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####################################################################################################
#
# Patro - A Python library to make patterns for fashion design
# Copyright (C) 2017 Fabrice Salvaire
#
# This program is free software: you can redistribute it and/or modify
# it under the terms of the GNU General Public License as published by
# the Free Software Foundation, either version 3 of the License, or
# (at your option) any later version.
#
# This program is distributed in the hope that it will be useful,
# but WITHOUT ANY WARRANTY; without even the implied warranty of
# MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
# GNU General Public License for more details.
#
# You should have received a copy of the GNU General Public License
# along with this program. If not, see <http://www.gnu.org/licenses/>.
#
####################################################################################################
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r"""Module to implement Spline curve.
B-spline Basis
--------------
A nonuniform, nonrational B-spline of order `n` is a piece-wise polynomial function of degree
:math:`n - 1` in a variable `t`. It is defined over :math:`n + 1` locations :math:`t_j`, called
knots, which must be in non-descending order :math:`t_j \leq t_{j+1}`. The B-spline contributes
only in the range between the first and last of these knots and is zero elsewhere.
If each knot is separated by the same distance `h` (where :math:`h = t_{j+1} - t_j`) from its
predecessor, the knot vector and the corresponding B-splines are called "uniform".
B-spline Curve
--------------
A spline function of order `n` on a given set of knots `K` can be expressed as a linear combination
of B-splines:
.. math::
S_{n,K}(t) = \sum_{i=0}^{n-1} p_i B_i^n(t)
where :math:`B_{i, n}` are B-spline basis functions defined by the Cox-de Boor recursion formula:
.. math::
B_i^0(t) = 1, \textrm{if $t_i \le t < t_{i+1}$, otherwise $0$,}
B_i^k(t) = \frac{t - t_i}{t_{i+k} - t_i} B_i^{k-1}(t)
+ \frac{t_{i+k+1} - t}{t_{i+k+1} - t_{i+1}} B_{i+1}^{k-1}(t)
The DeBoor-Cox algorithm permits to evaluate recursively a B-Spline in a similar way to the De
Casteljaud algorithm for Bézier curves.
Given `k` the degree of the B-spline, `n + 1` control points :math:`p_0, \ldots, p_n`, and an
increasing series of scalars :math:`t_0 \le t_1 \le \ldots \le t_m` with :math:`m = n + k + 1`,
called knots.
The number of points must respect the condition :math:`n + 1 \le k`, e.g. a B-spline of degree 3
must have 4 control points.
A B-spline :math:`S(t)` curve is defined by:
.. math::
S(t) = \sum_{i=0}^n p_i B_i^k(t) \;\textrm{with}\; t \in [t_k , t_{n+1}]
The functions :math:`B_i^k(t)` are B-splines functions defined by:
.. math::
B_i^0(t) =
\left\lbrace
\begin{array}{l}
1 \;\textrm{if}\; t \in [t_i, t_{i+1}] \\
0 \;\textrm{else}
\end{array}
\right.
.. math::
B_i^k(t) = w_i^k(t) B_i^{k-1}(t) + [1 - w_{i+1}^k(t)] B_{i+1}^{k-1}(t)
with
.. math::
w_i^k(t) =
\left\lbrace
\begin{array}{l}
\frac{t - t_i}{t_{i+k} - t_i} \;\textrm{if}\; t_i < t_{i+k} \\
0 \;\textrm{else}
\end{array}
\right.
DeBoor-Cox Algorithm (1972)
:math:`S(t) = p_j^k` for :math:`t \in [t_j , t_{j+1}[` for :math:`k \le j \le n` with the following relation:
.. math::
\begin{split}
p_i^{r+1} &= \frac{t - t_i}{t_{i+k-r} - t} p_i^r + \frac{t_{i+k-r} - t_i}{t_{i+k-r} - t_i} p_{i-1}^r \\
&= w_i^{k-r}(t) p_i^r + (1 - w_i^{k-r}(t)) p_{i-1}^r
\end{split}
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"""
####################################################################################################
__all__ = ['BSpline']
####################################################################################################
# from math import log, sqrt
import numpy as np
from .Bezier import QuadraticBezier2D, CubicBezier2D
from .Primitive import Primitive3P, Primitive4P, PrimitiveNP, Primitive2DMixin
####################################################################################################
class QuadraticUniformSpline2D(Primitive2DMixin, Primitive3P):
"""Class to implements 2D Quadratic Spline Curve."""
BASIS = np.array((
(1, -2, 1),
(1, 2, -2),
(0, 0, 1),
))
INVERSE_BASIS = np.array((
(-2, 1, -2),
(-2, -3, 1),
(-1, -1, -2),
))
#######################################
def __init__(self, p0, p1, p2):
Primitive3P.__init__(self, p0, p1, p2)
##############################################
def __repr__(self):
return self.__class__.__name__ + '({0._p0}, {0._p1}, {0._p2})'.format(self)
##############################################
def to_bezier(self):
basis = np.dot(self.BASIS, QuadraticBezier2D.INVERSE_BASIS)
points = np.dot(self.geometry_matrix, basis).transpose()
return QuadraticBezier2D(*points)
##############################################
def point_at_t(self, t):
# Q(t) = (
# P0 * (1-t)**3 +
# P1 * ( 3*t**3 - 6*t**2 + 4 ) +
# P2 * ( -3*t**3 + 3*t**2 + 3*t + 1 ) +
# P3 * t**3
# ) / 6
#
# = P0*(1-t)**3/6 + P1*(3*t**3 - 6*t**2 + 4)/6 + P2*(-3*t**3 + 3*t**2 + 3*t + 1)/6 + P3*t**3/6
return (self._p0/6 + self._p1*2/3 + self._p2/6 +
(-self._p0/2 + self._p2/2)*t +
(self._p0/2 - self._p1 + self._p2/2)*t**2 +
(-self._p0/6 + self._p1/2 - self._p2/2 + self._p3/6)*t**3)
####################################################################################################
class CubicUniformSpline2D(Primitive2DMixin, Primitive4P):
"""Class to implements 2D Cubic Spline Curve."""
# T = (1 t t**2 t**3)
# P = (Pi Pi+2 Pi+2 Pi+3)
# Q(t) = T M Pt
# = P Mt Tt
# Basis = Mt
BASIS = np.array((
(1, -3, 3, -1),
(4, 0, -6, 3),
(1, 3, 3, -3),
(0, 0, 0, 1),
)) / 6
INVERSE_BASIS = np.array((
( 1, 1, 1, 1),
( -1, 0, 1, 2),
(2/3, -1/3, 2/3, 11/3),
( 0, 0, 0, 6),
))
#######################################
def __init__(self, p0, p1, p2, p3):
Primitive4P.__init__(self, p0, p1, p2, p3)
##############################################
def __repr__(self):
return self.__class__.__name__ + '({0._p0}, {0._p1}, {0._p2}, {0._p3})'.format(self)
##############################################
def to_bezier(self):
basis = np.dot(self.BASIS, CubicBezier2D.INVERSE_BASIS)
points = np.dot(self.geometry_matrix, basis).transpose()
if self._start:
# list(self.points)[:2]
points[:2] = self._p0, self._p1
elif self._stop:
# list(self.points)[-2:]
points[-2:] = self._p2, self._p3
return CubicBezier2D(*points)
##############################################
def point_at_t(self, t):
# Q(t) = (
# P0 * (1-t)**3 +
# P1 * ( 3*t**3 - 6*t**2 + 4 ) +
# P2 * ( -3*t**3 + 3*t**2 + 3*t + 1 ) +
# P3 * t**3
# ) / 6
#
# = P0*(1-t)**3/6 + P1*(3*t**3 - 6*t**2 + 4)/6 + P2*(-3*t**3 + 3*t**2 + 3*t + 1)/6 + P3*t**3/6
return (self._p0/6 + self._p1*2/3 + self._p2/6 +
(-self._p0/2 + self._p2/2)*t +
(self._p0/2 - self._p1 + self._p2/2)*t**2 +
(-self._p0/6 + self._p1/2 - self._p2/2 + self._p3/6)*t**3)
####################################################################################################
class BSpline:
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"""
##############################################
def __init__(self, degree, knots, coefficients):
self._degree = int(degree)
self._knots = list(knots)
self._coefficients = list(coefficients)
self._number_of_points = len(self._knots) - self._degree - 1
assert ((self._number_of_points >= self._degree+1) and
(len(self._coefficients) >= self._number_of_points))
##############################################
@property
def degree(self):
return self._degree
@property
def knots(self):
return self._knots
@property
def coefficients(self):
return self._coefficients
@property
def number_of_points(self):
return self._number_of_points
##############################################
def eval(self, t):
return sum(coefficients[i] * self.basis_function(i, self._degree, t)
for i in range(self._number_of_points))
##############################################
def basis_function(self, i, k, t):
"""Cox-de Boor recursion formula"""
if k == 0:
return 1 if self._knots[i] <= t < self._knots[i+1] else 0
ki = self._knots[i]
kik = self._knots[i+k]
if kik == ki:
c1 = 0
else:
c1 = (t - ki)/(kik - ki) * self.basis_function(i, k-1, t)
ki = self._knots[i+1]
kik = self._knots[i+k+1]
if kik == ki:
c2 = 0
else:
c2 = (kik - t)/(kik - ki) * self.basis_function(i+1, k-1, t)
return c1 + c2