gka/cartogram.py

## cartogram.py
"""
Generator for packed circle cartograms
"""
import proj, gisutils

class Cartogram:

	def loadCSV(self, url, key='id', value='val', lon='lon', lat='lat'):
		import csv
		doc = csv.reader(open(url))
		head = None
		circles = []
		for row in doc:
			if not head:
				head = row
			else:
				circles.append(Circle(row[head.index(lon)], row[head.index(lat)], row[head.index(key)], row[head.index(value)]))
			self.circles = circles
		self.computeRadii()

	def computeRadii(self):
		import sys, math
		minv = 0
		maxv = sys.maxint * -1
		for c in self.circles:
			minv = min(minv, c.value)
			maxv = max(maxv, c.value)

		for c in self.circles:
			c.r = math.pow((c.value - minv)/(maxv-minv), 0.5)*20

	def project(self, globe):
		# create view..
		self.globe = globe
		bbox = gisutils.Bounds2D()
		for circle in self.circles:
			x,y = globe.project(circle.lon, circle.lat)
			bbox.update(gisutils.Point(x,y))
		self.bbox = bbox
		w = 700
		self.view = gisutils.View(bbox, w, w*(bbox.height/bbox.width), 80)
		# .. and place circles. you can use any other geo-libs as well, e.g. pyproj
		for circle in self.circles:
			x,y = self.view.project(globe.project(circle.lon, circle.lat))
			circle.x = x
			circle.y = y


	def layout(self, steps=100):
		for i in range(steps):
			if i % 10 == 0:
				self.toSVG()
			self.layout_step()


	def layout_step(self):
		import math
		pad = 0

		for A in self.circles:
			for B in self.circles:
				if A != B:
					radsq = (A.r+B.r)*(A.r+B.r)
					d = A.sqdist(B)
					if radsq + pad > d:
						# move circles away from each other
						v = Vector(B.x-A.x, B.y-A.y)
						v.normalize()
						m = (math.sqrt(radsq) - math.sqrt(d)) * 0.25
						v.resize(m)
						A._move(v.x*-1, v.y*-1)
						B._move(v.x, v.y)

		for C in self.circles:
			C.move()


	def toSVG(self):
		from svgfig import SVG, canvas
		w = self.view.width
		h = self.view.height
		svg = canvas(width='%dpx' % w, height='%dpx' % h, viewBox='0 0 %d %d' % (w, h), enable_background='new 0 0 %d %d' % (w, h), style='stroke-width:0.7pt; stroke-linejoin: round; stroke:#444; fill:#eee;')

		g = SVG('g', id="gemeinden")


		for circle in self.circles:
			c = SVG('circle',cx=circle.x, cy=circle.y, r=circle.r)
			c['data-key'] = circle.id
			c['data-population'] = circle.value
			g.append(c)

		meta = SVG('metadata')
		views = SVG('views')
		view = SVG('view', padding="80", w=w, h=h)
		proj = self.globe.toXML()
		bbox = self.bbox
		bbox = SVG('bbox', x=round(bbox.left,2), y=round(bbox.top,2), w=round(bbox.width,2), h=round(bbox.height,2))

		views.append(view)
		view.append(proj)
		view.append(bbox)

		meta.append(views)
		svg.append(meta)
		svg.append(g)

		svg.save('cartogram.svg')


class Circle:

	def __init__(self, lon, lat, id, value):
		self.lon = float(lon)
		self.lat = float(lat)
		self.id = id
		self.value = float(value)

		self.dx = 0
		self.dy = 0

	def _move(self, x,y):
		self.dx += x
		self.dy += y

	def move(self):
		self.x += self.dx
		self.y += self.dy
		self.dx = 0
		self.dy = 0

	def __repr__(self):
		return '<Circle lon=%f, lat=%f, id=%s, val=%f >'% (self.lon, self.lat, self.id, self.value)

	def sqdist(self, circ):
		dx = self.x - circ.x
		dy = self.y - circ.y
		return dx*dx + dy*dy


"""
been too lazy to code this myself, instead I took code from here
http://www.kokkugia.com/wiki/index.php5?title=Python_vector_class
"""

class Vector:
    # Class properties
    def __init__(self, x, y):
        self.x = float(x)
        self.y = float(y)

    # represent as a string
    def __repr__(self):
        return 'Vector(%s, %s)' % (self.x, self.y)

    '''
       Class Methods / Behaviours
    '''

    def zero(self):
        self.x = 0.0
        self.y = 0.0
        return self

    def clone(self):
        return kVec(self.x, self.y)

    def normalize(self):
    	from math import sqrt
    	if self.x == 0 and self.y == 0:
    		return self
        norm = float (1.0 / sqrt(self.x*self.x + self.y*self.y))
        self.x *= norm
        self.y *= norm
        # self.z *= norm
        return self

    def invert(self):
        self.x = -(self.x)
        self.y = -(self.y)
        return self

    def resize(self, sizeFactor):
        self.normalize
        self.scale(sizeFactor)
        return self

    def minus(self, t):
        self.x -= t.x
        self.y -= t.y
        # self.z -= t.z
        return self

    def plus(self, t):
        self.x += t.x
        self.y += t.y
        # self.z += t.z
        return self

    def roundToInt(self):
        self.x = int(x)
        self.y = int(y)
        return self

    # Returns the squared length of this vector.
    def lengthSquared(self):
        return float((self.x*self.x) + (self.y*self.y))

    # Returns the length of this vector.
    def length(self):
    	from math import sqrt
        return float(sqrt(self.x*self.x + self.y*self.y))

    # Computes the dot product of this vector and vector v2
    def dot(self, v2):
        return (self.x * v2.x + self.y * v2.y)

    # Linearly interpolates between vectors v1 and v2 and returns the result point = (1-alpha)*v1 + alpha*v2.
    def interpolate(self, v2):
        self.x = float((1 - alpha) * self.x + alpha * v2.x)
        self.y = float((1 - alpha) * self.y + alpha * v2.y)
        return kVec(self.x, self.y)

    # Returns the angle in radians between this vector and the vector parameter;
    # the return value is constrained to the range [0,PI].
    def angle(self, v2):
    	from math import acos
        vDot = self.dot(v2) / (self.length() * v2.length())
        if vDot < -1.0 : vDot = -1.0
        if vDot > 1.0 : vDot = 1.0
        return float(acos(vDot))

    # Limits this vector to a given size.
    # NODEBOX USERS: name should change as 'size' and 'scale' are reserved words in Nodebox!
    def limit(self, size):
        if (self.length() > size):
            self.normalize()
            self.scale(size)

    # Point Methods
    # Returns the square of the distance between this tuple and tuple t1.
    def distanceSquared(self, t1):
        dx = self.x - t1.x
        dy = self.y - t1.y
        return (dx * dx + dy * dy)

    # NODEBOX USERS: name should change as 'scale' is reserved word in Nodebox!
    def scale(self, s):
        self.x *= s
        self.y *= s
        return self

    # NODEBOX USERS: name should change as 'translate' is reserved word in Nodebox!
    def translate(self, vec):
        self.plus(vec)

    # NODEBOX USERS: name should change as 'translate' is reserved word in Nodebox!
    def translate(self, vec, dist):
        v = kVec.resize(vec, dist)
        translation(v)

    def distance(self, pt):
    	from math import sqrt
        dx = self.x - pt.x
        dy = self.y - pt.y
        return float(sqrt(dx * dx + dy * dy))
	"""
	Generator for packed circle cartograms
	"""
	import proj, gisutils

	class Cartogram:

	def loadCSV(self, url, key='id', value='val', lon='lon', lat='lat'):
	import csv
	doc = csv.reader(open(url))
	head = None
	circles = []
	for row in doc:
	if not head:
	head = row
	else:
	circles.append(Circle(row[head.index(lon)], row[head.index(lat)], row[head.index(key)], row[head.index(value)]))
	self.circles = circles
	self.computeRadii()

	def computeRadii(self):
	import sys, math
	minv = 0
	maxv = sys.maxint * -1
	for c in self.circles:
	minv = min(minv, c.value)
	maxv = max(maxv, c.value)

	for c in self.circles:
	c.r = math.pow((c.value - minv)/(maxv-minv), 0.5)*20

	def project(self, globe):
	# create view..
	self.globe = globe
	bbox = gisutils.Bounds2D()
	for circle in self.circles:
	x,y = globe.project(circle.lon, circle.lat)
	bbox.update(gisutils.Point(x,y))
	self.bbox = bbox
	w = 700
	self.view = gisutils.View(bbox, w, w*(bbox.height/bbox.width), 80)
	# .. and place circles. you can use any other geo-libs as well, e.g. pyproj
	for circle in self.circles:
	x,y = self.view.project(globe.project(circle.lon, circle.lat))
	circle.x = x
	circle.y = y


	def layout(self, steps=100):
	for i in range(steps):
	if i % 10 == 0:
	self.toSVG()
	self.layout_step()


	def layout_step(self):
	import math
	pad = 0

	for A in self.circles:
	for B in self.circles:
	if A != B:
	radsq = (A.r+B.r)*(A.r+B.r)
	d = A.sqdist(B)
	if radsq + pad > d:
	# move circles away from each other
	v = Vector(B.x-A.x, B.y-A.y)
	v.normalize()
	m = (math.sqrt(radsq) - math.sqrt(d)) * 0.25
	v.resize(m)
	A._move(v.x-1, v.y-1)
	B._move(v.x, v.y)

	for C in self.circles:
	C.move()



	def toSVG(self):
	from svgfig import SVG, canvas
	w = self.view.width
	h = self.view.height
	svg = canvas(width='%dpx' % w, height='%dpx' % h, viewBox='0 0 %d %d' % (w, h), enable_background='new 0 0 %d %d' % (w, h), style='stroke-width:0.7pt; stroke-linejoin: round; stroke:#444; fill:#eee;')

	g = SVG('g', id="gemeinden")


	for circle in self.circles:
	c = SVG('circle',cx=circle.x, cy=circle.y, r=circle.r)
	c['data-key'] = circle.id
	c['data-population'] = circle.value
	g.append(c)

	meta = SVG('metadata')
	views = SVG('views')
	view = SVG('view', padding="80", w=w, h=h)
	proj = self.globe.toXML()
	bbox = self.bbox
	bbox = SVG('bbox', x=round(bbox.left,2), y=round(bbox.top,2), w=round(bbox.width,2), h=round(bbox.height,2))

	views.append(view)
	view.append(proj)
	view.append(bbox)

	meta.append(views)
	svg.append(meta)
	svg.append(g)

	svg.save('cartogram.svg')



	class Circle:

	def __init__(self, lon, lat, id, value):
	self.lon = float(lon)
	self.lat = float(lat)
	self.id = id
	self.value = float(value)

	self.dx = 0
	self.dy = 0

	def _move(self, x,y):
	self.dx += x
	self.dy += y

	def move(self):
	self.x += self.dx
	self.y += self.dy
	self.dx = 0
	self.dy = 0

	def __repr__(self):
	return '<Circle lon=%f, lat=%f, id=%s, val=%f >'% (self.lon, self.lat, self.id, self.value)

	def sqdist(self, circ):
	dx = self.x - circ.x
	dy = self.y - circ.y
	return dxdx + dydy


	"""
	been too lazy to code this myself, instead I took code from here
	http://www.kokkugia.com/wiki/index.php5?title=Python_vector_class
	"""

	class Vector:
	# Class properties
	def __init__(self, x, y):
	self.x = float(x)
	self.y = float(y)

	# represent as a string
	def __repr__(self):
	return 'Vector(%s, %s)' % (self.x, self.y)

	'''
	Class Methods / Behaviours
	'''

	def zero(self):
	self.x = 0.0
	self.y = 0.0
	return self

	def clone(self):
	return kVec(self.x, self.y)

	def normalize(self):
	from math import sqrt
	if self.x == 0 and self.y == 0:
	return self
	norm = float (1.0 / sqrt(self.xself.x + self.yself.y))
	self.x *= norm
	self.y *= norm
	# self.z *= norm
	return self

	def invert(self):
	self.x = -(self.x)
	self.y = -(self.y)
	return self

	def resize(self, sizeFactor):
	self.normalize
	self.scale(sizeFactor)
	return self

	def minus(self, t):
	self.x -= t.x
	self.y -= t.y
	# self.z -= t.z
	return self

	def plus(self, t):
	self.x += t.x
	self.y += t.y
	# self.z += t.z
	return self

	def roundToInt(self):
	self.x = int(x)
	self.y = int(y)
	return self

	# Returns the squared length of this vector.
	def lengthSquared(self):
	return float((self.xself.x) + (self.yself.y))

	# Returns the length of this vector.
	def length(self):
	from math import sqrt
	return float(sqrt(self.xself.x + self.yself.y))

	# Computes the dot product of this vector and vector v2
	def dot(self, v2):
	return (self.x * v2.x + self.y * v2.y)

	# Linearly interpolates between vectors v1 and v2 and returns the result point = (1-alpha)v1 + alphav2.
	def interpolate(self, v2):
	self.x = float((1 - alpha) * self.x + alpha * v2.x)
	self.y = float((1 - alpha) * self.y + alpha * v2.y)
	return kVec(self.x, self.y)

	# Returns the angle in radians between this vector and the vector parameter;
	# the return value is constrained to the range [0,PI].
	def angle(self, v2):
	from math import acos
	vDot = self.dot(v2) / (self.length() * v2.length())
	if vDot < -1.0 : vDot = -1.0
	if vDot > 1.0 : vDot = 1.0
	return float(acos(vDot))

	# Limits this vector to a given size.
	# NODEBOX USERS: name should change as 'size' and 'scale' are reserved words in Nodebox!
	def limit(self, size):
	if (self.length() > size):
	self.normalize()
	self.scale(size)

	# Point Methods
	# Returns the square of the distance between this tuple and tuple t1.
	def distanceSquared(self, t1):
	dx = self.x - t1.x
	dy = self.y - t1.y
	return (dx * dx + dy * dy)

	# NODEBOX USERS: name should change as 'scale' is reserved word in Nodebox!
	def scale(self, s):
	self.x *= s
	self.y *= s
	return self

	# NODEBOX USERS: name should change as 'translate' is reserved word in Nodebox!
	def translate(self, vec):
	self.plus(vec)

	# NODEBOX USERS: name should change as 'translate' is reserved word in Nodebox!
	def translate(self, vec, dist):
	v = kVec.resize(vec, dist)
	translation(v)

	def distance(self, pt):
	from math import sqrt
	dx = self.x - pt.x
	dy = self.y - pt.y
	return float(sqrt(dx * dx + dy * dy))