Commit 2f0164f4 by Jacques-Henri Jourdan

### Expand the explanation of uPred as a subset of sProp monotonous predicates

parent bf73b3b9
 ... @@ -28,7 +28,20 @@ Record uPred (M : ucmraT) : Type := IProp { ... @@ -28,7 +28,20 @@ Record uPred (M : ucmraT) : Type := IProp { are monotonous both with respect to the step index and with are monotonous both with respect to the step index and with respect to x. However, that would essentially require changing respect to x. However, that would essentially require changing (by making it more complicated) the model of many connectives of (by making it more complicated) the model of many connectives of the logic, which we don't want. *) the logic, which we don't want. This sub-COFE is the sub-COFE of monotonous sProp predicates P such that the following sProp assertion is valid: ∀ x, (V(x) → P(x)) → P(x) Where V is the validity predicate. Another way of saying that this is equivalent to this definition of uPred is to notice that our definition of uPred is equivalent to quotienting the COFE of monotonous sProp predicates with the following (sProp) equivalence relation: P1 ≡ P2 := ∀ x, V(x) → (P1(x) ↔ P2(x)) whose equivalence classes appear to all have one only canonical representative such that ∀ x, (V(x) → P(x)) → P(x). *) uPred_closed n1 n2 x : uPred_holds n1 x → n2 ≤ n1 → ✓{n2} x → uPred_holds n2 x uPred_closed n1 n2 x : uPred_holds n1 x → n2 ≤ n1 → ✓{n2} x → uPred_holds n2 x }. }. Arguments uPred_holds {_} _ _ _ : simpl never. Arguments uPred_holds {_} _ _ _ : simpl never. ... ...
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