Someday you will find me

caught beneath the landslide

(Champagne Supernova, Oasis)

I recently read a book called *Snowflake Seashell Star: Colouring Adventures in Numberland* by Alex Bellos and Edmund Harris which is full of mathematical patterns to be coloured. All images are truly appealing and cause attraction to anyone who look at them, independently of their age, gender, education or political orientation. This book demonstrates how maths are an astonishing way to reach beauty.

One of my favourite patterns are tridokus, a sophisticated colored version of sudokus. Coloring a sudoku is simple: once that is solved it is enough to assign a color to each number (from 1 to 9). If you superimpose three colored sudokus with no cells at the same position sharing the same color, and using again nine colors, the resulting image is a tridoku:

There is something attractive in a tridoku due to the balance of colors but also they seem a quite messy: they are a *charmingly unbalanced*. I wrote a script to generalize the concept to *n-dokus*. The idea is the same: superimpose n sudokus without cells sharing color and position (I call them *disjoint* sudokus) using just nine different colors. I did’n’t prove it, but I think the maximum amount of sudokus can be overimposed with these constrains is 9. This is a complete series from 1-doku to 9-doku (click on any image to enlarge):

I am a big fan of `colourlovers`

package. These tridokus are colored with some of my favourite palettes from there:

Just two *technical* things to highlight:

- There is a package called sudoku that generates sudokus (of course!). I use it to obtain the first solved sudoku which forms the base.
- Subsequent sudokus are obtained from this one doing two operations: interchanging groups of columns first (there are three groups: columns 1 to 3, 4 to 6 and 7 to 9) and interchanging columns within each group then.

You can find the code here: do you own colored n-dokus!

“I did’n’t prove it, but I think the maximum amount of sudokus can be overimposed with these constrains is 9”

It can’t be more than 9, since at each cell you can only have 9 different digits (colors.)

Nice!

It’s true!! Q.E.D. 🙂

You mister are an artist!! Loved it..