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4 (* ||A|| A project by Andrea Asperti *)
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7 (* ||T|| The HELM team. *)
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15 include "basic_2/grammar/aarity.ma".
16 include "basic_2/relocation/ldrop.ma".
18 (* ATONIC ARITY ASSIGNMENT ON TERMS *****************************************)
20 inductive aaa: lenv → term → predicate aarity ≝
21 | aaa_sort: ∀L,k. aaa L (⋆k) (⓪)
22 | aaa_lref: ∀I,L,K,V,B,i. ⇩[0, i] L ≡ K. ⓑ{I} V → aaa K V B → aaa L (#i) B
23 | aaa_abbr: ∀a,L,V,T,B,A.
24 aaa L V B → aaa (L. ⓓV) T A → aaa L (ⓓ{a}V. T) A
25 | aaa_abst: ∀a,L,V,T,B,A.
26 aaa L V B → aaa (L. ⓛV) T A → aaa L (ⓛ{a}V. T) (②B. A)
27 | aaa_appl: ∀L,V,T,B,A. aaa L V B → aaa L T (②B. A) → aaa L (ⓐV. T) A
28 | aaa_cast: ∀L,V,T,A. aaa L V A → aaa L T A → aaa L (ⓝV. T) A
31 interpretation "atomic arity assignment (term)"
32 'AtomicArity L T A = (aaa L T A).
34 (* Basic inversion lemmas ***************************************************)
36 fact aaa_inv_sort_aux: ∀L,T,A. L ⊢ T ⁝ A → ∀k. T = ⋆k → A = ⓪.
39 | #I #L #K #V #B #i #_ #_ #k #H destruct
40 | #a #L #V #T #B #A #_ #_ #k #H destruct
41 | #a #L #V #T #B #A #_ #_ #k #H destruct
42 | #L #V #T #B #A #_ #_ #k #H destruct
43 | #L #V #T #A #_ #_ #k #H destruct
47 lemma aaa_inv_sort: ∀L,A,k. L ⊢ ⋆k ⁝ A → A = ⓪.
50 fact aaa_inv_lref_aux: ∀L,T,A. L ⊢ T ⁝ A → ∀i. T = #i →
51 ∃∃I,K,V. ⇩[0, i] L ≡ K. ⓑ{I} V & K ⊢ V ⁝ A.
53 [ #L #k #i #H destruct
54 | #I #L #K #V #B #j #HLK #HB #i #H destruct /2 width=5/
55 | #a #L #V #T #B #A #_ #_ #i #H destruct
56 | #a #L #V #T #B #A #_ #_ #i #H destruct
57 | #L #V #T #B #A #_ #_ #i #H destruct
58 | #L #V #T #A #_ #_ #i #H destruct
62 lemma aaa_inv_lref: ∀L,A,i. L ⊢ #i ⁝ A →
63 ∃∃I,K,V. ⇩[0, i] L ≡ K. ⓑ{I} V & K ⊢ V ⁝ A.
66 fact aaa_inv_gref_aux: ∀L,T,A. L ⊢ T ⁝ A → ∀p. T = §p → ⊥.
68 [ #L #k #q #H destruct
69 | #I #L #K #V #B #i #HLK #HB #q #H destruct
70 | #a #L #V #T #B #A #_ #_ #q #H destruct
71 | #a #L #V #T #B #A #_ #_ #q #H destruct
72 | #L #V #T #B #A #_ #_ #q #H destruct
73 | #L #V #T #A #_ #_ #q #H destruct
77 lemma aaa_inv_gref: ∀L,A,p. L ⊢ §p ⁝ A → ⊥.
80 fact aaa_inv_abbr_aux: ∀L,T,A. L ⊢ T ⁝ A → ∀a,W,U. T = ⓓ{a}W. U →
81 ∃∃B. L ⊢ W ⁝ B & L. ⓓW ⊢ U ⁝ A.
83 [ #L #k #a #W #U #H destruct
84 | #I #L #K #V #B #i #_ #_ #a #W #U #H destruct
85 | #b #L #V #T #B #A #HV #HT #a #W #U #H destruct /2 width=2/
86 | #b #L #V #T #B #A #_ #_ #a #W #U #H destruct
87 | #L #V #T #B #A #_ #_ #a #W #U #H destruct
88 | #L #V #T #A #_ #_ #a #W #U #H destruct
92 lemma aaa_inv_abbr: ∀a,L,V,T,A. L ⊢ ⓓ{a}V. T ⁝ A →
93 ∃∃B. L ⊢ V ⁝ B & L. ⓓV ⊢ T ⁝ A.
96 fact aaa_inv_abst_aux: ∀L,T,A. L ⊢ T ⁝ A → ∀a,W,U. T = ⓛ{a}W. U →
97 ∃∃B1,B2. L ⊢ W ⁝ B1 & L. ⓛW ⊢ U ⁝ B2 & A = ②B1. B2.
99 [ #L #k #a #W #U #H destruct
100 | #I #L #K #V #B #i #_ #_ #a #W #U #H destruct
101 | #b #L #V #T #B #A #_ #_ #a #W #U #H destruct
102 | #b #L #V #T #B #A #HV #HT #a #W #U #H destruct /2 width=5/
103 | #L #V #T #B #A #_ #_ #a #W #U #H destruct
104 | #L #V #T #A #_ #_ #a #W #U #H destruct
108 lemma aaa_inv_abst: ∀a,L,W,T,A. L ⊢ ⓛ{a}W. T ⁝ A →
109 ∃∃B1,B2. L ⊢ W ⁝ B1 & L. ⓛW ⊢ T ⁝ B2 & A = ②B1. B2.
112 fact aaa_inv_appl_aux: ∀L,T,A. L ⊢ T ⁝ A → ∀W,U. T = ⓐW. U →
113 ∃∃B. L ⊢ W ⁝ B & L ⊢ U ⁝ ②B. A.
115 [ #L #k #W #U #H destruct
116 | #I #L #K #V #B #i #_ #_ #W #U #H destruct
117 | #a #L #V #T #B #A #_ #_ #W #U #H destruct
118 | #a #L #V #T #B #A #_ #_ #W #U #H destruct
119 | #L #V #T #B #A #HV #HT #W #U #H destruct /2 width=3/
120 | #L #V #T #A #_ #_ #W #U #H destruct
124 lemma aaa_inv_appl: ∀L,V,T,A. L ⊢ ⓐV. T ⁝ A →
125 ∃∃B. L ⊢ V ⁝ B & L ⊢ T ⁝ ②B. A.
128 fact aaa_inv_cast_aux: ∀L,T,A. L ⊢ T ⁝ A → ∀W,U. T = ⓝW. U →
129 L ⊢ W ⁝ A ∧ L ⊢ U ⁝ A.
131 [ #L #k #W #U #H destruct
132 | #I #L #K #V #B #i #_ #_ #W #U #H destruct
133 | #a #L #V #T #B #A #_ #_ #W #U #H destruct
134 | #a #L #V #T #B #A #_ #_ #W #U #H destruct
135 | #L #V #T #B #A #_ #_ #W #U #H destruct
136 | #L #V #T #A #HV #HT #W #U #H destruct /2 width=1/
140 lemma aaa_inv_cast: ∀L,W,T,A. L ⊢ ⓝW. T ⁝ A →
141 L ⊢ W ⁝ A ∧ L ⊢ T ⁝ A.