Code: Select all

```
..OO
.O.O
.O..
.O..
....
O.O.
```

On another note, I have found 6xn toroidal oscillators with traffic lights. Starting with a 3x3 (or 3x6) filled square, here are the periods of various sizes of tori (up to 6x50):

For 3x3:

18: 56

19: 42

20: 50

21: 84

32: 236

37: 119

39: 78

41: 175

For 3x6:

18: 22

19: 34

20: 44

21: 84

31: 81

32: 64

33: 83

34: 104

36: 83

37: 83

38: 141

39: 78

41: 175

42: 84

48: 550

50: 228

In the case of the 3x6, the rectangle is oriented lengthwise in the torus. And here's the Klein bottle results (with the 6 dimension twisted):

For 3x3 (a surprisingly low number of oscillators):

20: 48

28: 82

For 3x6 (that's more like it):

17: 22

18: 22

25: 62

30: 81

32: 142

33: 83

38: 83

39: 83

41: 80

42: 218

46: 80

47: 156

48: 220

49: 140

Again, for the 3x6, the rectangle is oriented lengthwise in the Klein bottle.

EDIT: This is an interesting oscillator in B278/S3456/C6:

Code: Select all

```
x = 16, y = 18, rule = 3456/278/6:T200,200
.5A$7A$.A3.A2$14.A$13.3A$14.A$4.A$3.3A$4.A6$4.A$3.3A$4.A!
```