Fractal Dimension of Objects in Python

Target audience: Beginner

Estimated reading time: 5'

Posts history

Newsletter: Geometric Learning in Python 

Are you finding it challenging to configure a convolutional neural network (CNN) for modeling 3D objects?

The complexity of a 3D object can pose a considerable challenge when tuning the parameters of a 3D convolutional neural network. Fractal analysis [ref 1] offers a way to measure the complexity of key features, volumes, and boundaries within the object, providing valuable insights that can help data scientists fine-tune their models for better performance.

Table of contents

Introduction

Implementation

Evaluation

References

Appendix

What you will learn: How to evaluate the complexity of a 3-dimension object using fractal dimension index.

Notes: 

• This article is a follow up on Fractal Dimension of Images in Python
• Environments: Python  3.11,  Matplotlib 3.9.
• Source code is available at  Github.com/patnicolas/Data_Exploration/fractal
• To enhance the readability of the algorithm implementations, we have omitted non-essential code elements like error checking, comments, exceptions, validation of class and method arguments, scoping qualifiers, and import statements.

Introduction

As described in a previous article, Fractal Dimension of Images in Python - Overview , a fractal dimension is a measure used to describe the complexity of fractal patterns or sets by quantifying the ratio of change in detail relative to the change in scale [ref 2].

Among the various approaches to estimate the fractal dimension, from variation, structure function methods, root mean square and R/S analysis, we selected the box counting method because of its simplicity and visualization capability.

Point cloud

To evaluate our method for calculating the fractal dimension index of an object, it's necessary to simulate or represent a 3D object. This is achieved by generating a cluster of random data points across the x, y, and z axes, commonly referred to as a point cloud.

Box counting method

The box counting method [ref 3] is described in a previous article, Box-counting method

If N is the number of measurements units for our counting boxes or cubesand eps the related scaling factor, the fractal dimension index is computed as\[ D=- \displaystyle \lim_{\epsilon  \to 0} \frac{log(N)}{log(\epsilon)} \simeq - \frac{log(N)}{log(eps)} \ \ with \ N=r^3  \]We will use the height of the square box r as our measurement unit for images.

The fractal dimension index varies from 2 for very simple object to 3 for objects with complex pattern.

Implementation

Let's define a class, FractalDimObject, that encapsulates the calculation of fractal dimension and the creation of wrapping boxes. 

This class provides two constructors:

1. The default constructor, __init__, which accepts a 3D array xyz and a threshold value near 1.
2. An alternative constructor, build, which generates a 3D array of shape (size, size, size) to simulate a 3-dimension object.

class FractalDimObject(object):
    def __init__(self, xyz: np.array, threshold: float) -> None:
        self.xyz = xyz
        self.threshold = threshold

    @classmethod
    def build(cls, size: int, threshold: float) -> Self:
        _xyz = np.zeros((size, size, size))

        # Create a 3D fractal-like structure such as cube
        for x in range(size):            # Width
            for y in range(size):        # Depth
                for z in range(size):    # Height
                    if (x // 2 + y // 2) % 2 == 0:    # Condition for non-zero values
                        _xyz[x, y, z] = random.gauss(size//2, size)

        return cls(_xyz, threshold)

The alternative constructor generates a test array for evaluation purposes. It starts by initializing the array with values of 0.0, and then assigns random Gaussian-distributed values to a specific subset of the array

The values used in define the 3D object is visualized below.

Fig. 1 Visualization of the point cloud representing 3D object

The __call__ method performs the fractal dimension calculation and tracks the relationship between box counts and sizes in three stages:

1. It determines the box sizes for non-zero elements in the array.
2. It counts the number of boxes for each size.
3. It applies a linear regression to the logarithms of the box sizes and their corresponding counts.

def __call__(self) -> (np.array, List[int], List[int]):
     # Step 1 Extract the sizes of array
     sizes = self.__extract_sizes()
     sizes_list = list(sizes)
     sizes_list.reverse()

     # Step 2 Count the number of boxes of each size
     counts = [self.__count_boxes(int(size)) for size in sizes_list]

     # Step 3 Fit the points to a line log(counts) = a.log(sizes) + b
     coefficients = np.polyfit(np.log(sizes), np.log(counts), 1)
     return -coefficients[0], sizes, counts

The __extract_sizes method is responsible for generating the box sizes, as detailed in the Appendix. The implementation of __count_boxes, which counts the wrapping boxes for a given size, follows a similar approach to the method used in calculating the fractal dimension of images.

def __count_boxes(self, box_size: int) -> int:
     sx, sy, sz = self.xyz.shape
     count = 0
        
      for i in range(0, sz, box_size):
          for j in range(0, sy, box_size):
             for k in range(0, sz, box_size):

                  # Wraps the non-zero values (object) with boxes
                 data = self.xyz[i:i+box_size, j:j+box_size, k:k+box_size]

                 if np.any(data):    # For non-zero values (inside object)
                    count += 1
     return count

Evaluation

Let's compute the fractal dimension of the array representing a 3D object with an initial 3D sampling grid 1024 x 1024 x 1024 

import math

grid_size = 1024      # Grid size 
threshold = 0.92
        
fractal_dim_object = FractalDimObject.build(grid_size, threshold)
coefficient, counts, sizes = fractal_dim_object()

print(coefficient)
      

Output: 2.7456

Finally let's plot the profile of box sizes vs. box counts.

Fig. 2 Plot of box sizes vs box counts size = exp(dim*counts)

The plot reflects the linear regression of log (size) and log (counts).

References

[1] An Introduction to Dimension Theory and Fractal Geometry: Fractal Dimensions and Measures

[2] Fractals and the Fractal Dimension

[3] Measuring fractal dimension by box-counting

------------------

Patrick Nicolas has over 25 years of experience in software and data engineering, architecture design and end-to-end deployment and support with extensive knowledge in machine learning. 
He has been director of data engineering at Aideo Technologies since 2017 and he is the author of "Scala for Machine Learning", Packt Publishing ISBN 978-1-78712-238-3 and Geometric Learning in Python Newsletter on LinkedIn.

Appendix

Generate the array of box sizes used to compute the number of boxes to cover a given 3D object.

def __extract_sizes(self) -> np.array:
     # Remove values close to 1.0
     filtered = (self.xyz < self.threshold)
        
     # Minimal dimension of box size
     min_dim = min(filtered.shape)

     # Greatest power of 2 less than or equal to p
     n = 2 ** np.floor(np.log(min_dim) / np.log(2))
        
     # Extract the sizes
     size_x: int = int(np.log(n) / np.log(2))

     return np.arange(size_x, 1, -1) * 2

Fractal Dimension of Images in Python

Target audience: Expert

Estimated reading time: 8'

Posts history

Newsletter: Geometric Learning in Python 

Configuring the parameters of a 2D convolutional neural network, such as kernel size and padding, can be challenging because it largely depends on the complexity of an image or its specific sections. Fractals help quantify the complexity of important features and boundaries within an image and ultimately guide the data scientist in optimizing his/her model.

Table of content

Overview

       Fractal dimension

       Box counting method

Implementation

Evaluation

       Original image

        Image section

References

Appendix

What you will learn: How to evaluate the complexity of an image using fractal dimension index.

Notes: 

• Environments: Python  3.11,  Matplotlib 3.9.
• Source code is available at  Github.com/patnicolas/Data_Exploration/fractal
• To enhance the readability of the algorithm implementations, we have omitted non-essential code elements like error checking, comments, exceptions, validation of class and method arguments, scoping qualifiers, and import statements.

Overview

Fractal dimension

A fractal dimension is a measure used to describe the complexity of fractal patterns or sets by quantifying the ratio of change in detail relative to the change in scale [ref 1].

Initially, fractal dimensions were used to characterize intricate geometric forms where detailed patterns were more significant than the overall shape. For ordinary geometric shapes, the fractal dimension theoretically matches the familiar Euclidean or topological dimension.

However, the fractal dimension can take non-integer values. If a set's fractal dimension exceeds its topological dimension, it is considered to exhibit fractal geometry [ref 2].

There are many approaches to compute the fractal dimension [ref 1]  of an image, among them:

• Variation method
• Structure function method
• Root mean square method
• R/S analysis method
• Box counting method

This article describes the concept and implementation of the box counting method in Python.

Box counting method

The box counting method is similar to the perimeter measuring technique we applied to coastlines. However, instead of measuring length, we overlay the image with a grid and count how many squares in the grid cover any part of the image. We then repeat this process with progressively finer grids, each with smaller squares [ref 3]. By continually reducing the grid size, we capture the pattern's structure with greater precision.

fig. 1 Illustration of the box counting method for Kock shape

If N is the number of measurements units (yardstick in 1D, square in 2D, cube in 3D,..) and eps the related scaling factor, the fractal dimension index is computed as\[ D=- \displaystyle \lim_{\epsilon  \to 0} \frac{log(N)}{log(\epsilon)} \simeq - \frac{log(N)}{log(eps)} \ \ with \ N=r^2  \ (1) \] We will use the height of the square box r as our measurement unit for images.

Implementation

First, let's define the box parameter (square)

• eps Scaling factor for resizing the boxes
• r Height or width of the squared boxes

@dataclass
class BoxParameter:
    eps: float
    r: int

    # Denominator of the Fractal Dimension
    def log_inv_eps(self) -> float:
        return -np.log(self.eps)

    # Numerator of the Fractal Dimension
    def log_num_r(self) -> float:
        return np.log(self.r)

The two methods log_inv_eps and log_num_r implement the numerator and denominator of the formula (1)

The class FractalDimImage encapsulates the computation of fractal dimension of a given image.

The two class (static) members are

• num_grey_levels: Default number of grey scales
• max_plateau_count: Number of attempts to exit a saddle point.

class FractalDimImage(object):
      # Default number of grey values
    num_grey_levels: int = 256
      # Convergence criteria
    max_plateau_count = 3

    def __init__(self, image_path: AnyStr) -> None:
        raw_image: np.array = self.__load_image(image_path)
        

        # If the image is actually a RGB (color) image, then converted to grey scale image
        self.image = FractalDimImage.rgb_to_grey( raw_image)  if raw_image.shape[2] == 3 
        else raw_image

We cannot assume that the image is not defined with the 3 RGB channels. Therefore if the 3rd value of the shape is 3, then the image is converted into a grey scale array.

The following private method, __load_image load the image from a given path and converted into a numpy array

@staticmethod
def __load_image(image_path: AnyStr) -> np.array
     from PIL import Image
     from numpy import asarray

    this_image = Image.open(mode="r", fp=image_path)
    return asarray(this_image)

The computation of fractal dimension is implemented by the method __call__. The method returns a tuple:

• fractal dimension index
• trace/history of the box parameters collected during execution.

The symmetrical nature of fractal allows to iterate over half the size of the image [1]. The number of boxes N created at each iteration i, take into account the grey scale. N= (256/ num_pixels) *i [2].

The method populates each box with pixels/grey scale (method __create_boxes) [3] , then compute the sum of least squares (__sum_least_squares) [4]. The last statement [5] implement the formula (1). The source code for the private methods __create_boxes and __sum_least_squares are included in the appendix for reference.

def __call__(self) -> (float, List[BoxParameter]):
   image_pixels = self.image.shape[0]  
   plateau_count = 0
   prev_num_r = -1
      
   trace = []
   max_iters = (image_pixels // 2) + 1   # [1]

   for iter in range(2, max_iters):
       num_boxes = grey_levels // (image_pixels // iter)  # [2]
       n_boxes = max(1, num_boxes)
       num_r = 0     # Number of squares
            
       eps = iter / image_pixels
       for i in range(0, image_pixels, iter):
           boxes = self.__create_boxes(i, iter, n_boxes)    # [3]

           num_r += FractalDimImage.__sum_least_squares(boxes, n_boxes)  # [4]

        # Detect if the number of measurements r has not changed..
       if num_r == prev_num_r:
           plateau_count += 1
           prev_num_r = num_r
       trace.append(BoxParameter(eps, num_r))

        # Break from the iteration if the computation is stuck 
        # in the same number of measurements
        if plateau_count > FractalDimImage.max_plateau_count:
             break

    # Implement the fractal dimension given the trace [5]
   return FractalDimImage.__compute_fractal_dim(trace), trace

The implementation of the formula for fractal dimension extracts a polynomial fitting the numerator and denominator and return the first order value.

@staticmethod
def __compute_fractal_dim(trace: List[BoxParameter]) -> float:
   from numpy.polynomial.polynomial import polyfit

   _x = np.array([box_param.log_inv_eps() for box_param in trace])
   _y = np.array([box_param.log_num_r() for box_param in trace])
   fitted = polyfit(x=_x, y=_y, deg=1, full=False)

   return float(fitted[1])

Evaluation

We compute the fractal dimension for an image then a region that contains the key features (meaning) of the image.

image_path_name = '../images/fractal_test_image.jpg'
fractal_dim_image = FractalDimImage(image_path_name)
fractal_dim, trace = fractal_dim_image()

Original image

The original RGB image has 542 x 880 pixels and converted into grey scale image.

Fig. 2 Original grey scale image 

Output: fractal_dim = 2.54

Fig. 3 Trace for the squared box measurement during iteration

The size of the box converges very quickly after 8 iterations.

Image region

We select the following region of 395 x 378 pixels

Fig. 4 Key region of the original grey scale image 

Output: fractal_dim = 2.63

The region has similar fractal dimension as the original image. This outcome should not be surprising: the pixels not contained in the selected region consists of background without features of any significance.

Fig. 5 Trace for the squared box measurement during iteration

The convergence pattern for calculating the fractal dimension of the region is comparable to that of the original image, reaching convergence after 6 iterations.

References

[1] Fractals and the Fractal Dimension

[2] An Introduction to Dimension Theory and Fractal Geometry: Fractal Dimensions and Measures

[3] Measuring fractal dimension by box-counting

------------------

Patrick Nicolas has over 25 years of experience in software and data engineering, architecture design and end-to-end deployment and support with extensive knowledge in machine learning. 
He has been director of data engineering at Aideo Technologies since 2017 and he is the author of "Scala for Machine Learning", Packt Publishing ISBN 978-1-78712-238-3 and Geometric Learning in Python Newsletter on LinkedIn.

Appendix

Source code for initializing the square boxes

def __create_boxes(self, i: int, iter: int, n_boxes: int) -> List[List[np.array]]:

   boxes = [[]] * ((FractalDimImage.num_grey_levels + n_boxes - 1) // n_boxes)

   i_lim = i + iter

     # Shrink the boxes that are larger than i_lim
   for img_row in self.image[i: i_lim]:  
      for pixel in img_row[i: i_lim]:
          height = int(pixel // n_boxes)

          boxes[height].append(pixel)

   return boxes

Computation of the same of leas squares for boxes extracted from an image.

@staticmethod
def __sum_least_squares(boxes: List[List[float]], n_boxes: int) -> float:
   # Standard deviation of boxes
   stddev_box = np.sqrt(np.var(boxes, axis=1))
   # Filter out NAN values
   stddev = stddev_box[~np.isnan(stddev_box)]

   nBox_r = 2 * (stddev // n_boxes) + 1
   return sum(nBox_r)