PHPBB12345 wrote:

A very interesting rule. Here is the table:

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`@RULE pirep`

@TABLE

n_states:3

neighborhood:Moore

symmetries:rotate4reflect

var a={1,2}

var b=a

var c=a

var d={0,1,2}

var e=d

var f=d

var g=d

var h=d

var i=d

var j=d

var k=d

var l=d

0,0,1,2,1,0,0,0,0,0

0,1,1,0,0,0,0,0,1,2

2,1,1,0,0,0,0,0,1,2

1,1,1,0,0,1,0,0,0,2

d,a,b,c,0,0,0,0,0,1

d,a,b,0,c,0,0,0,0,1

d,a,b,0,0,c,0,0,0,1

d,a,b,0,0,0,c,0,0,1

d,a,b,0,0,0,0,c,0,1

d,a,b,0,0,0,0,0,c,1

d,a,0,b,0,c,0,0,0,1

d,a,0,b,0,0,c,0,0,1

d,a,0,0,b,0,c,0,0,1

d,0,a,0,b,0,c,0,0,1

c,a,b,0,0,0,0,0,0,1

c,a,0,b,0,0,0,0,0,1

c,a,0,0,b,0,0,0,0,1

c,a,0,0,0,b,0,0,0,1

c,0,a,0,b,0,0,0,0,1

c,0,a,0,0,0,b,0,0,1

d,e,f,g,h,i,j,k,l,0

@COLORS

1 255 255 255

2 255 255 0

Here are some patterns. First, a 3c/16o spaceship of sorts:

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`x = 9, y = 9, rule = pirep`

4.2A$4.2A3$5.3A$5.A2.A2$2A3.A2.A$2A3.3A!

Three eater 1s fit the bill of eating it:

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`x = 17, y = 20, rule = pirep`

4.2A$4.2A$15.2A$15.A$5.3A5.A.A$5.A2.A4.2A2$2A3.A2.A$2A3.3A6$13.2A$13.

A.A$4.2A9.A$5.A9.2A$2.3A$2.A!

Eater 1 is a period 2 oscillator, technically:

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`x = 4, y = 4, rule = pirep`

2A$A.A$2.A$2.2A!

It can cap off the pireps to form a p32 oscillator:

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`x = 18, y = 18, rule = pirep`

2.A$2.3A$5.A10.2A$4.2A10.A$14.A.A$14.2A3$9.2A$9.A.A$11.A$9.A.A$2.2A5.

2A$.A.A$.A10.2A$2A10.A$13.3A$15.A!