Issue
I first created a dictionary of 21 different color codes with their names
rgb_colors = {"Red":[1.0,0.0,0.0],"Green":[0.0,1.0,0.0],"Blue":[0.0,0.0,1.0],
"Black":[0.0,0.0,0.0],"Almond":[0.94,0.87,0.8],"White":[1.0,1.0,1.0],
"Brown":[0.8,0.5,0.2],"Cadet":[0.33,0.41,0.47],"Camel":[0.76,0.6,0.42],
"Capri":[0.0,0.75,1.0],"Cardinal":[0.77,0.12,0.23],"Ceil":[0.57,0.63,0.81],
"Celadon":[0.67,0.88,0.69],"Champagne":[0.97,0.91,0.81],"Charcoal":[0.21,0.27,0.31],
"Cream":[1.0,0.99,0.82],"Cyan":[0.0,1.0,1.0],"DarkBlue":[0.0,0.0,0.55],
"AmericanRose":[1.0,0.01,0.24],"Gray":[0.5,0.5,0.5],"Wenge":[0.39,0.33,0.32]}
Then I converted it to Df
RGB = pd.DataFrame(rgb_colors.items(), columns = ["Color","Color Code"])
Then I created a list of all the color codes and asked for input code. then I used the input color and and found the Euclidean distance between each color code to the input and asset a threshold to select the code that matches at least 60% and used the top three codes as the closest colour.
#list of colors
list_of_rgb = [[1.0,0.0,0.0],[0.0,1.0,0.0],[0.0,0.0,1.0],[0.0,0.0,0.0],[0.94,0.87,0.8],
[1.0,1.0,1.0],[0.8,0.5,0.2],[0.33,0.41,0.47],[0.76,0.6,0.42],
[0.0,0.75,1.0],[0.77,0.12,0.23],[0.57,0.63,0.81],
[0.67,0.88,0.69],[0.97,0.91,0.81],[0.21,0.27,0.31],
[1.0,0.99,0.82],[0.0,1.0,1.0],[0.0,0.0,0.55],[1.0,0.01,0.24]
,[0.5,0.5,0.5],[0.39,0.33,0.32]]
#input color
print("Enter R,G,B color codes")
color1 = []
for i in range(0,3):
ele = float(input())
color1.append(ele)
print(color1)
def closest(colors,color, threshold=60, max_return=3):
colors = np.array(colors)
color = np.array(color)
distances = np.sqrt(np.sum((colors-color)**2,axis=1))
boolean_masks = distances < (1.0 - (threshold / 100))
outputs = colors[boolean_masks]
output_distances = distances[boolean_masks]
return outputs[np.argsort(output_distances)][:max_return]
closest_color = closest(list_of_rgb, color1)
closest_color
suppose the Input is [0.52,0.5,0.5]
then closest colors are
array([[0.5 , 0.5 , 0.5 ],
[0.76, 0.6 , 0.42],
[0.8 , 0.5 , 0.2 ]])
My question is, how can I find how much percentage of each of these closest color should be used to get the input color?
It can be solved by finding 3 proportions p1,p2 and p3 such that p1+p2+p3=1 and
p1*(r1,g1,b1) + p2*(r2,g2,b2) + p3*(r3,g3,b3) = (r0,g0,b0)
I'm unable to find p1,p2 and p3. Can anyone help me out on how can I find the p values?
Solution
The system of linear equations you are setting up is over-determined, meaning that in general there is no solution. The additional constraints on the proportions (or more precisely weights) -- summing up to 1, being in the [0, 1] range -- make things worse because even in case a solution exists, it may be discarded because of those additional constraints.
The question in its current form is not mathematically solvable.
Whether you want to include a fixed sum constraints or not, the mathematics for finding the best weights for a linear combination is very similar and although exact solutions are not always attainable, it is possible get to approximate solutions.
One way of computing the is through linear programming, which gets you essentially to @greenerpastures's answer, but requires you to use linear programming.
Using Brute Force and Simple Least Squares
Here I propose a more basic approach where only simple linear algebra is involved, but ignores the requirement for the weights being in the [0, 1]
range (which may be introduced afterwards).
The equations for writing a target color b
as a linear combination of colors can be written in matrix form as:
A x = b
with A
formed by the colors you want to use, b
is the target color and x
are the weights.
/ r0 r1 r2 \ / r_ \
| g0 g1 g2 | (x0, x1, x2) = | g_ |
\ b0 b1 b2 / \ b_ /
Now, this system of equations admits a single solution if det(A) != 0
.
Since among the selected colors there is an ortho-normal basis, you can actually use those to construct an A
with det(A) != 0
, and hence a x
can always be found.
If the elements of b
are in the [0, 1]
range, so are the elements of x
, because essentially b = x
.
In general, you can find the solution of the Ax = b
linear system of equations with np.linalg.solve()
, which can be used to look for x
when A
is formed by other colors, as long as det(A) != 0
.
If you want to include more or less than as many colors as the number of channels, then approximate solutions minimizing the sum of squares can be obtained with np.linalg.lstsq()
which implements least squares approximation: finds the best weights to assign to n
vectors (components
), such that their linear combination (weighted sum) is as close as possible (minimizes the sum of squares) to the target
vector.
Once you are set to find approximate solution, the requirement on the sum of the weights becomes an additional parameter in the system of linear equation.
This can be included by simply augmenting A
and b
with an extra dimension set to 1
for A
and to q
for b
, so that A x = b
becomes:
/ r0 r1 r2 \ / r3 \
| g0 g1 g2 | (p0, p1, p2) = | g3 |
| b0 b1 b2 | | b3 |
\ 1 1 1 / \ q /
Now the new equation p0 + p1 + p2 = q
is included.
While all this can work with arbitrary colors, the ones selected by closeness are not necessarily going to be good candidates to approximate well an arbitrary color.
For example, if the target color is (1, 0, 1)
and the 3 closest colors happen to be proportional to each other, say (0.9, 0, 0)
, (0.8, 0, 0)
, (0.7, 0, 0)
, it may be better to use say (0, 0, 0.5)
which is farther but can contribute better to make a good approximation than say (0.7, 0, 0)
.
Given that the number of possible combinations is fairly small, it is possible to try out all colors, in groups of fixed increasing size. This approach is called brute-force, because we try out all of them. The least squares method is used to find the weights. Then we can add additional logic to enforce the constraints we want.
To enforce the weights to sum up to one, it is possible to explicitly normalize them.
To restrict them to a particular range, we can discard weights not complying (perhaps with some tolerance atol
to mitigate numerical issues with float comparisons).
The code would read:
import itertools
import dataclasses
from typing import Optional, Tuple, Callable, Sequence
import numpy as np
def best_linear_approx(target: np.ndarray, components: np.ndarray) -> np.ndarray:
coeffs, _, _, _ = np.linalg.lstsq(components, target, rcond=-1)
return coeffs
@dataclasses.dataclass
class ColorDecomposition:
color: np.ndarray
weights: np.ndarray
components: np.ndarray
indices: np.ndarray
cost: float
sum_weights: float
def decompose_bf_lsq(
color: Sequence,
colors: Sequence,
max_nums: int = 3,
min_nums: int = 1,
min_weights: float = 0.0,
max_weights: float = 1.0,
atol: float = 1e-6,
norm_in_cost: bool = False,
force_norm: bool = False,
) -> Optional[ColorDecomposition]:
"""Decompose `color` into a linear combination of a number of `colors`.
This perfoms a brute-force search.
Some constraints can be introduced into the decomposition:
- The weights within a certain range ([`min_weights`, `max_weights`])
- The weights to accumulate (sum or average) to a certain value.
The colors are chosen to have minimum sum of squared differences (least squares).
Additional costs may be introduced in the brute-force search, to favor
particular solutions when the least squares are the same.
Args:
color: The color to decompose.
colors: The base colors to use for the decomposition.
max_nums: The maximum number of base colors to use.
min_weights: The minimum value for the weights.
max_weights: The maximum value for the weights.
atol: The tolerance on the weights.
norm_in_cost: Include the norm in the cost for the least squares.
force_norm: If True, the weights are normalized to `acc_to`, if set.
weight_costs: The additional weight costs to prefer specific solutions.
Returns:
The resulting color decomposition.
"""
color = np.array(color)
colors = np.array(colors)
num_colors, num_channels = colors.shape
# augment color/colors
if norm_in_cost:
colors = np.concatenate(
[colors, np.ones(num_colors, dtype=colors.dtype)[:, None]],
axis=1,
)
color = np.concatenate([color, np.ones(1, dtype=colors.dtype)])
# brute-force search
best_indices = None
best_weights = np.zeros(1)
best_cost = np.inf
for n in range(min_nums, max_nums + 1):
for indices in itertools.combinations(range(num_colors), n):
if np.allclose(color, np.zeros_like(color)):
# handles the 0 case
weights = np.ones(n)
else:
# find best linear approx
weights = best_linear_approx(color, colors[indices, :].T)
# weights normalization
if force_norm and np.all(weights > 0.0):
norm = np.sum(weights)
weights /= norm
# add some tolerance
if atol > 0:
mask = np.abs(weights) > atol
weights = weights[mask]
indices = np.array(indices)[mask].tolist()
if atol > 0 and max_weights is not None:
mask = (weights > max_weights - atol) & (weights < max_weights + atol)
weights[mask] = max_weights
if atol > 0 and min_weights is not None:
mask = (weights < min_weights + atol) & (weights > min_weights - atol)
weights[mask] = min_weights
# compute the distance between the current approximation and the target
err = color - (colors[indices, :].T @ weights)
curr_cost = np.sum(err * err)
if (
curr_cost <= best_cost
and (min_weights is None or np.all(weights >= min_weights))
and (max_weights is None or np.all(weights <= max_weights))
):
best_indices = indices
best_weights = weights
best_cost = curr_cost
if best_indices is not None:
return ColorDecomposition(
color=(colors[best_indices, :].T @ best_weights)[:num_channels],
weights=best_weights,
components=[c for c in colors[best_indices, :num_channels]],
indices=best_indices,
cost=best_cost,
sum_weights=np.sum(best_weights),
)
else:
return None
This can be used as follows:
colors = [
[1.0, 0.0, 0.0],
[0.0, 1.0, 0.0],
[0.0, 0.0, 1.0],
[0.0, 0.0, 0.0],
[0.94, 0.87, 0.8],
[1.0, 1.0, 1.0],
[0.8, 0.5, 0.2],
[0.33, 0.41, 0.47],
[0.76, 0.6, 0.42],
[0.0, 0.75, 1.0],
[0.77, 0.12, 0.23],
[0.57, 0.63, 0.81],
[0.67, 0.88, 0.69],
[0.97, 0.91, 0.81],
[0.21, 0.27, 0.31],
[1.0, 0.99, 0.82],
[0.0, 1.0, 1.0],
[0.0, 0.0, 0.55],
[1.0, 0.01, 0.24],
[0.5, 0.5, 0.5],
[0.39, 0.33, 0.32],
]
some_colors = [[0.9, 0.6, 0.5], [0.52, 0.5, 0.5], [0.5, 0.5, 0.5], [0, 0, 0], [1, 1, 1]]
# some_colors = [[0., 0., 0.]]
for color in some_colors:
print(color)
print(decompose_bf_lsq(color, colors, max_nums=1))
print(decompose_bf_lsq(color, colors, max_nums=2))
print(decompose_bf_lsq(color, colors))
print(decompose_bf_lsq(color, colors, min_weights=0.0, max_weights=1.0))
print(decompose_bf_lsq(color, colors, norm_in_cost=True))
print(decompose_bf_lsq(color, colors, force_norm=True))
print(decompose_bf_lsq(color, colors, norm_in_cost=True, force_norm=True))
# [0.9, 0.6, 0.5]
# ColorDecomposition(color=array([0.72956991, 0.68444188, 0.60922849]), weights=array([0.75213393]), components=[array([0.97, 0.91, 0.81])], indices=[13], cost=0.048107706898684606, sum_weights=0.7521339326213355)
# ColorDecomposition(color=array([0.9 , 0.60148865, 0.49820272]), weights=array([0.2924357, 0.6075643]), components=[array([1., 0., 0.]), array([1. , 0.99, 0.82])], indices=[0, 15], cost=5.446293494705139e-06, sum_weights=0.8999999999999999)
# ColorDecomposition(color=array([0.9, 0.6, 0.5]), weights=array([0.17826087, 0.91304348, 0.43478261]), components=[array([0., 0., 1.]), array([0.8, 0.5, 0.2]), array([0.39, 0.33, 0.32])], indices=[2, 6, 20], cost=0.0, sum_weights=1.526086956521739)
# ColorDecomposition(color=array([0.9, 0.6, 0.5]), weights=array([0.17826087, 0.91304348, 0.43478261]), components=[array([0., 0., 1.]), array([0.8, 0.5, 0.2]), array([0.39, 0.33, 0.32])], indices=[2, 6, 20], cost=0.0, sum_weights=1.526086956521739)
# ColorDecomposition(color=array([0.9, 0.6, 0.5]), weights=array([0.4, 0.1, 0.5]), components=[array([1., 0., 0.]), array([0., 1., 0.]), array([1., 1., 1.])], indices=[0, 1, 5], cost=2.6377536518327582e-30, sum_weights=0.9999999999999989)
# ColorDecomposition(color=array([0.9, 0.6, 0.5]), weights=array([0.4, 0.1, 0.5]), components=[array([1., 0., 0.]), array([0., 1., 0.]), array([1., 1., 1.])], indices=[0, 1, 5], cost=3.697785493223493e-32, sum_weights=0.9999999999999999)
# ColorDecomposition(color=array([0.9, 0.6, 0.5]), weights=array([0.4, 0.1, 0.5]), components=[array([1., 0., 0.]), array([0., 1., 0.]), array([1., 1., 1.])], indices=[0, 1, 5], cost=1.355854680848614e-31, sum_weights=1.0)
# [0.52, 0.5, 0.5]
# ColorDecomposition(color=array([0.50666667, 0.50666667, 0.50666667]), weights=array([0.50666667]), components=[array([1., 1., 1.])], indices=[5], cost=0.0002666666666666671, sum_weights=0.5066666666666667)
# ColorDecomposition(color=array([0.52, 0.5 , 0.5 ]), weights=array([0.52, 0.5 ]), components=[array([1., 0., 0.]), array([0., 1., 1.])], indices=[0, 16], cost=2.465190328815662e-32, sum_weights=1.02)
# ColorDecomposition(color=array([0.52, 0.5 , 0.5 ]), weights=array([0.2 , 0.2 , 0.508]), components=[array([0.76, 0.6 , 0.42]), array([0.57, 0.63, 0.81]), array([0.5, 0.5, 0.5])], indices=[8, 11, 19], cost=0.0, sum_weights=0.9079999999999999)
# ColorDecomposition(color=array([0.52, 0.5 , 0.5 ]), weights=array([0.2 , 0.2 , 0.508]), components=[array([0.76, 0.6 , 0.42]), array([0.57, 0.63, 0.81]), array([0.5, 0.5, 0.5])], indices=[8, 11, 19], cost=0.0, sum_weights=0.9079999999999999)
# ColorDecomposition(color=array([0.52, 0.5 , 0.5 ]), weights=array([0.02, 0.48, 0.5 ]), components=[array([1., 0., 0.]), array([0., 0., 0.]), array([1., 1., 1.])], indices=[0, 3, 5], cost=2.0954117794933126e-31, sum_weights=0.9999999999999996)
# ColorDecomposition(color=array([0.52, 0.5 , 0.5 ]), weights=array([0.02, 1. ]), components=[array([1., 0., 0.]), array([0.5, 0.5, 0.5])], indices=[0, 19], cost=0.0, sum_weights=1.02)
# ColorDecomposition(color=array([0.52, 0.5 , 0.5 ]), weights=array([0.02, 0.02, 0.96]), components=[array([1., 0., 0.]), array([1., 1., 1.]), array([0.5, 0.5, 0.5])], indices=[0, 5, 19], cost=9.860761315262648e-32, sum_weights=1.0)
# [0.5, 0.5, 0.5]
# ColorDecomposition(color=array([0.5, 0.5, 0.5]), weights=array([1.]), components=[array([0.5, 0.5, 0.5])], indices=[19], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0.5, 0.5, 0.5]), weights=array([1.]), components=[array([0.5, 0.5, 0.5])], indices=[19], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0.5, 0.5, 0.5]), weights=array([1.]), components=[array([0.5, 0.5, 0.5])], indices=[19], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0.5, 0.5, 0.5]), weights=array([1.]), components=[array([0.5, 0.5, 0.5])], indices=[19], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0.5, 0.5, 0.5]), weights=array([1.]), components=[array([0.5, 0.5, 0.5])], indices=[19], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0.5, 0.5, 0.5]), weights=array([1.]), components=[array([0.5, 0.5, 0.5])], indices=[19], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0.5, 0.5, 0.5]), weights=array([1.]), components=[array([0.5, 0.5, 0.5])], indices=[19], cost=0.0, sum_weights=1.0)
# [0, 0, 0]
# ColorDecomposition(color=array([0., 0., 0.]), weights=array([1.]), components=[array([0., 0., 0.])], indices=[3], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0., 0., 0.]), weights=array([1.]), components=[array([0., 0., 0.])], indices=[3], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0., 0., 0.]), weights=array([1.]), components=[array([0., 0., 0.])], indices=[3], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0., 0., 0.]), weights=array([1.]), components=[array([0., 0., 0.])], indices=[3], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0., 0., 0.]), weights=array([1.]), components=[array([0., 0., 0.])], indices=[3], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0., 0., 0.]), weights=array([1.]), components=[array([0., 0., 0.])], indices=[3], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0., 0., 0.]), weights=array([1.]), components=[array([0., 0., 0.])], indices=[3], cost=0.0, sum_weights=1.0)
# [1, 1, 1]
# ColorDecomposition(color=array([1., 1., 1.]), weights=array([1.]), components=[array([1., 1., 1.])], indices=[5], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([1., 1., 1.]), weights=array([1.]), components=[array([1., 1., 1.])], indices=[5], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([1., 1., 1.]), weights=array([0.1610306 , 0.96618357, 0.28692724]), components=[array([0.21, 0.27, 0.31]), array([1. , 0.99, 0.82]), array([0. , 0. , 0.55])], indices=[14, 15, 17], cost=0.0, sum_weights=1.4141414141414144)
# ColorDecomposition(color=array([1., 1., 1.]), weights=array([0.1610306 , 0.96618357, 0.28692724]), components=[array([0.21, 0.27, 0.31]), array([1. , 0.99, 0.82]), array([0. , 0. , 0.55])], indices=[14, 15, 17], cost=0.0, sum_weights=1.4141414141414144)
# ColorDecomposition(color=array([1., 1., 1.]), weights=array([1.]), components=[array([1., 1., 1.])], indices=[5], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([1., 1., 1.]), weights=array([1.]), components=[array([1., 1., 1.])], indices=[5], cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([1., 1., 1.]), weights=array([1.]), components=[array([1., 1., 1.])], indices=[5], cost=0.0, sum_weights=1.0)
Using Brute-Force and bounded Minimization
This is essentially the same as above, except the now we use a more sophisticated optimization method than simple unbounded least squares. This provides us with weights that are already bounded so there is no need for the additional code to handle that case and, most importantly, the optimal solutions are discarded solely on cost.
The approach would read:
import scipy.optimize
def _err(x, A, b):
return b - A @ x
def cost(x, A, b):
err = _err(x, A, b)
return np.sum(err * err)
def decompose_bf_min(
color: Sequence,
colors: Sequence,
max_nums: int = 3,
min_nums: int = 1,
min_weights: float = 0.0,
max_weights: float = 1.0,
normalize: bool = False,
) -> Optional[ColorDecomposition]:
color = np.array(color)
colors = np.array(colors)
num_colors, num_channels = colors.shape
# augment color/colors to include norm in cost
if normalize:
colors = np.concatenate(
[colors, np.ones(num_colors, dtype=colors.dtype)[:, None]],
axis=1,
)
color = np.concatenate([color, np.ones(1, dtype=colors.dtype)])
# brute-force search
best_indices = None
best_weights = np.zeros(1)
best_cost = np.inf
for n in range(min_nums, max_nums + 1):
for indices in itertools.combinations(range(num_colors), n):
weights = np.full(n, 1 / n)
if not np.allclose(color, 0):
res = scipy.optimize.minimize(
cost,
weights,
(colors[indices, :].T, color),
bounds=[(min_weights, max_weights) for _ in range(n)]
)
weights = res.x
curr_cost = cost(weights, colors[indices, :].T, color)
if curr_cost <= best_cost:
best_indices = indices
best_weights = weights
best_cost = curr_cost
if best_indices is not None:
return ColorDecomposition(
color=(colors[best_indices, :].T @ best_weights)[:num_channels],
weights=best_weights,
components=[c for c in colors[best_indices, :num_channels]],
indices=best_indices,
cost=best_cost,
sum_weights=np.sum(best_weights),
)
else:
return None
which works as follows:
some_colors = [[0.9, 0.6, 0.5], [0.52, 0.5, 0.5], [0.5, 0.5, 0.5], [0, 0, 0], [1, 1, 1]]
# some_colors = [[0., 0., 0.]]
for color in some_colors:
print(color)
print(decompose_bf_min(color, colors))
print(decompose_bf_min(color, colors, normalize=True))
# [0.9, 0.6, 0.5]
# ColorDecomposition(color=array([0.9, 0.6, 0.5]), weights=array([0.42982455, 0.2631579 , 0.70701754]), components=[array([0.8, 0.5, 0.2]), array([0.77, 0.12, 0.23]), array([0.5, 0.5, 0.5])], indices=(6, 10, 19), cost=2.3673037349051385e-17, sum_weights=1.399999995602849)
# ColorDecomposition(color=array([0.89999998, 0.60000001, 0.49999999]), weights=array([0.4 , 0.10000003, 0.49999999]), components=[array([1., 0., 0.]), array([0., 1., 0.]), array([1., 1., 1.])], indices=(0, 1, 5), cost=6.957464274781682e-16, sum_weights=1.0000000074212045)
# [0.52, 0.5, 0.5]
# ColorDecomposition(color=array([0.52, 0.5 , 0.5 ]), weights=array([0.02, 0. , 1. ]), components=[array([1., 0., 0.]), array([1. , 0.99, 0.82]), array([0.5, 0.5, 0.5])], indices=(0, 15, 19), cost=2.1441410828292465e-17, sum_weights=1.019999995369513)
# ColorDecomposition(color=array([0.52000021, 0.50000018, 0.50000018]), weights=array([0.02000003, 0.02000077, 0.95999883]), components=[array([1., 0., 0.]), array([1., 1., 1.]), array([0.5, 0.5, 0.5])], indices=(0, 5, 19), cost=2.517455337509621e-13, sum_weights=0.9999996259509482)
# [0.5, 0.5, 0.5]
# ColorDecomposition(color=array([0.5, 0.5, 0.5]), weights=array([0., 0., 1.]), components=[array([0., 1., 1.]), array([1. , 0.01, 0.24]), array([0.5, 0.5, 0.5])], indices=(16, 18, 19), cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0.5, 0.5, 0.5]), weights=array([0., 1., 0.]), components=[array([1. , 0.01, 0.24]), array([0.5, 0.5, 0.5]), array([0.39, 0.33, 0.32])], indices=(18, 19, 20), cost=0.0, sum_weights=1.0)
# [0, 0, 0]
# ColorDecomposition(color=array([0., 0., 0.]), weights=array([1.]), components=[array([0., 0., 0.])], indices=(3,), cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([0., 0., 0.]), weights=array([1., 0., 0.]), components=[array([0., 0., 0.]), array([0. , 0. , 0.55]), array([1. , 0.01, 0.24])], indices=(3, 17, 18), cost=0.0, sum_weights=1.0)
# [1, 1, 1]
# ColorDecomposition(color=array([1., 1., 1.]), weights=array([1., 0., 0.]), components=[array([1., 1., 1.]), array([0., 1., 1.]), array([1. , 0.01, 0.24])], indices=(5, 16, 18), cost=0.0, sum_weights=1.0)
# ColorDecomposition(color=array([1., 1., 1.]), weights=array([1., 0., 0.]), components=[array([1., 1., 1.]), array([1. , 0.01, 0.24]), array([0.5, 0.5, 0.5])], indices=(5, 18, 19), cost=0.0, sum_weights=1.0)
Answered By - norok2
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