I'd be surprised if there was a computable density limit for the random plane, just because the system is Turing complete so the answer could easily end up being like Chaitin's contant where it depends on halting problems. For example, note that an infinite random plane will contain, with probability 1, purely-by-chance prebuilt artificial intelligences with goals like "maximize number of blinkers in the plane". Though I guess it's also an open question if such a system could even survive and spread, as opposed to just getting eventually crushed by the surrounding noise.
Right, but I'm hoping it might be possible to prove that the limit exists (even if it's an uncomputable number), as opposed to some oscillating behaviour where the density infinitely often goes up to 70% and then back down to 30% for example.
