3 Require Export pr1_defs.
4 Require Export pr2_defs.
6 Inductive pr3 [c:C] : T -> T -> Prop :=
7 | pr3_r : (t:?) (pr3 c t t)
8 | pr3_u : (t2,t1:?) (pr2 c t1 t2) ->
9 (t3:?) (pr3 c t2 t3) -> (pr3 c t1 t3).
11 Hint pr3: ltlc := Constructors pr3.
13 Section pr3_props. (******************************************************)
15 Theorem pr3_pr2 : (c,t1,t2:?) (pr2 c t1 t2) -> (pr3 c t1 t2).
19 Theorem pr3_t : (t2,t1,c:?) (pr3 c t1 t2) ->
20 (t3:?) (pr3 c t2 t3) -> (pr3 c t1 t3).
21 Intros until 1; XElim H; XEAuto.
24 Theorem pr3_tail_1 : (c:?; u1,u2:?) (pr3 c u1 u2) ->
25 (k:?; t:?) (pr3 c (TTail k u1 t) (TTail k u2 t)).
26 Intros until 1; XElim H; Intros.
30 EApply pr3_u; [ Apply pr2_tail_1; Apply H | XAuto ].
33 Theorem pr3_tail_2 : (c:?; u,t1,t2:?; k:?) (pr3 (CTail c k u) t1 t2) ->
34 (pr3 c (TTail k u t1) (TTail k u t2)).
35 Intros until 1; XElim H; Intros.
39 EApply pr3_u; [ Apply pr2_tail_2; Apply H | XAuto ].
42 Hints Resolve pr3_tail_1 pr3_tail_2 : ltlc.
44 Theorem pr3_tail_21 : (c:?; u1,u2:?) (pr3 c u1 u2) ->
45 (k:?; t1,t2:?) (pr3 (CTail c k u1) t1 t2) ->
46 (pr3 c (TTail k u1 t1) (TTail k u2 t2)).
48 EApply pr3_t; [ Apply pr3_tail_2 | Apply pr3_tail_1 ]; XAuto.
51 Theorem pr3_tail_12 : (c:?; u1,u2:?) (pr3 c u1 u2) ->
52 (k:?; t1,t2:?) (pr3 (CTail c k u2) t1 t2) ->
53 (pr3 c (TTail k u1 t1) (TTail k u2 t2)).
55 EApply pr3_t; [ Apply pr3_tail_1 | Apply pr3_tail_2 ]; XAuto.
58 Theorem pr3_shift : (h:?; c,e:?) (drop h (0) c e) ->
59 (t1,t2:?) (pr3 c t1 t2) ->
60 (pr3 e (app c h t1) (app c h t2)).
61 Intros until 2; XElim H0; Clear t1 t2; Intros.
68 Theorem pr3_pr1: (t1,t2:?) (pr1 t1 t2) -> (c:?) (pr3 c t1 t2).
69 Intros until 1; XElim H; XEAuto.
74 Hints Resolve pr3_pr2 pr3_t pr3_pr1
75 pr3_tail_12 pr3_tail_21 pr3_shift : ltlc.