Sure, but isn’t the goal of the whole agenda to show that Λdoes have a certain correct factorization, i. e. that abstractions are convergent?
I suppose it may be that any choice of low-level boundaries results in the same Λ, but the Λ itself has a canonical factorization, and going from Λ back to XT reveals the corresponding canonical factorization of XT? And then depending on how close the initial choice of boundaries was to the “correct” one, Λ is easier or harder to compute (or there’s something else about the right choice that makes it nice to use).
Sure, but isn’t the goal of the whole agenda to show that Λ does have a certain correct factorization, i. e. that abstractions are convergent?
I suppose it may be that any choice of low-level boundaries results in the same Λ, but the Λ itself has a canonical factorization, and going from Λ back to XT reveals the corresponding canonical factorization of XT? And then depending on how close the initial choice of boundaries was to the “correct” one, Λ is easier or harder to compute (or there’s something else about the right choice that makes it nice to use).
Yes, there is a story for a canonical factorization of Λ, it’s just separate from the story in this post.