 < epsilon and dy12 < epsilon:
# coincident points
raise CoincidentPointsError
elif dy01 < epsilon:
m12 = mtan( p2,p1 )
mx12,my12 = middle( p1, p2 )
cx = mid( x, p1, p0 )
cy = m12 * (cx - mx12) + my12
elif dy12 < epsilon:
m01 = mtan( p1, p0 )
mx01,my01 = middle( p0, p1 )
cx = mid( x, p2, p1 )
cy = m01 * ( cx - mx01 ) + my01
else:
m01 = mtan( p1, p0 )
m12 = mtan( p2, p1 )
mx01,my01 = middle( p0, p1 )
mx12,my12 = middle( p1, p2 )
cx = ( m01 * mx01 - m12 * mx12 + my12 - my01 ) / ( m01 - m12 )
if dy01 > dy12:
cy = m01 * ( cx - mx01 ) + my01
else:
cy = m12 * ( cx - mx12 ) + my12
dx1 = x(p1) - cx
dy1 = y(p1) - cy
r = math.sqrt(dx1**2 + dy1**2)
return (cx,cy),r
def in_circle( p, center, radius, epsilon = sys.float_info.epsilon ):
"""Return True if the given point p is in the circumscribe circle of the given triangle"""
assert( len(p) == 2 )
cx,cy = center
dxp = x(p) - cx
dyp = y(p) - cy
dr = math.sqrt(dxp**2 + dyp**2)
if (dr - radius) <= epsilon:
return True
else:
return False
def in_circumcircle( p, triangle, epsilon = sys.float_info.epsilon ):
"""Return True if the given point p is in the circumscribe circle of the given triangle"""
assert( len(p) == 2 )
(cx,cy),r = circumcircle( triangle, epsilon )
return in_circle( p, (cx,cy), r, epsilon )
def bounds( vertices ):
# find vertices set bounds
xmin = x(vertices[0])
ymin = y(vertices[0])
xmax = xmin
ymax = ymin
# we do not use min(vertices,key=x) because it would iterate 4 times over the list, instead of just one
for v in vertices:
xmin = min(x(v),xmin)
xmax = max(x(v),xmax)
ymin = min(y(v),ymin)
ymax = max(y(v),ymax)
return (xmin,ymin),(xmax,ymax)
def edges_of( triangulation ):
edges = []
for t in triangulation:
for e in utils.tour(list(t)):
edges.append( e )
return edges
def delaunay_bowyer_watson( points, epsilon = sys.float_info.epsilon, supert=20, do_plot = True ):
if do_plot and len(points) > 10:
print "WARNING it is a bad idea to plot each steps of a triangulation of many points"
return []
# sort points first on the x-axis, then on the y-axis
vertices = sorted( points )
(xmin,ymin),(xmax,ymax) = bounds( vertices )
dx = xmax - xmin
dy = ymax - ymin
dmax = max( dx, dy )
xmid = (xmax + xmin) / 2.0
ymid = (ymax + ymin ) / 2.0
# compute the super triangle, that encompasses all the vertices
supertri = ( (xmid-supert*dmax, ymid-dmax ),
(xmid, ymid+supert*dmax),
(xmid+supert*dmax, ymid-dmax) )
LOGN( "super-triangle",supertri )
# it is the first triangle of the list
triangles = [ supertri ]
completed = { supertri: False }
# The predicate returns true if at least one of the vertices
# is also found in the supertriangle
def match_supertriangle( tri ):
if tri[0] in supertri or \
tri[1] in supertri or \
tri[2] in supertri:
return True
# insert vertices one by one
it=0
for vi,vertex in enumerate(vertices):
LOGN( "\tvertex",vertex )
assert( len(vertex) == 2 )
if do_plot:
fig = plot.figure()
ax = fig.add_subplot(111)
scatter_x = [ p[0] for p in vertices[:vi]+list(supertri)]
scatter_y = [ p[1] for p in vertices[:vi]+list(supertri)]
ax.scatter( scatter_x,scatter_y, s=30, marker='o', facecolor="black")
ax.scatter( vertex[0],vertex[1], s=30, marker='o', facecolor="red")
uberplot.plot_segments( ax, edges_of(triangles), edgecolor = "blue", alpha=0.3, linestyle='dashed' )
# All the triangles whose circumcircle encloses the point to be added are identified,
# the outside edges of those triangles form an enclosing polygon.
# forget previous candidate polygon's edges
enclosing = []
removed = []
for triangle in triangles:
LOGN( "\t\ttriangle",triangle )
assert( len(triangle) == 3 )
# if completed has a key, test it, else return False
if completed.get( triangle, False ):
LOGN( "\t\t\tAlready completed" )
# if do_plot:
# uberplot.plot_segments( ax, tour(list(triangle)), edgecolor = "magenta", alpha=1, lw=1, linestyle='dotted' )
continue
LOGN( "\t\t\tCircumcircle" )
assert( triangle[0] != triangle[1] and triangle[1] != triangle [2] and triangle[2] != triangle[0] )
center,radius = circumcircle( triangle, epsilon )
# if it match Delaunay's conditions
if x(center) < x(vertex) and math.sqrt((x(vertex)-x(center))**2) > radius:
LOGN( "\t\t\tMatch Delaunay, mark as completed" )
completed[triangle] = True
# if the current vertex is inside the circumscribe circle of the current triangle
# add the current triangle's edges to the candidate polygon
if in_circle( vertex, center, radius, epsilon ):
LOGN( "\t\t\tIn circumcircle, add to enclosing polygon",triangle )
if do_plot:
# if not match_supertriangle( triangle ):
circ = plot.Circle(center, radius, facecolor='yellow', edgecolor="orange", alpha=0.1)
ax.add_patch(circ)
for p0,p1 in tour(list(triangle)):
# then add this edge to the polygon enclosing the vertex
enclosing.append( (p0,p1) )
# and remove the corresponding triangle from the current triangulation
removed.append( triangle )
completed.pop(triangle,None)
elif do_plot:
# if not match_supertriangle( triangle ):
circ = plot.Circle(center, radius, facecolor='lightgrey', edgecolor="grey", alpha=0.1)
ax.add_patch(circ)
# end for triangle in triangles
# The triangles in the enclosing polygon are deleted and
# new triangles are formed between the point to be added and
# each outside edge of the enclosing polygon.
# actually remove triangles
for triangle in removed:
# if do_plot:
# if not match_supertriangle( triangle ):
# uberplot.plot_segments( ax, tour(list(triangle)), edgecolor = "orange", alpha=0.3, lw=2 )
triangles.remove(triangle)
# remove duplicated edges
# this leaves the edges of the enclosing polygon only,
# because enclosing edges are only in a single triangle,
# but edges inside the polygon are at least in two triangles.
# duplicated = []
# for i,ei in enumerate(enclosing):
# for j,ej in enumerate(enclosing,i+1):
# if (ei[0] == ej[1] and ei[1] == ej[0]) or (ei[0] == ej[0] and ei[1] == ej[1]):
# duplicated.append( ei )
# for e in duplicated:
# enclosing.remove(e)
hull = []
for i,(p0,p1) in enumerate(enclosing):
if (p0,p1) not in enclosing[i+1:] and (p1,p0) not in enclosing:
hull.append((p0,p1))
if do_plot:
uberplot.plot_segments( ax, hull, edgecolor = "red", alpha=1, lw=1, linestyle='solid' )
# create new triangles using the current vertex and the enclosing hull
# All candidates should be arranged in clockwise order!
LOGN( "\t\tCreate new triangles" )
for p0,p1 in hull:
assert( p0 != p1 )
# if p0 != vertex and p1 != vertex:
# triangle = tuple(sorted([p0,p1,vertex]))
triangle = tuple([p0,p1,vertex])
LOGN("\t\t\tNew triangle",triangle)
triangles.append( triangle )
completed[triangle] = False
if do_plot: # linestyle = ['solid' | 'dashed' | 'dashdot' | 'dotted']
uberplot.plot_segments( ax, tour(list(triangle)), edgecolor = "green", alpha=0.3, linestyle='solid' )
with open("triangulation_%i.dat" % it, 'w') as fd:
for triangle in triangles:
for edge in tour(list(triangle)):
coords = tuple([coord for point in edge for coord in point])
fd.write( "%f %f %f %f\n" % coords )
if do_plot:
# ax.set_ylim([-100,200])
# ax.set_xlim([-100,200])
plot.savefig("triangulation_%i.png" % it, dpi=300)
plot.close()
it+=1
# end for vertex in vertices
# Remove triangles that have at least one of the supertriangle vertices
LOGN( "\tRemove super-triangles" )
# filter out elements for which the predicate is False
# here: *keep* elements that *do not* have a common vertex
triangulation = filter_if_not( match_supertriangle, triangles )
return triangulation
if __name__ == "__main__":
import random
import utils
import uberplot
import matplotlib.pyplot as plot
from matplotlib.path import Path
import matplotlib.patches as patches
scale = 100
nb = 10
points = [ (scale*random.random(),scale*random.random()) for i in range(nb)]
# points = [
# (0,40),
# (100,60),
# (40,0),
# (50,100),
# (90,10),
# ]
triangles = delaunay_bowyer_watson( points, epsilon=10e-4, supert=3 )
edges = edges_of( triangles )
fig = plot.figure()
ax = fig.add_subplot(111)
uberplot.scatter_segments( ax, edges, facecolor = "red" )
uberplot.plot_segments( ax, edges, edgecolor = "blue", alpha=0.2 )
plot.show()