""" This is a collection of utilities used by the ``svglib`` code module. """ import re from math import acos, ceil, copysign, cos, degrees, fabs, hypot, radians, sin, sqrt from reportlab.graphics.shapes import mmult, rotate, translate, transformPoint def split_floats(op, min_num, value): """Split `value`, a list of numbers as a string, to a list of float numbers. Also optionally insert a `l` or `L` operation depending on the operation and the length of values. Example: with op='m' and value='10,20 30,40,' the returned value will be ['m', [10.0, 20.0], 'l', [30.0, 40.0]] """ floats = [float(seq) for seq in re.findall(r'(-?\d*\.?\d*(?:[eE][+-]?\d+)?)', value) if seq] res = [] for i in range(0, len(floats), min_num): if i > 0 and op in {'m', 'M'}: op = 'l' if op == 'm' else 'L' res.extend([op, floats[i:i + min_num]]) return res def split_arc_values(op, value): float_re = r'(-?\d*\.?\d*(?:[eE][+-]?\d+)?)' flag_re = r'([1|0])' # 3 numb, 2 flags, 1 coord pair a_seq_re = r'[\s,]*'.join([ float_re, float_re, float_re, flag_re, flag_re, float_re, float_re ]) + r'[\s,]*' res = [] for seq in re.finditer(a_seq_re, value.strip()): res.extend([op, [float(num) for num in seq.groups()]]) return res def normalise_svg_path(attr): """Normalise SVG path. This basically introduces operator codes for multi-argument parameters. Also, it fixes sequences of consecutive M or m operators to MLLL... and mlll... operators. It adds an empty list as argument for Z and z only in order to make the resul- ting list easier to iterate over. E.g. "M 10 20, M 20 20, L 30 40, 40 40, Z" -> ['M', [10, 20], 'L', [20, 20], 'L', [30, 40], 'L', [40, 40], 'Z', []] """ # operator codes mapped to the minimum number of expected arguments ops = { 'A': 7, 'a': 7, 'Q': 4, 'q': 4, 'T': 2, 't': 2, 'S': 4, 's': 4, 'M': 2, 'L': 2, 'm': 2, 'l': 2, 'H': 1, 'V': 1, 'h': 1, 'v': 1, 'C': 6, 'c': 6, 'Z': 0, 'z': 0, } op_keys = ops.keys() # do some preprocessing result = [] groups = re.split('([achlmqstvz])', attr.strip(), flags=re.I) op = None for item in groups: if item.strip() == '': continue if item in op_keys: # fix sequences of M to one M plus a sequence of L operators, # same for m and l. if item == 'M' and item == op: op = 'L' elif item == 'm' and item == op: op = 'l' else: op = item if ops[op] == 0: # Z, z result.extend([op, []]) else: if op.lower() == 'a': result.extend(split_arc_values(op, item)) else: result.extend(split_floats(op, ops[op], item)) op = result[-2] # Remember last op return result def convert_quadratic_to_cubic_path(q0, q1, q2): """ Convert a quadratic Bezier curve through q0, q1, q2 to a cubic one. """ c0 = q0 c1 = (q0[0] + 2 / 3 * (q1[0] - q0[0]), q0[1] + 2 / 3 * (q1[1] - q0[1])) c2 = (c1[0] + 1 / 3 * (q2[0] - q0[0]), c1[1] + 1 / 3 * (q2[1] - q0[1])) c3 = q2 return c0, c1, c2, c3 # *********************************************** # Helper functions for elliptical arc conversion. # *********************************************** def vector_angle(u, v): d = hypot(*u) * hypot(*v) if d == 0: return 0 c = (u[0] * v[0] + u[1] * v[1]) / d if c < -1: c = -1 elif c > 1: c = 1 s = u[0] * v[1] - u[1] * v[0] return degrees(copysign(acos(c), s)) def end_point_to_center_parameters(x1, y1, x2, y2, fA, fS, rx, ry, phi=0): ''' See http://www.w3.org/TR/SVG/implnote.html#ArcImplementationNotes F.6.5 note that we reduce phi to zero outside this routine ''' rx = fabs(rx) ry = fabs(ry) # step 1 if phi: phi_rad = radians(phi) sin_phi = sin(phi_rad) cos_phi = cos(phi_rad) tx = 0.5 * (x1 - x2) ty = 0.5 * (y1 - y2) x1d = cos_phi * tx - sin_phi * ty y1d = sin_phi * tx + cos_phi * ty else: x1d = 0.5 * (x1 - x2) y1d = 0.5 * (y1 - y2) # step 2 # we need to calculate # (rx*rx*ry*ry-rx*rx*y1d*y1d-ry*ry*x1d*x1d) # ----------------------------------------- # (rx*rx*y1d*y1d+ry*ry*x1d*x1d) # # that is equivalent to # # rx*rx*ry*ry # = ----------------------------- - 1 # (rx*rx*y1d*y1d+ry*ry*x1d*x1d) # # 1 # = -------------------------------- - 1 # x1d*x1d/(rx*rx) + y1d*y1d/(ry*ry) # # = 1/r - 1 # # it turns out r is what they recommend checking # for the negative radicand case r = x1d * x1d / (rx * rx) + y1d * y1d / (ry * ry) if r > 1: rr = sqrt(r) rx *= rr ry *= rr r = x1d * x1d / (rx * rx) + y1d * y1d / (ry * ry) r = 1 / r - 1 elif r != 0: r = 1 / r - 1 if -1e-10 < r < 0: r = 0 r = sqrt(r) if fA == fS: r = -r cxd = (r * rx * y1d) / ry cyd = -(r * ry * x1d) / rx # step 3 if phi: cx = cos_phi * cxd - sin_phi * cyd + 0.5 * (x1 + x2) cy = sin_phi * cxd + cos_phi * cyd + 0.5 * (y1 + y2) else: cx = cxd + 0.5 * (x1 + x2) cy = cyd + 0.5 * (y1 + y2) # step 4 theta1 = vector_angle((1, 0), ((x1d - cxd) / rx, (y1d - cyd) / ry)) dtheta = vector_angle( ((x1d - cxd) / rx, (y1d - cyd) / ry), ((-x1d - cxd) / rx, (-y1d - cyd) / ry) ) % 360 if fS == 0 and dtheta > 0: dtheta -= 360 elif fS == 1 and dtheta < 0: dtheta += 360 return cx, cy, rx, ry, -theta1, -dtheta def bezier_arc_from_centre(cx, cy, rx, ry, start_ang=0, extent=90): if abs(extent) <= 90: nfrag = 1 frag_angle = extent else: nfrag = ceil(abs(extent) / 90) frag_angle = extent / nfrag if frag_angle == 0: return [] frag_rad = radians(frag_angle) half_rad = frag_rad * 0.5 kappa = abs(4 / 3 * (1 - cos(half_rad)) / sin(half_rad)) if frag_angle < 0: kappa = -kappa point_list = [] theta1 = radians(start_ang) start_rad = theta1 + frag_rad c1 = cos(theta1) s1 = sin(theta1) for i in range(nfrag): c0 = c1 s0 = s1 theta1 = start_rad + i * frag_rad c1 = cos(theta1) s1 = sin(theta1) point_list.append((cx + rx * c0, cy - ry * s0, cx + rx * (c0 - kappa * s0), cy - ry * (s0 + kappa * c0), cx + rx * (c1 + kappa * s1), cy - ry * (s1 - kappa * c1), cx + rx * c1, cy - ry * s1)) return point_list def bezier_arc_from_end_points(x1, y1, rx, ry, phi, fA, fS, x2, y2): if (x1 == x2 and y1 == y2): # From https://www.w3.org/TR/SVG/implnote.html#ArcImplementationNotes: # If the endpoints (x1, y1) and (x2, y2) are identical, then this is # equivalent to omitting the elliptical arc segment entirely. return [] if phi: # Our box bezier arcs can't handle rotations directly # move to a well known point, eliminate phi and transform the other point mx = mmult(rotate(-phi), translate(-x1, -y1)) tx2, ty2 = transformPoint(mx, (x2, y2)) # Convert to box form in unrotated coords cx, cy, rx, ry, start_ang, extent = end_point_to_center_parameters( 0, 0, tx2, ty2, fA, fS, rx, ry ) bp = bezier_arc_from_centre(cx, cy, rx, ry, start_ang, extent) # Re-rotate by the desired angle and add back the translation mx = mmult(translate(x1, y1), rotate(phi)) res = [] for x1, y1, x2, y2, x3, y3, x4, y4 in bp: res.append( transformPoint(mx, (x1, y1)) + transformPoint(mx, (x2, y2)) + transformPoint(mx, (x3, y3)) + transformPoint(mx, (x4, y4)) ) return res else: cx, cy, rx, ry, start_ang, extent = end_point_to_center_parameters( x1, y1, x2, y2, fA, fS, rx, ry ) return bezier_arc_from_centre(cx, cy, rx, ry, start_ang, extent)