FLP86's famous proof regarding impossibility of solving consensus in a asynchronous distributed system (even with only a single failure) assumes, in the proof of the third lemma, the existence of an event `e'`

, such that the neighbor configurations `C0`

and `C1`

can be related as `C1 = e'(C0)`

.

I don't get how this is possible, as this seems to me like `e'`

carries out a state transition from a 0-valent configuration to a 1-valent configuration. Further, the proof of case 1 of lemma 3 clearly states that any successor of any 0-valent configuration has to be a 0-valent configuration. What am I missing here?

The answers to this question do not answer the above question. That other question is relates to the proof of existence of `C0`

and `C1`

and not that of `e'`

.