retroforth/example/1D-Cellular-Automota.retro

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# 1D Cellular Automota
Assume an array of cells with an initial distribution of live and dead cells, and imaginary cells off the end of the array having fixed values.
Cells in the next generation of the array are calculated based on the value of the cell and its left and right nearest neighbours in the current generation.
If, in the following table, a live cell is represented by 1 and a dead cell by 0 then to generate the value of the cell at a particular index in the array of cellular values you use the following table:
000 -> 0 #
001 -> 0 #
010 -> 0 # Dies without enough neighbours
011 -> 1 # Needs one neighbour to survive
100 -> 0 #
101 -> 1 # Two neighbours giving birth
110 -> 1 # Needs one neighbour to survive
111 -> 0 # Starved to death.
I had originally written an implementation of this in RETRO 11. For RETRO 12 I took advantage of new language features and some further considerations into the rules for this task.
The first word, `string,` inlines a string to `here`. I'll use this to setup the initial input.
~~~
:string, (s-) [ , ] s:for-each #0 , ;
~~~
The next two lines setup an initial generation and a buffer for the evolved generation. In this case, `This` is the current generation and `Next` reflects the next step in the evolution.
~~~
'This d:create
'.###.##.#.#.#.#..#.. string,
'Next d:create
'.................... string,
~~~
I use `display` to show the current generation.
~~~
:display (-)
&This s:put nl ;
~~~
As might be expected, `update` copies the `Next` generation to the `This` generation, setting things up for the next cycle.
~~~
:update (-)
&Next &This dup s:length copy ;
~~~
The word `group` extracts a group of three cells. This data will be passed to `evolve` for processing.
~~~
:group (a-nnn)
[ fetch ]
[ n:inc fetch ]
[ n:inc n:inc fetch ] tri ;
~~~
I use `evolve` to decide how a cell should change, based on its initial state with relation to its neighbors.
In the prior implementation this part was much more complex as I tallied things up and had separate conditions for each combination. This time I take advantage of the fact that only cells with two neighbors will be alive in the next generation. So the process is:
- take the data from `group`
- compare to `$#` (for living cells)
- add the flags
- if the result is `#-2`, the cell should live
- otherwise it'll be dead
~~~
:evolve (nnn-c)
[ $# eq? ] tri@ + +
#-2 eq? [ $# ] [ $. ] choose ;
~~~
For readability I separated out the next few things. `at` takes an index and returns the address in `This` starting with the index.
~~~
:at (n-na)
&This over + ;
~~~
The `record` word adds the evolved value to a buffer. In this case my `generation` code will set the buffer to `Next`.
~~~
:record (c-)
buffer:add n:inc ;
~~~
And now to tie it all together. Meet `generation`, the longest bit of code in this sample. It has several bits:
- setup a new buffer pointing to `Next`
- this also preserves the old buffer
- setup a loop for each cell in `This`
- initial loop index at -1, to ensure proper dummy state for first cell
- get length of `This` generation
- perform a loop for each item in the generation, updating `Next` as it goes
- copy `Next` to `This` using `update`.
~~~
:generation (-)
[ &Next buffer:set
#-1 &This s:length
[ at group evolve record ] times drop
update
] buffer:preserve ;
~~~
The last bit is a helper. It takes a number of generations and displays the state, then runs a `generation`.
~~~
:generations (n-)
[ display generation ] times ;
~~~
And a text. The output should be:
.###.##.#.#.#.#..#..
.#.#####.#.#.#......
..##...##.#.#.......
..##...###.#........
..##...#.##.........
..##....###.........
..##....#.#.........
..##.....#..........
..##................
..##................
~~~
#10 generations
~~~