rougier/poisson-disk-sampling.py

## poisson-disk-sampling.py
def poisson_disk_sample(width=1.0, height=1.0, radius=0.025, k=30):
    # References: Fast Poisson Disk Sampling in Arbitrary Dimensions
    #             Robert Bridson, SIGGRAPH, 2007
    def squared_distance(p0, p1):
        return (p0[0]-p1[0])**2 + (p0[1]-p1[1])**2

    def random_point_around(p, k=1):
        # WARNING: This is not uniform around p but we can live with it
        R = np.random.uniform(radius, 2*radius, k)
        T = np.random.uniform(0, 2*np.pi, k)
        P = np.empty((k, 2))
        P[:, 0] = p[0]+R*np.sin(T)
        P[:, 1] = p[1]+R*np.cos(T)
        return P

    def in_limits(p):
        return 0 <= p[0] < width and 0 <= p[1] < height

    def neighborhood(shape, index, n=2):
        row, col = index
        row0, row1 = max(row-n, 0), min(row+n+1, shape[0])
        col0, col1 = max(col-n, 0), min(col+n+1, shape[1])
        I = np.dstack(np.mgrid[row0:row1, col0:col1])
        I = I.reshape(I.size//2, 2).tolist()
        I.remove([row, col])
        return I

    def in_neighborhood(p):
        i, j = int(p[0]/cellsize), int(p[1]/cellsize)
        if M[i, j]:
            return True
        for (i, j) in N[(i, j)]:
            if M[i, j] and squared_distance(p, P[i, j]) < squared_radius:
                return True
        return False

    def add_point(p):
        points.append(p)
        i, j = int(p[0]/cellsize), int(p[1]/cellsize)
        P[i, j], M[i, j] = p, True

    # Here `2` corresponds to the number of dimension
    cellsize = radius/np.sqrt(2)
    rows = int(np.ceil(width/cellsize))
    cols = int(np.ceil(height/cellsize))

    # Squared radius because we'll compare squared distance
    squared_radius = radius*radius

    # Positions cells
    P = np.zeros((rows, cols, 2), dtype=np.float32)
    M = np.zeros((rows, cols), dtype=bool)

    # Cache generation for neighborhood
    N = {}
    for i in range(rows):
        for j in range(cols):
            N[(i, j)] = neighborhood(M.shape, (i, j), 2)

    points = []
    add_point((np.random.uniform(width), np.random.uniform(height)))
    while len(points):
        i = np.random.randint(len(points))
        p = points[i]
        del points[i]
        Q = random_point_around(p, k)
        for q in Q:
            if in_limits(q) and not in_neighborhood(q):
                add_point(q)
    return P[M]
	def poisson_disk_sample(width=1.0, height=1.0, radius=0.025, k=30):
	# References: Fast Poisson Disk Sampling in Arbitrary Dimensions
	# Robert Bridson, SIGGRAPH, 2007
	def squared_distance(p0, p1):
	return (p0[0]-p1[0])2 + (p0[1]-p1[1])2

	def random_point_around(p, k=1):
	# WARNING: This is not uniform around p but we can live with it
	R = np.random.uniform(radius, 2*radius, k)
	T = np.random.uniform(0, 2*np.pi, k)
	P = np.empty((k, 2))
	P[:, 0] = p[0]+R*np.sin(T)
	P[:, 1] = p[1]+R*np.cos(T)
	return P

	def in_limits(p):
	return 0 <= p[0] < width and 0 <= p[1] < height

	def neighborhood(shape, index, n=2):
	row, col = index
	row0, row1 = max(row-n, 0), min(row+n+1, shape[0])
	col0, col1 = max(col-n, 0), min(col+n+1, shape[1])
	I = np.dstack(np.mgrid[row0:row1, col0:col1])
	I = I.reshape(I.size//2, 2).tolist()
	I.remove([row, col])
	return I

	def in_neighborhood(p):
	i, j = int(p[0]/cellsize), int(p[1]/cellsize)
	if M[i, j]:
	return True
	for (i, j) in N[(i, j)]:
	if M[i, j] and squared_distance(p, P[i, j]) < squared_radius:
	return True
	return False

	def add_point(p):
	points.append(p)
	i, j = int(p[0]/cellsize), int(p[1]/cellsize)
	P[i, j], M[i, j] = p, True

	# Here `2` corresponds to the number of dimension
	cellsize = radius/np.sqrt(2)
	rows = int(np.ceil(width/cellsize))
	cols = int(np.ceil(height/cellsize))

	# Squared radius because we'll compare squared distance
	squared_radius = radius*radius

	# Positions cells
	P = np.zeros((rows, cols, 2), dtype=np.float32)
	M = np.zeros((rows, cols), dtype=bool)

	# Cache generation for neighborhood
	N = {}
	for i in range(rows):
	for j in range(cols):
	N[(i, j)] = neighborhood(M.shape, (i, j), 2)

	points = []
	add_point((np.random.uniform(width), np.random.uniform(height)))
	while len(points):
	i = np.random.randint(len(points))
	p = points[i]
	del points[i]
	Q = random_point_around(p, k)
	for q in Q:
	if in_limits(q) and not in_neighborhood(q):
	add_point(q)
	return P[M]