inductive lsubf: relation4 lenv rtmap lenv rtmap ≝
| lsubf_atom: ∀f1,f2. f1 ≡ f2 → lsubf (⋆) f1 (⋆) f2
| lsubf_push: ∀f1,f2,I1,I2,L1,L2. lsubf L1 (f1) L2 (f2) →
- lsubf (L1.ⓘ{I1}) (⫯f1) (L2.ⓘ{I2}) (⫯f2)
+ lsubf (L1.ⓘ[I1]) (⫯f1) (L2.ⓘ[I2]) (⫯f2)
| lsubf_bind: ∀f1,f2,I,L1,L2. lsubf L1 f1 L2 f2 →
- lsubf (L1.ⓘ{I}) (↑f1) (L2.ⓘ{I}) (↑f2)
-| lsubf_beta: â\88\80f,f0,f1,f2,L1,L2,W,V. L1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 ≘ f → f0 ⋓ f ≘ f1 →
+ lsubf (L1.ⓘ[I]) (↑f1) (L2.ⓘ[I]) (↑f2)
+| lsubf_beta: â\88\80f,f0,f1,f2,L1,L2,W,V. L1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ f → f0 ⋓ f ≘ f1 →
lsubf L1 f0 L2 f2 → lsubf (L1.ⓓⓝW.V) (↑f1) (L2.ⓛW) (↑f2)
-| lsubf_unit: â\88\80f,f0,f1,f2,I1,I2,L1,L2,V. L1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 ≘ f → f0 ⋓ f ≘ f1 →
- lsubf L1 f0 L2 f2 → lsubf (L1.ⓑ{I1}V) (↑f1) (L2.ⓤ{I2}) (↑f2)
+| lsubf_unit: â\88\80f,f0,f1,f2,I1,I2,L1,L2,V. L1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ f → f0 ⋓ f ≘ f1 →
+ lsubf L1 f0 L2 f2 → lsubf (L1.ⓑ[I1]V) (↑f1) (L2.ⓤ[I2]) (↑f2)
.
interpretation
(* Basic inversion lemmas ***************************************************)
fact lsubf_inv_atom1_aux:
- â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 → L1 = ⋆ →
+ â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« → L1 = ⋆ →
∧∧ f1 ≡ f2 & L2 = ⋆.
#f1 #f2 #L1 #L2 * -f1 -f2 -L1 -L2
[ /2 width=1 by conj/
]
qed-.
-lemma lsubf_inv_atom1: â\88\80f1,f2,L2. â¦\83â\8b\86,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 → ∧∧ f1 ≡ f2 & L2 = ⋆.
+lemma lsubf_inv_atom1: â\88\80f1,f2,L2. â\9dªâ\8b\86,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« → ∧∧ f1 ≡ f2 & L2 = ⋆.
/2 width=3 by lsubf_inv_atom1_aux/ qed-.
fact lsubf_inv_push1_aux:
- â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 →
- ∀g1,I1,K1. f1 = ⫯g1 → L1 = K1.ⓘ{I1} →
- â\88\83â\88\83g2,I2,K2. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f2 = ⫯g2 & L2 = K2.â\93\98{I2}.
+ â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« →
+ ∀g1,I1,K1. f1 = ⫯g1 → L1 = K1.ⓘ[I1] →
+ â\88\83â\88\83g2,I2,K2. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f2 = ⫯g2 & L2 = K2.â\93\98[I2].
#f1 #f2 #L1 #L2 * -f1 -f2 -L1 -L2
[ #f1 #f2 #_ #g1 #J1 #K1 #_ #H destruct
| #f1 #f2 #I1 #I2 #L1 #L2 #H12 #g1 #J1 #K1 #H1 #H2 destruct
qed-.
lemma lsubf_inv_push1:
- â\88\80g1,f2,I1,K1,L2. â¦\83K1.â\93\98{I1},⫯g1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 →
- â\88\83â\88\83g2,I2,K2. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f2 = ⫯g2 & L2 = K2.â\93\98{I2}.
+ â\88\80g1,f2,I1,K1,L2. â\9dªK1.â\93\98[I1],⫯g1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« →
+ â\88\83â\88\83g2,I2,K2. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f2 = ⫯g2 & L2 = K2.â\93\98[I2].
/2 width=6 by lsubf_inv_push1_aux/ qed-.
fact lsubf_inv_pair1_aux:
- â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 →
- ∀g1,I,K1,X. f1 = ↑g1 → L1 = K1.ⓑ{I}X →
- â\88¨â\88¨ â\88\83â\88\83g2,K2. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f2 = â\86\91g2 & L2 = K2.â\93\91{I}X
- | â\88\83â\88\83g,g0,g2,K2,W,V. â¦\83K1,g0â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 &
- K1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 ≘ g & g0 ⋓ g ≘ g1 & f2 = ↑g2 &
+ â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« →
+ ∀g1,I,K1,X. f1 = ↑g1 → L1 = K1.ⓑ[I]X →
+ â\88¨â\88¨ â\88\83â\88\83g2,K2. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f2 = â\86\91g2 & L2 = K2.â\93\91[I]X
+ | â\88\83â\88\83g,g0,g2,K2,W,V. â\9dªK1,g0â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« &
+ K1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ g & g0 ⋓ g ≘ g1 & f2 = ↑g2 &
I = Abbr & X = ⓝW.V & L2 = K2.ⓛW
- | â\88\83â\88\83g,g0,g2,J,K2. â¦\83K1,g0â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 &
- K1 â\8a¢ ð\9d\90\85+â¦\83Xâ¦\84 â\89\98 g & g0 â\8b\93 g â\89\98 g1 & f2 = â\86\91g2 & L2 = K2.â\93¤{J}.
+ | â\88\83â\88\83g,g0,g2,J,K2. â\9dªK1,g0â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« &
+ K1 â\8a¢ ð\9d\90\85+â\9dªXâ\9d« â\89\98 g & g0 â\8b\93 g â\89\98 g1 & f2 = â\86\91g2 & L2 = K2.â\93¤[J].
#f1 #f2 #L1 #L2 * -f1 -f2 -L1 -L2
[ #f1 #f2 #_ #g1 #J #K1 #X #_ #H destruct
| #f1 #f2 #I1 #I2 #L1 #L2 #H12 #g1 #J #K1 #X #H elim (discr_push_next … H)
qed-.
lemma lsubf_inv_pair1:
- â\88\80g1,f2,I,K1,L2,X. â¦\83K1.â\93\91{I}X,â\86\91g1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 →
- â\88¨â\88¨ â\88\83â\88\83g2,K2. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f2 = â\86\91g2 & L2 = K2.â\93\91{I}X
- | â\88\83â\88\83g,g0,g2,K2,W,V. â¦\83K1,g0â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 &
- K1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 ≘ g & g0 ⋓ g ≘ g1 & f2 = ↑g2 &
+ â\88\80g1,f2,I,K1,L2,X. â\9dªK1.â\93\91[I]X,â\86\91g1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« →
+ â\88¨â\88¨ â\88\83â\88\83g2,K2. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f2 = â\86\91g2 & L2 = K2.â\93\91[I]X
+ | â\88\83â\88\83g,g0,g2,K2,W,V. â\9dªK1,g0â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« &
+ K1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ g & g0 ⋓ g ≘ g1 & f2 = ↑g2 &
I = Abbr & X = ⓝW.V & L2 = K2.ⓛW
- | â\88\83â\88\83g,g0,g2,J,K2. â¦\83K1,g0â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 &
- K1 â\8a¢ ð\9d\90\85+â¦\83Xâ¦\84 â\89\98 g & g0 â\8b\93 g â\89\98 g1 & f2 = â\86\91g2 & L2 = K2.â\93¤{J}.
+ | â\88\83â\88\83g,g0,g2,J,K2. â\9dªK1,g0â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« &
+ K1 â\8a¢ ð\9d\90\85+â\9dªXâ\9d« â\89\98 g & g0 â\8b\93 g â\89\98 g1 & f2 = â\86\91g2 & L2 = K2.â\93¤[J].
/2 width=5 by lsubf_inv_pair1_aux/ qed-.
fact lsubf_inv_unit1_aux:
- â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 →
- ∀g1,I,K1. f1 = ↑g1 → L1 = K1.ⓤ{I} →
- â\88\83â\88\83g2,K2. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f2 = â\86\91g2 & L2 = K2.â\93¤{I}.
+ â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« →
+ ∀g1,I,K1. f1 = ↑g1 → L1 = K1.ⓤ[I] →
+ â\88\83â\88\83g2,K2. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f2 = â\86\91g2 & L2 = K2.â\93¤[I].
#f1 #f2 #L1 #L2 * -f1 -f2 -L1 -L2
[ #f1 #f2 #_ #g1 #J #K1 #_ #H destruct
| #f1 #f2 #I1 #I2 #L1 #L2 #H12 #g1 #J #K1 #H elim (discr_push_next … H)
qed-.
lemma lsubf_inv_unit1:
- â\88\80g1,f2,I,K1,L2. â¦\83K1.â\93¤{I},â\86\91g1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 →
- â\88\83â\88\83g2,K2. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f2 = â\86\91g2 & L2 = K2.â\93¤{I}.
+ â\88\80g1,f2,I,K1,L2. â\9dªK1.â\93¤[I],â\86\91g1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« →
+ â\88\83â\88\83g2,K2. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f2 = â\86\91g2 & L2 = K2.â\93¤[I].
/2 width=5 by lsubf_inv_unit1_aux/ qed-.
fact lsubf_inv_atom2_aux:
- â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 → L2 = ⋆ →
+ â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« → L2 = ⋆ →
∧∧ f1 ≡ f2 & L1 = ⋆.
#f1 #f2 #L1 #L2 * -f1 -f2 -L1 -L2
[ /2 width=1 by conj/
]
qed-.
-lemma lsubf_inv_atom2: â\88\80f1,f2,L1. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83â\8b\86,f2â¦\84 → ∧∧f1 ≡ f2 & L1 = ⋆.
+lemma lsubf_inv_atom2: â\88\80f1,f2,L1. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªâ\8b\86,f2â\9d« → ∧∧f1 ≡ f2 & L1 = ⋆.
/2 width=3 by lsubf_inv_atom2_aux/ qed-.
fact lsubf_inv_push2_aux:
- â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 →
- ∀g2,I2,K2. f2 = ⫯g2 → L2 = K2.ⓘ{I2} →
- â\88\83â\88\83g1,I1,K1. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f1 = ⫯g1 & L1 = K1.â\93\98{I1}.
+ â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« →
+ ∀g2,I2,K2. f2 = ⫯g2 → L2 = K2.ⓘ[I2] →
+ â\88\83â\88\83g1,I1,K1. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f1 = ⫯g1 & L1 = K1.â\93\98[I1].
#f1 #f2 #L1 #L2 * -f1 -f2 -L1 -L2
[ #f1 #f2 #_ #g2 #J2 #K2 #_ #H destruct
| #f1 #f2 #I1 #I2 #L1 #L2 #H12 #g2 #J2 #K2 #H1 #H2 destruct
qed-.
lemma lsubf_inv_push2:
- â\88\80f1,g2,I2,L1,K2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83K2.â\93\98{I2},⫯g2â¦\84 →
- â\88\83â\88\83g1,I1,K1. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f1 = ⫯g1 & L1 = K1.â\93\98{I1}.
+ â\88\80f1,g2,I2,L1,K2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªK2.â\93\98[I2],⫯g2â\9d« →
+ â\88\83â\88\83g1,I1,K1. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f1 = ⫯g1 & L1 = K1.â\93\98[I1].
/2 width=6 by lsubf_inv_push2_aux/ qed-.
fact lsubf_inv_pair2_aux:
- â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 →
- ∀g2,I,K2,W. f2 = ↑g2 → L2 = K2.ⓑ{I}W →
- â\88¨â\88¨ â\88\83â\88\83g1,K1. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f1 = â\86\91g1 & L1 = K1.â\93\91{I}W
- | â\88\83â\88\83g,g0,g1,K1,V. â¦\83K1,g0â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 &
- K1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 ≘ g & g0 ⋓ g ≘ g1 & f1 = ↑g1 &
+ â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« →
+ ∀g2,I,K2,W. f2 = ↑g2 → L2 = K2.ⓑ[I]W →
+ â\88¨â\88¨ â\88\83â\88\83g1,K1. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f1 = â\86\91g1 & L1 = K1.â\93\91[I]W
+ | â\88\83â\88\83g,g0,g1,K1,V. â\9dªK1,g0â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« &
+ K1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ g & g0 ⋓ g ≘ g1 & f1 = ↑g1 &
I = Abst & L1 = K1.ⓓⓝW.V.
#f1 #f2 #L1 #L2 * -f1 -f2 -L1 -L2
[ #f1 #f2 #_ #g2 #J #K2 #X #_ #H destruct
qed-.
lemma lsubf_inv_pair2:
- â\88\80f1,g2,I,L1,K2,W. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83K2.â\93\91{I}W,â\86\91g2â¦\84 →
- â\88¨â\88¨ â\88\83â\88\83g1,K1. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f1 = â\86\91g1 & L1 = K1.â\93\91{I}W
- | â\88\83â\88\83g,g0,g1,K1,V. â¦\83K1,g0â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 &
- K1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 ≘ g & g0 ⋓ g ≘ g1 & f1 = ↑g1 &
+ â\88\80f1,g2,I,L1,K2,W. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªK2.â\93\91[I]W,â\86\91g2â\9d« →
+ â\88¨â\88¨ â\88\83â\88\83g1,K1. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f1 = â\86\91g1 & L1 = K1.â\93\91[I]W
+ | â\88\83â\88\83g,g0,g1,K1,V. â\9dªK1,g0â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« &
+ K1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ g & g0 ⋓ g ≘ g1 & f1 = ↑g1 &
I = Abst & L1 = K1.ⓓⓝW.V.
/2 width=5 by lsubf_inv_pair2_aux/ qed-.
fact lsubf_inv_unit2_aux:
- â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 →
- ∀g2,I,K2. f2 = ↑g2 → L2 = K2.ⓤ{I} →
- â\88¨â\88¨ â\88\83â\88\83g1,K1. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f1 = â\86\91g1 & L1 = K1.â\93¤{I}
- | â\88\83â\88\83g,g0,g1,J,K1,V. â¦\83K1,g0â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 &
- K1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 â\89\98 g & g0 â\8b\93 g â\89\98 g1 & f1 = â\86\91g1 & L1 = K1.â\93\91{J}V.
+ â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« →
+ ∀g2,I,K2. f2 = ↑g2 → L2 = K2.ⓤ[I] →
+ â\88¨â\88¨ â\88\83â\88\83g1,K1. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f1 = â\86\91g1 & L1 = K1.â\93¤[I]
+ | â\88\83â\88\83g,g0,g1,J,K1,V. â\9dªK1,g0â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« &
+ K1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« â\89\98 g & g0 â\8b\93 g â\89\98 g1 & f1 = â\86\91g1 & L1 = K1.â\93\91[J]V.
#f1 #f2 #L1 #L2 * -f1 -f2 -L1 -L2
[ #f1 #f2 #_ #g2 #J #K2 #_ #H destruct
| #f1 #f2 #I1 #I2 #L1 #L2 #H12 #g2 #J #K2 #H elim (discr_push_next … H)
qed-.
lemma lsubf_inv_unit2:
- â\88\80f1,g2,I,L1,K2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83K2.â\93¤{I},â\86\91g2â¦\84 →
- â\88¨â\88¨ â\88\83â\88\83g1,K1. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f1 = â\86\91g1 & L1 = K1.â\93¤{I}
- | â\88\83â\88\83g,g0,g1,J,K1,V. â¦\83K1,g0â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 &
- K1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 â\89\98 g & g0 â\8b\93 g â\89\98 g1 & f1 = â\86\91g1 & L1 = K1.â\93\91{J}V.
+ â\88\80f1,g2,I,L1,K2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªK2.â\93¤[I],â\86\91g2â\9d« →
+ â\88¨â\88¨ â\88\83â\88\83g1,K1. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f1 = â\86\91g1 & L1 = K1.â\93¤[I]
+ | â\88\83â\88\83g,g0,g1,J,K1,V. â\9dªK1,g0â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« &
+ K1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« â\89\98 g & g0 â\8b\93 g â\89\98 g1 & f1 = â\86\91g1 & L1 = K1.â\93\91[J]V.
/2 width=5 by lsubf_inv_unit2_aux/ qed-.
(* Advanced inversion lemmas ************************************************)
-lemma lsubf_inv_atom: â\88\80f1,f2. â¦\83â\8b\86,f1â¦\84 â«\83ð\9d\90\85+ â¦\83â\8b\86,f2â¦\84 → f1 ≡ f2.
+lemma lsubf_inv_atom: â\88\80f1,f2. â\9dªâ\8b\86,f1â\9d« â«\83ð\9d\90\85+ â\9dªâ\8b\86,f2â\9d« → f1 ≡ f2.
#f1 #f2 #H elim (lsubf_inv_atom1 … H) -H //
qed-.
lemma lsubf_inv_push_sn:
- â\88\80g1,f2,I1,I2,K1,K2. â¦\83K1.â\93\98{I1},⫯g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2.â\93\98{I2},f2â¦\84 →
- â\88\83â\88\83g2. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f2 = ⫯g2.
+ â\88\80g1,f2,I1,I2,K1,K2. â\9dªK1.â\93\98[I1],⫯g1â\9d« â«\83ð\9d\90\85+ â\9dªK2.â\93\98[I2],f2â\9d« →
+ â\88\83â\88\83g2. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f2 = ⫯g2.
#g1 #f2 #I #K1 #K2 #X #H elim (lsubf_inv_push1 … H) -H
#g2 #I #Y #H0 #H2 #H destruct /2 width=3 by ex2_intro/
qed-.
lemma lsubf_inv_bind_sn:
- â\88\80g1,f2,I,K1,K2. â¦\83K1.â\93\98{I},â\86\91g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2.â\93\98{I},f2â¦\84 →
- â\88\83â\88\83g2. â¦\83K1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & f2 = ↑g2.
+ â\88\80g1,f2,I,K1,K2. â\9dªK1.â\93\98[I],â\86\91g1â\9d« â«\83ð\9d\90\85+ â\9dªK2.â\93\98[I],f2â\9d« →
+ â\88\83â\88\83g2. â\9dªK1,g1â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & f2 = ↑g2.
#g1 #f2 * #I [2: #X ] #K1 #K2 #H
[ elim (lsubf_inv_pair1 … H) -H *
[ #z2 #Y2 #H2 #H #H0 destruct /2 width=3 by ex2_intro/
qed-.
lemma lsubf_inv_beta_sn:
- â\88\80g1,f2,K1,K2,V,W. â¦\83K1.â\93\93â\93\9dW.V,â\86\91g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2.â\93\9bW,f2â¦\84 →
- â\88\83â\88\83g,g0,g2. â¦\83K1,g0â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & K1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 ≘ g & g0 ⋓ g ≘ g1 & f2 = ↑g2.
+ â\88\80g1,f2,K1,K2,V,W. â\9dªK1.â\93\93â\93\9dW.V,â\86\91g1â\9d« â«\83ð\9d\90\85+ â\9dªK2.â\93\9bW,f2â\9d« →
+ â\88\83â\88\83g,g0,g2. â\9dªK1,g0â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & K1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ g & g0 ⋓ g ≘ g1 & f2 = ↑g2.
#g1 #f2 #K1 #K2 #V #W #H elim (lsubf_inv_pair1 … H) -H *
[ #z2 #Y2 #_ #_ #H destruct
| #z #z0 #z2 #Y2 #X0 #X #H02 #Hz #Hg1 #H #_ #H0 #H1 destruct
qed-.
lemma lsubf_inv_unit_sn:
- â\88\80g1,f2,I,J,K1,K2,V. â¦\83K1.â\93\91{I}V,â\86\91g1â¦\84 â«\83ð\9d\90\85+ â¦\83K2.â\93¤{J},f2â¦\84 →
- â\88\83â\88\83g,g0,g2. â¦\83K1,g0â¦\84 â«\83ð\9d\90\85+ â¦\83K2,g2â¦\84 & K1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 ≘ g & g0 ⋓ g ≘ g1 & f2 = ↑g2.
+ â\88\80g1,f2,I,J,K1,K2,V. â\9dªK1.â\93\91[I]V,â\86\91g1â\9d« â«\83ð\9d\90\85+ â\9dªK2.â\93¤[J],f2â\9d« →
+ â\88\83â\88\83g,g0,g2. â\9dªK1,g0â\9d« â«\83ð\9d\90\85+ â\9dªK2,g2â\9d« & K1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ g & g0 ⋓ g ≘ g1 & f2 = ↑g2.
#g1 #f2 #I #J #K1 #K2 #V #H elim (lsubf_inv_pair1 … H) -H *
[ #z2 #Y2 #_ #_ #H destruct
| #z #z0 #z2 #Y2 #X0 #X #_ #_ #_ #_ #_ #_ #H destruct
]
qed-.
-lemma lsubf_inv_refl: â\88\80L,f1,f2. â¦\83L,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L,f2â¦\84 → f1 ≡ f2.
+lemma lsubf_inv_refl: â\88\80L,f1,f2. â\9dªL,f1â\9d« â«\83ð\9d\90\85+ â\9dªL,f2â\9d« → f1 ≡ f2.
#L elim L -L /2 width=1 by lsubf_inv_atom/
#L #I #IH #f1 #f2 #H12
elim (pn_split f1) * #g1 #H destruct
(* Basic forward lemmas *****************************************************)
lemma lsubf_fwd_bind_tl:
- â\88\80f1,f2,I,L1,L2. â¦\83L1.â\93\98{I},f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2.â\93\98{I},f2â¦\84 â\86\92 â¦\83L1,⫱f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,⫱f2â¦\84.
+ â\88\80f1,f2,I,L1,L2. â\9dªL1.â\93\98[I],f1â\9d« â«\83ð\9d\90\85+ â\9dªL2.â\93\98[I],f2â\9d« â\86\92 â\9dªL1,⫱f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,⫱f2â\9d«.
#f1 #f2 #I #L1 #L2 #H
elim (pn_split f1) * #g1 #H0 destruct
[ elim (lsubf_inv_push_sn … H) | elim (lsubf_inv_bind_sn … H) ] -H
#g2 #H12 #H destruct //
qed-.
-lemma lsubf_fwd_isid_dx: â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 â\86\92 ð\9d\90\88â¦\83f2â¦\84 â\86\92 ð\9d\90\88â¦\83f1â¦\84.
+lemma lsubf_fwd_isid_dx: â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« â\86\92 ð\9d\90\88â\9dªf2â\9d« â\86\92 ð\9d\90\88â\9dªf1â\9d«.
#f1 #f2 #L1 #L2 #H elim H -f1 -f2 -L1 -L2
[ /2 width=3 by isid_eq_repl_fwd/
| /4 width=3 by isid_inv_push, isid_push/
]
qed-.
-lemma lsubf_fwd_isid_sn: â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 â\86\92 ð\9d\90\88â¦\83f1â¦\84 â\86\92 ð\9d\90\88â¦\83f2â¦\84.
+lemma lsubf_fwd_isid_sn: â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« â\86\92 ð\9d\90\88â\9dªf1â\9d« â\86\92 ð\9d\90\88â\9dªf2â\9d«.
#f1 #f2 #L1 #L2 #H elim H -f1 -f2 -L1 -L2
[ /2 width=3 by isid_eq_repl_back/
| /4 width=3 by isid_inv_push, isid_push/
]
qed-.
-lemma lsubf_fwd_sle: â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 → f2 ⊆ f1.
+lemma lsubf_fwd_sle: â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« → f2 ⊆ f1.
#f1 #f2 #L1 #L2 #H elim H -f1 -f2 -L1 -L2
/3 width=5 by sor_inv_sle_sn_trans, sle_next, sle_push, sle_refl_eq, eq_sym/
qed-.
(* Basic properties *********************************************************)
-lemma lsubf_eq_repl_back1: â\88\80f2,L1,L2. eq_repl_back â\80¦ (λf1. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84).
+lemma lsubf_eq_repl_back1: â\88\80f2,L1,L2. eq_repl_back â\80¦ (λf1. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d«).
#f2 #L1 #L2 #f #H elim H -f -f2 -L1 -L2
[ #f1 #f2 #Hf12 #g1 #Hfg1
/3 width=3 by lsubf_atom, eq_canc_sn/
]
qed-.
-lemma lsubf_eq_repl_fwd1: â\88\80f2,L1,L2. eq_repl_fwd â\80¦ (λf1. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84).
+lemma lsubf_eq_repl_fwd1: â\88\80f2,L1,L2. eq_repl_fwd â\80¦ (λf1. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d«).
#f2 #L1 #L2 @eq_repl_sym /2 width=3 by lsubf_eq_repl_back1/
qed-.
-lemma lsubf_eq_repl_back2: â\88\80f1,L1,L2. eq_repl_back â\80¦ (λf2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84).
+lemma lsubf_eq_repl_back2: â\88\80f1,L1,L2. eq_repl_back â\80¦ (λf2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d«).
#f1 #L1 #L2 #f #H elim H -f1 -f -L1 -L2
[ #f1 #f2 #Hf12 #g2 #Hfg2
/3 width=3 by lsubf_atom, eq_trans/
]
qed-.
-lemma lsubf_eq_repl_fwd2: â\88\80f1,L1,L2. eq_repl_fwd â\80¦ (λf2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84).
+lemma lsubf_eq_repl_fwd2: â\88\80f1,L1,L2. eq_repl_fwd â\80¦ (λf2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d«).
#f1 #L1 #L2 @eq_repl_sym /2 width=3 by lsubf_eq_repl_back2/
qed-.
/2 width=1 by lsubf_push, lsubf_bind/
qed.
-lemma lsubf_refl_eq: â\88\80f1,f2,L. f1 â\89¡ f2 â\86\92 â¦\83L,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L,f2â¦\84.
+lemma lsubf_refl_eq: â\88\80f1,f2,L. f1 â\89¡ f2 â\86\92 â\9dªL,f1â\9d« â«\83ð\9d\90\85+ â\9dªL,f2â\9d«.
/2 width=3 by lsubf_eq_repl_back2/ qed.
lemma lsubf_bind_tl_dx:
- â\88\80g1,f2,I,L1,L2. â¦\83L1,g1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,⫱f2â¦\84 →
- â\88\83â\88\83f1. â¦\83L1.â\93\98{I},f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2.â\93\98{I},f2â¦\84 & g1 = ⫱f1.
+ â\88\80g1,f2,I,L1,L2. â\9dªL1,g1â\9d« â«\83ð\9d\90\85+ â\9dªL2,⫱f2â\9d« →
+ â\88\83â\88\83f1. â\9dªL1.â\93\98[I],f1â\9d« â«\83ð\9d\90\85+ â\9dªL2.â\93\98[I],f2â\9d« & g1 = ⫱f1.
#g1 #f2 #I #L1 #L2 #H
elim (pn_split f2) * #g2 #H2 destruct
@ex2_intro [1,2,4,5: /2 width=2 by lsubf_push, lsubf_bind/ ] // (**) (* constructor needed *)
qed-.
lemma lsubf_beta_tl_dx:
- â\88\80f,f0,g1,L1,V. L1 â\8a¢ ð\9d\90\85+â¦\83Vâ¦\84 ≘ f → f0 ⋓ f ≘ g1 →
- â\88\80f2,L2,W. â¦\83L1,f0â¦\84 â«\83ð\9d\90\85+ â¦\83L2,⫱f2â¦\84 →
- â\88\83â\88\83f1. â¦\83L1.â\93\93â\93\9dW.V,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2.â\93\9bW,f2â¦\84 & ⫱f1 ⊆ g1.
+ â\88\80f,f0,g1,L1,V. L1 â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ f → f0 ⋓ f ≘ g1 →
+ â\88\80f2,L2,W. â\9dªL1,f0â\9d« â«\83ð\9d\90\85+ â\9dªL2,⫱f2â\9d« →
+ â\88\83â\88\83f1. â\9dªL1.â\93\93â\93\9dW.V,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2.â\93\9bW,f2â\9d« & ⫱f1 ⊆ g1.
#f #f0 #g1 #L1 #V #Hf #Hg1 #f2
elim (pn_split f2) * #x2 #H2 #L2 #W #HL12 destruct
[ /3 width=4 by lsubf_push, sor_inv_sle_sn, ex2_intro/
(* Note: this might be moved *)
lemma lsubf_inv_sor_dx:
- â\88\80f1,f2,L1,L2. â¦\83L1,f1â¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2â¦\84 →
+ â\88\80f1,f2,L1,L2. â\9dªL1,f1â\9d« â«\83ð\9d\90\85+ â\9dªL2,f2â\9d« →
∀f2l,f2r. f2l⋓f2r ≘ f2 →
- â\88\83â\88\83f1l,f1r. â¦\83L1,f1lâ¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2lâ¦\84 & â¦\83L1,f1râ¦\84 â«\83ð\9d\90\85+ â¦\83L2,f2râ¦\84 & f1l⋓f1r ≘ f1.
+ â\88\83â\88\83f1l,f1r. â\9dªL1,f1lâ\9d« â«\83ð\9d\90\85+ â\9dªL2,f2lâ\9d« & â\9dªL1,f1râ\9d« â«\83ð\9d\90\85+ â\9dªL2,f2râ\9d« & f1l⋓f1r ≘ f1.
#f1 #f2 #L1 #L2 #H elim H -f1 -f2 -L1 -L2
[ /3 width=7 by sor_eq_repl_fwd3, ex3_2_intro/
| #g1 #g2 #I1 #I2 #L1 #L2 #_ #IH #f2l #f2r #H
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