@polcott "becomes correctly construed as specifying recursive simulation" That does not match the situation of the conventional proof. A halting decider is not required to execute/simulate its argument, and therefor is not required to recurse. If your proof relies on recursive simulation, that is not the general case and therefore its behaviour is not generalisable.

Again, as mentioned above, Computer Science / the halting problem does not say that non-general halting solvers are impossible.

As a more practical thread of argumentation: What happens if main directly calls P?

@MisterMiyagi A simulating halt decider is expressly allowed because any Turing computable function that correctly maps the behavior specified by the input to an accept or reject state is expressly allowed. H must not return a value when a call to H when is never invoked. When main directly call P(P) this is not an input to H so it is irrelevant.

@MisterMiyagi Non-inputs are not in the domain of any computable function.

@polcott That wasn't my question.

It's a really simple sanity check, though.

H(P, P) has to predict how P(P) behaves, so... how does P(P) behave?

Does it halt?

@MisterMiyagi Once one accepts that a simulating halt decider must compute the mapping from its input finite string to an accept or reject state based on the behavior of its correct simulation of this finite string then the behavior of non-inputs is understood to be irrelevant.

@MisterMiyagi Turing computable functions are not allowed to compute the mapping of non-inputs or anything that cannot be encoded as a finite string.

@polcott Since the point of H(P, P) is to say whether P(P) halts, I really don't see how it is not relevant whether P(P) actually halts.

Furthermore, P(P) is the input to H so even under your criteria it is not irrelevant.

@MisterMiyagi The point of H(P,P) is to determine whether or not its input specifies a computation that halts. Turing computable functions must always report on their input and are not allowed to report on non-inputs.

@MisterMiyagi It is common knowledge that the correct simulation of a machine description provides its actual behavior. My project contains H1(P,P) and H(P,P) where H1 is identical to H yet at a different machine address. P calls H and does not call H1. It can be empirically verified that the correct simulation of the input to H1(P,P) is a different sequence of steps than the correct simulation of the input to H(P,P).