PrometheanFaun comments on A Pure Math Argument for Total Utilitarianism - Less Wrong
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Well... .... yeah, technically. But for example in the model ( worlds={A, B}, f(W)=sum(log(felicity(e)) for e in population(W)) ), such that world A=(2,2,2,2), and world B=(1,1,1,9). f(A) ≥ f(B), IE ¬(f(A) < f(B)), so ¬(A < B), IE, the equitable society is also at least as good as the inequitable, higher sum utility one. So if you want to support all embeddings via summation of an increasing function of the units' QoL.. I'd be surprised if those embeddings had anything in common aside from what the premises required. I suspect anything that agreed with all of them would require all worlds the original premises don't relate to be equal, IE, ¬(A<B) ∧ ¬(B<A).
... looking back, I'm opposed to your implicit definition of a " "baseline" ", the original population partial ordering premises are the baseline, here, not total utilitarianism.