New on CTAN: domaincoloring
Date: August 23, 2024 9:31:40 PM CEST
Herbert Voß submitted the
domaincoloring
package.
Version number: 0.02
License type: lppl1.3
Summary description: Draw colored represenations of complex functions
Announcement text:
Domain coloring is a technique to visualize complex functions by assigning a color to each point of the complex plane z=x+iy. This package caculates with the help of Lua any complex function to visualize its behaviour. The value of the complex function(z) can be described by radius and angle which can be two values of the hsv-color model, which then defines the color of each point in the complex plane z=x+iy.
This package is located at https://mirrors.ctan.org/macros/luatex/latex/domaincoloring More information is at https://www.ctan.org/pkg/domaincoloring CTAN is run entirely by volunteers and supported by TeX user groups. Please join a user group or donate to one, see https://ctan.org/lugs
Thanks for the upload. For the CTAN Team Ina Dau --
Domain coloring is a technique to visualize complex functions by assigning a color to each point of the complex plane z=x+iy. This package caculates with the help of Lua any complex function to visualize its behaviour. The value of the complex function(z) can be described by radius and angle which can be two values of the hsv-color model, which then defines the color of each point in the complex plane z=x+iy.
This package is located at https://mirrors.ctan.org/macros/luatex/latex/domaincoloring More information is at https://www.ctan.org/pkg/domaincoloring CTAN is run entirely by volunteers and supported by TeX user groups. Please join a user group or donate to one, see https://ctan.org/lugs
Thanks for the upload. For the CTAN Team Ina Dau --
domaincoloring – Draw colored represenations of complex functions
Domain coloring is a technique to visualize complex functions by assigning a color to each point of the complex plane z=x+iy.
This package calculates with the help of Lua any complex function to visualize its behaviour. The value of the complex function(z) can be described by radius and angle which can be two values of the hsv-color model, which then defines the color of each point in the complex plane z=x+iy.
Package | domaincoloring |
Version | 0.05 2024-09-02 |
Copyright | 2024 Herbert Voß |
Maintainer | Herbert Voß |