(**************************************************************************)
include "basic_2/rt_equivalence/cpcs.ma".
-include "apps_2/functional/flifts_basic.ma".
+include "apps_2/functional/mf.ma".
include "apps_2/models/model.ma".
-include "apps_2/notation/models/dotteduparrow_2.ma".
-include "apps_2/notation/models/dotteduparrow_3.ma".
(* TERM MODEL ***************************************************************)
definition tm_dd ≝ term.
-definition tm_evaluation ≝ nat → tm_dd.
-
-definition tm_sq (h) (T1) (T2) ≝ ⦃⋆, ⋆⦄ ⊢ T1 ⬌*[h] T2.
+definition tm_sq (h) (T1) (T2) ≝ ⦃⋆,⋆⦄ ⊢ T1 ⬌*[h] T2.
definition tm_sv (s) ≝ ⋆s.
-definition tm_ap (V) (T) ≝ ⓐV.T.
-
-definition tm_vlift (j) (gv): tm_evaluation ≝ λi. ↑[j,1](gv i).
-
-interpretation "lift (term model evaluation)"
- 'DottedUpArrow i gv = (tm_vlift i gv).
-
-definition tm_vpush (j) (T) (lv): tm_evaluation ≝
- λi. tri … i j (lv i) T (↑[j,1](lv (↓i))).
-
-interpretation "push (term model evaluation)"
- 'DottedUpArrow i d lv = (tm_vpush i d lv).
+definition tm_co (p) (V) (T) ≝ ⓓ{p}V.(↑[1]T).
-rec definition tm_ti gv lv T on T ≝ match T with
-[ TAtom I ⇒ match I with
- [ Sort _ ⇒ T
- | LRef i ⇒ lv i
- | GRef l ⇒ gv l
- ]
-| TPair I V T ⇒ match I with
- [ Bind2 _ _ ⇒ TPair I (tm_ti gv lv V) (tm_ti (⇡[0]gv) (⇡[0←#0]lv) T)
- | Flat2 _ ⇒ TPair I (tm_ti gv lv V) (tm_ti gv lv T)
- ]
-].
-
-definition tm_lc: tm_evaluation ≝ λi.#i.
+definition tm_ap (V) (T) ≝ ⓐV.T.
-definition tm_gc: tm_evaluation ≝ λl.§l.
+definition tm_ti (gv) (lv) (T) ≝ ●[gv,lv]T.
definition TM (h): model ≝ mk_model … .
[ @tm_dd
-| @(tm_sq h) |6,7: skip
+| @(tm_sq h) |7,8: skip
| @tm_sv
+| @tm_co
| @tm_ap
| @tm_ti
].
(* Basic properties *********************************************************)
-lemma tm_vlift_rw (j) (gv): ∀i. (⇡[j]gv) i = ↑[j,1](gv i).
+lemma tm_co_rw (h) (p) (V) (T): V⊕{TM h}[p]T = ⓓ{p}V.(↑[1]T).
// qed.
-lemma tm_vpush_lt (lv) (j) (T): ∀i. i < j → (⇡[j←T]lv) i = lv i.
-/2 width=1 by tri_lt/ qed-.
-
-lemma tm_vpush_eq: ∀lv,T,i. (⇡[i←T]lv) i = T.
-/2 width=1 by tri_eq/ qed.
-
-lemma tm_vpush_gt: ∀lv,T,j,i. j < i → (⇡[j←T]lv) i = ↑[j,1](lv (↓i)).
-/2 width=1 by tri_gt/ qed-.
+lemma tm_ti_sort (h) (gv) (lv): ∀s. ⟦⋆s⟧{TM h}[gv,lv] = sv … s.
+// qed.
lemma tm_ti_lref (h): ∀gv,lv,i. ⟦#i⟧{TM h}[gv,lv] = lv i.
// qed.