1 (**************************************************************************)
4 (* ||A|| A project by Andrea Asperti *)
6 (* ||I|| Developers: *)
7 (* ||T|| The HELM team. *)
8 (* ||A|| http://helm.cs.unibo.it *)
10 (* \ / This file is distributed under the terms of the *)
11 (* v GNU General Public License Version 2 *)
13 (**************************************************************************)
15 set "baseuri" "cic:/matita/valued_lattice/".
17 include "ordered_groups.ma".
19 record vlattice (R : ogroup) : Type ≝ {
22 join: vl_carr → vl_carr → vl_carr;
23 meet: vl_carr → vl_carr → vl_carr;
24 meet_refl: ∀x. value (meet x x) ≈ value x;
25 join_refl: ∀x. value (join x x) ≈ value x;
26 meet_comm: ∀x,y. value (meet x y) ≈ value (meet y x);
27 join_comm: ∀x,y. value (join x y) ≈ value (join y x);
28 join_assoc: ∀x,y,z. value (join x (join y z)) ≈ value (join (join x y) z);
29 meet_assoc: ∀x,y,z. value (meet x (meet y z)) ≈ value (meet (meet x y) z);
30 meet_wins1: ∀x,y. value (join x (meet x y)) ≈ value x;
31 meet_wins2: ∀x,y. value (meet x (join x y)) ≈ value x;
32 meet_join_plus: ∀x,y. value (join x y) + value (meet x y) ≈ value x + value y;
33 join_meet_le: ∀x,y,z. value (join x (meet y z)) ≤ value (join x y);
34 meet_join_le: ∀x,y,z. value (meet x (join y z)) ≤ value (meet x y)
37 interpretation "valued lattice meet" 'and a b =
38 (cic:/matita/valued_lattice/meet.con _ _ a b).
40 interpretation "valued lattice join" 'or a b =
41 (cic:/matita/valued_lattice/join.con _ _ a b).
43 notation < "\nbsp \mu a" non associative with precedence 80 for @{ 'value2 $a}.
44 interpretation "lattice value" 'value2 a = (cic:/matita/valued_lattice/value.con _ _ a).
46 notation "\mu" non associative with precedence 80 for @{ 'value }.
47 interpretation "lattice value" 'value = (cic:/matita/valued_lattice/value.con _ _).
49 axiom foo: ∀R.∀L:vlattice R.∀x,y,z:L.
50 μ(x ∧ (y ∨ z)) ≈ (μ x) + (μ y) + μ z + -μ (y ∧ z) + -μ (z ∨ (x ∨ y)).
52 lemma meet_join_le1: ∀R.∀L:vlattice R.∀x,y,z:L.μ (x ∧ z) ≤ μ (x ∧ (y ∨ z)).
54 apply (le_rewr ??? (μ x + μ y + μ z + -μ (y ∧ z) + -μ(z ∨ (x ∨ y))) (foo ?????));
55 apply (le_rewr ??? (μ x + μ y + μ z + -μ (y ∧ z) + -μ((z ∨ x) ∨ y)));
56 [ apply feq_plusl; apply eq_opp_sym; apply join_assoc;]
57 lapply (meet_join_le ?? z x y);
58 cut (- μ (z ∨ x ∨ y) ≈ - μ (z ∨ x) - μ y + μ (y ∧ (z ∨ x)));
62 lemma join_meet_le1: ∀R.∀L:vlattice R.∀x,y,z:L.μ (x ∨ (y ∧ z)) ≤ μ (x ∨ z).
63 (* hint per duplicati? *)
65 apply (le_rewr ??? (0 + μ (x ∨ z)) (zero_neutral ??));
66 apply (le_rewr ??? (μ (x ∨ z) + 0) (plus_comm ???));
67 apply (le_rewr ??? (μ (x ∨ z) + (-μ(y ∨ z) + μ(y ∨ z))) (opp_inverse ? ?));