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Summary

Description
English: Feigenbaum Julia set. . Parameter c is the aproximation of the Myrberg-Feigenbaum point = the Feigenbaum Point, which is the limit of the period doubling bifurcations cascade and landing point of parameter rays with irrational angles
Date
Source Own work
Author Soul windsurfer

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C src code

#include <complex.h>
#include <math.h>
#include <stdio.h>
#include <stdlib.h>
#include <omp.h> //OpenM

/*
fork of 
mandelbrot-book how to write a book about the Mandelbrot set by Claude Heiland-Alle
https://code.mathr.co.uk/mandelbrot-book/blob/HEAD:/book/

https://stackoverflow.com/questions/77135883/why-do-my-functions-not-work-in-parallel


gcc c.c -lm -Wall -fopenmp

./a.out >ed.ppm   // P6 = binary Portable PixMap see https://en.wikipedia.org/wiki/Netpbm#File_formats

convert ed.ppm -resize 25% ed.png
*/





const double pi = 3.141592653589793;
int q = 2 ; // degree of multibrot set

complex double f(complex double z, complex double c){ return z*z   c;} // multibrot z^q   c
complex double d(complex double z) {return 2*z; } // q*z^{q-1}  derivative




double cnorm(double _Complex z) // https://stackoverflow.com/questions/6363247/what-is-a-complex-data-type-and-an-imaginary-data-type-in-c
{
  return creal(z) * creal(z)   cimag(z) * cimag(z);
}

void hsv2rgb(double h, double s, double v, int *red, int *grn, int *blu) {
  double i, f, p, q, t, r, g, b;
  int ii;
  if (s == 0.0) { r = g = b = v; } else {
    h = 6 * (h - floor(h));
    ii = i = floor(h);
    f = h - i;
    p = v * (1 - s);
    q = v * (1 - (s * f));
    t = v * (1 - (s * (1 - f)));
    switch(ii) {
      case 0: r = v; g = t; b = p; break;
      case 1: r = q; g = v; b = p; break;
      case 2: r = p; g = v; b = t; break;
      case 3: r = p; g = q; b = v; break;
      case 4: r = t; g = p; b = v; break;
      default:r = v; g = p; b = q; break;
    }
  }
  *red = fmin(fmax(255 * r   0.5, 0), 255);
  *grn = fmin(fmax(255 * g   0.5, 0), 255);
  *blu = fmin(fmax(255 * b   0.5, 0), 255);
}

int main()
{
  // integer size of the image 
  const int w = 8000 ;
  const int h = 8000 ;
  
  const int n = 1024;
  
  const double r = 2.0; // plane radius
  const double px = r / (h/2);
  const double r2 = 25 * 25; // escape radius (ER) = r so r2 = ER*ER
  unsigned char *img = malloc(3 * w * h);
  
  double _Complex c = -1.4011551890;

  #pragma omp parallel for schedule(dynamic)
  for (int j = 0; j < h;   j)
  {
    
        
    double y = (h/2 - (j   0.5)) / (h/2) * r;
    for (int i = 0; i < w;   i)
    {
      double x =  (i   0.5 - w/2) / (h/2) * r; // for q=2 add -0.5
      double _Complex z = x   I * y;
      double _Complex dz = 1.0; // first derivative of zn with respect to z
      
      
      int k;
      for (k = 0; k < n;   k)
      { 
        // 
        dz = d(z)*dz ;
        z = f(z,c);
        
        if (cnorm(z) > r2)
          break;
      }
      
      // color
      double hue = 0, sat = 0, val = 1; // interior color = white
      
      if (k < n) 
      { // exterior and boundary color
        double _Complex de = 2 * z * log(cabs(z)) / dz;
        hue = fmod(1   carg(de) / (2 * pi), 1); // ? slope of de
        sat = 0.25;
        val = tanh(cabs(de) / px );
      }
      
      // hsv to rgb conversion
      int red, grn, blu;
      hsv2rgb(hue, sat, val, &red, &grn, &blu);
      // save rgb color to array
      img[3*(j * w   i) 0] = red;
      img[3*(j * w   i) 1] = grn;
      img[3*(j * w   i) 2] = blu;
    }
  }
  
  //
  printf("P6\n%d %d\n255\n", w, h);
  fwrite(img, 3 * w * h, 1, stdout);
  free(img);
  
  
  return 0;
}

bash source code

gcc c.c -lm -Wall -fopenmp

./a.out >ed.ppm  

convert ed.ppm -resize 25% ed.png

rm ed.ppm


make

all: 
	chmod  x c.sh
	./c.sh


Tu run the program simply

 make

Captions

Feigenbaum Julia set. f(z) = z^2 -1.4011551890

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19 October 2023

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Date/TimeThumbnailDimensionsUserComment
current18:25, 19 October 2023Thumbnail for version as of 18:25, 19 October 20232,000 × 2,000 (784 KB)Soul windsurferUploaded own work with UploadWizard

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