1 Require Export pr2_defs.
2 Require Export pr3_defs.
3 Require Export pc1_defs.
5 (*#* #caption "the relation $\\PcT{}{}{}$" *)
6 (*#* #cap #cap c, t, t1, t2 *)
8 Definition pc3 := [c:?; t1,t2:?] (EX t | (pr3 c t1 t) & (pr3 c t2 t)).
12 Hints Unfold pc3 : ltlc.
14 Tactic Definition Pc3Unfold :=
16 [ H: (pc3 ?1 ?2 ?3) |- ? ] -> Unfold pc3 in H; XDecompose H.
18 Section pc3_props. (******************************************************)
20 Theorem pc3_pr2_r: (c,t1,t2:?) (pr2 c t1 t2) -> (pc3 c t1 t2).
24 Theorem pc3_pr2_x: (c,t1,t2:?) (pr2 c t2 t1) -> (pc3 c t1 t2).
28 Theorem pc3_pr3_r: (c:?; t1,t2) (pr3 c t1 t2) -> (pc3 c t1 t2).
32 Theorem pc3_pr3_x: (c:?; t1,t2) (pr3 c t2 t1) -> (pc3 c t1 t2).
36 Theorem pc3_pr3_t: (c:?; t1,t0:?) (pr3 c t1 t0) ->
37 (t2:?) (pr3 c t2 t0) -> (pc3 c t1 t2).
41 Theorem pc3_pr2_u: (c:?; t2,t1:?) (pr2 c t1 t2) ->
42 (t3:?) (pc3 c t2 t3) -> (pc3 c t1 t3).
43 Intros; Pc3Unfold; XEAuto.
46 Theorem pc3_refl: (c:?; t:?) (pc3 c t t).
50 Theorem pc3_s: (c,t2,t1:?) (pc3 c t1 t2) -> (pc3 c t2 t1).
51 Intros; Pc3Unfold; XEAuto.
54 Theorem pc3_thin_dx: (c:? ;t1,t2:?) (pc3 c t1 t2) ->
55 (u:?; f:?) (pc3 c (TTail (Flat f) u t1)
56 (TTail (Flat f) u t2)).
57 Intros; Pc3Unfold; XEAuto.
60 Theorem pc3_tail_1: (c:?; u1,u2:?) (pc3 c u1 u2) ->
61 (k:?; t:?) (pc3 c (TTail k u1 t) (TTail k u2 t)).
62 Intros; Pc3Unfold; XEAuto.
65 Theorem pc3_tail_2: (c:?; u,t1,t2:?; k:?) (pc3 (CTail c k u) t1 t2) ->
66 (pc3 c (TTail k u t1) (TTail k u t2)).
67 Intros; Pc3Unfold; XEAuto.
70 Theorem pc3_shift: (h:?; c,e:?) (drop h (0) c e) ->
71 (t1,t2:?) (pc3 c t1 t2) ->
72 (pc3 e (app c h t1) (app c h t2)).
73 Intros; Pc3Unfold; XEAuto.
76 Theorem pc3_pc1: (t1,t2:?) (pc1 t1 t2) -> (c:?) (pc3 c t1 t2).
77 Intros; Pc1Unfold; XEAuto.
82 Hints Resolve pc3_refl pc3_pr2_r pc3_pr2_x pc3_pr3_r pc3_pr3_x
83 pc3_s pc3_pr3_t pc3_thin_dx pc3_tail_1 pc3_tail_2
84 pc3_pr2_u pc3_shift pc3_pc1 : ltlc.