The formalism presented in this post turned out to be erroneous (as opposed to the formalism in the previous post). The problem is that the step in the proof of the main proposition in which the soundness schema is applied cannot be generalized to the ordinal setting since we don’t know whether α_κ is a successor ordinal so we can’t replace it by α_κ′=α_κ-1. I’m not deleting this post primarily to preserve the useful discussion in the comments.

Followup to: Parametric polymorphism in updateless intelligence metric

In the previous post, I formulated a variant of Benja’s parametric polymorphism suitable for constructing updateless intelligence metrics. More generally, this variants admits agents which are utility maximizers (in the informal sense of trying their best to maximize a utility function, not in the formal sense of finding the absolutely optimal solution; for example they might be “meliorizers” to use the terminology of Yudkowsky and Herreshoff) rather than satisficers. The agents using this formalism labor under a certain “delusion”, namely, since they believe that κ (“the number of ineffable mystery”) is an actual finite number (whereas it is secretly infinite, in a sense), they think that the chain of tiling agents is effectively finite as well (since at some point agent #n in the chain will discover that κ > n is false and will fail to construct a subsequent agent of the same “epistemic strength”). The same problem exists in Weaver’s intuitionistic assertability predicate formalism.

To overcome this limitation, I suggest to extend κ′s semantics from natural numbers to elements of a certain recursive ordinal (at least morally; technically it is done a bit differently, see below). In Benja’s original formulation this doesn’t appear a valid option, since κ is interpreted as a time interval. However, in my variant κ is just an abstract parameter queries about which can be directed to a special “oracle”, so there is no such limitation.

Formalism

Fix α a recursive ordinal and α_i a system of notations for ordinals smaller than α such that α₀=0, the function f defined by α_f(i)=α_i+1 is recursive and the bit-valued function g(i,j) which equals 1 iff α_i < α_j is also recursive. We also assume that

(0) T |- For all i: g(i,f(i))=1

where T is our starting theory. We define T_κ(α) to be T extended by the symbol κ (which stands for the index of the ordinal, not the ordinal itself) and the following self-referential soundness schema:

(1) For all formulae φ: For all n, i: ((@_T_κ(α) “φ(n)” and g(i,κ)=1) → φ(n)[κ\i])

T_κ(α) is proven to be sound analogously to Yudkowsky and Herreshoff, with transfinite induction over ordinals below α replacing the ordinary induction.

The licensing condition for agent A₀ to perform action b₀ is

(2) Exists n: T_κ(α) |- (g(n,κ)=1 → (A₀()=b₀ → G))

The property which is sufficient for agent B₁ to be creatable by agent A₀ is

(3) T_κ(α) |- For all b₁: (B₁()=b₁ → (b₁=0 or Exists n: (g(n,κ)=1 and @_T_κ(α) “(g(n,f(κ))=1 and B₁()[κ\f(κ)]=b₁) → G[κ\f(κ)]”)))

The proof that (3) indeed enables tiling is analogous to the previous post (but requires using (0)).

Discussion

In order for A₀ to know that the tiling chain is infinite, it is enough for her to verify α_κ >= ω. In order for her to know that A₁ is going to know the tiling chain is infinite, she needs to verify α_κ >= ω+1. In order for her to know that all agents are going to know the tiling chain is infinite, she needs to verify α_κ >= 2ω. In order for her to know that all agents are going to know that, she needs to verify α_κ >= 3ω et cetera.

It remains to decide which ordinal should we actually use. My intuition is that the correct ordinal is the least α with the property that α is the proof-theoretic ordinal of T_κ(α) extended by the axiom schema {g(i,κ)=1}. This seems right since the agent shouldn’t get much from α_κ > β for β above the proof theoretic ordinal. However, a more formal justification is probably in order.