X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=helm%2Fsoftware%2Fmatita%2Fnlibrary%2Fsets%2Fpartitions.ma;h=de29e796c47141fc80cd8659aa35a64c68e01a82;hb=661403facfb7ca53b58635a95904787ae393bde5;hp=1dce8d535f0926646958a8224412065e55dc1ea3;hpb=d93c422814484956482b1e70d90bb443eb99af21;p=helm.git diff --git a/helm/software/matita/nlibrary/sets/partitions.ma b/helm/software/matita/nlibrary/sets/partitions.ma index 1dce8d535..de29e796c 100644 --- a/helm/software/matita/nlibrary/sets/partitions.ma +++ b/helm/software/matita/nlibrary/sets/partitions.ma @@ -18,19 +18,11 @@ include "nat/compare.ma". include "nat/minus.ma". include "datatypes/pairs.ma". -alias symbol "eq" = "setoid eq". - -alias symbol "eq" = "setoid1 eq". -alias symbol "eq" = "setoid eq". -alias symbol "eq" = "setoid eq". -alias symbol "eq" = "setoid1 eq". -alias symbol "eq" = "setoid eq". -alias symbol "eq" = "setoid1 eq". -alias symbol "eq" = "setoid eq". +alias symbol "eq" (instance 7) = "setoid1 eq". nrecord partition (A: setoid) : Type[1] ≝ { support: setoid; - indexes: qpowerclass support; - class: unary_morphism1 (setoid1_of_setoid support) (qpowerclass_setoid A); + indexes: ext_powerclass support; + class: unary_morphism1 (setoid1_of_setoid support) (ext_powerclass_setoid A); inhabited: ∀i. i ∈ indexes → class i ≬ class i; disjoint: ∀i,j. i ∈ indexes → j ∈ indexes → class i ≬ class j → i = j; covers: big_union support ? indexes (λx.class x) = full_set A @@ -86,7 +78,7 @@ ntheorem iso_nat_nat_union_char: ncases (ltb_cases m (s (S n'))); *; #H1; #H2; nrewrite > H2; nwhd in ⊢ (let p ≝ % in ?); nwhd [ napply conj [napply conj - [ nwhd in ⊢ (????(?(?%(λ_.λ_:(??%).?))%)); nrewrite > (minus_canc n'); napply refl + [ nwhd in ⊢ (???(?(?%(λ_.λ_:(??%).?))%)); nrewrite > (minus_canc n'); napply refl | nnormalize; napply le_n] ##| nnormalize; nassumption ] ##| nchange in H with (m < s (S n') + big_plus (S n') (λi.λ_.s i)); @@ -96,7 +88,7 @@ ntheorem iso_nat_nat_union_char: |@ [nrewrite > (split_big_plus …); ##[##2:napply ad_hoc11;##|##3:##skip] nrewrite > (ad_hoc12 …); ##[##2: nassumption] - nwhd in ⊢ (????(?(??%)?)); + nwhd in ⊢ (???(?(??%)?)); nrewrite > (ad_hoc13 …);##[##2: nassumption] napply ad_hoc14 [ napply not_lt_to_le; nassumption ] nwhd in ⊢ (???(?(??%)?)); @@ -155,6 +147,7 @@ nlemma partition_splits_card: nlapply (f_sur ???? (fi nindex) y ?) [ alias symbol "refl" = "refl". alias symbol "prop1" = "prop11". +alias symbol "prop2" = "prop21 mem". napply (. #‡(†?));##[##2: napply Hni2 |##1: ##skip | nassumption]##] *; #nindex2; *; #Hni21; #Hni22; nletin xxx ≝ (plus (big_plus (minus n nindex) (λi.λ_.s (S (plus i nindex)))) nindex2); @@ -171,7 +164,7 @@ napply (. #‡(†?));##[##2: napply Hni2 |##1: ##skip | nassumption]##] |##5: napply le_S_S_to_le; nassumption |##*: nassumption]##] ##| #x; #x'; nnormalize in ⊢ (? → ? → %); #Hx; #Hx'; #E; - ncut(∀i1,i2,i1',i2'. i1 ∈ Nat_ (S n) → i1' ∈ Nat_ (S n) → i2 ∈ pc ? (Nat_ (s i1)) → i2' ∈ pc ? (Nat_ (s i1')) → eq_rel (carr A) (eq A) (iso_f ???? (fi i1) i2) (iso_f ???? (fi i1') i2') → i1=i1' ∧ i2=i2'); + ncut(∀i1,i2,i1',i2'. i1 ∈ Nat_ (S n) → i1' ∈ Nat_ (S n) → i2 ∈ Nat_ (s i1) → i2' ∈ Nat_ (s i1') → eq_rel (carr A) (eq A) (fi i1 i2) (fi i1' i2') → i1=i1' ∧ i2=i2'); ##[ #i1; #i2; #i1'; #i2'; #Hi1; #Hi1'; #Hi2; #Hi2'; #E; nlapply(disjoint … P (f i1) (f i1') ???) [##2,3: napply f_closed; nassumption @@ -204,7 +197,7 @@ ndefinition partition_of_compatible_equivalence_relation: [ napply (quotient ? R) | napply Full_set | napply mk_unary_morphism1 - [ #a; napply mk_qpowerclass + [ #a; napply mk_ext_powerclass [ napply {x | R x a} | #x; #x'; #H; nnormalize; napply mk_iff; #K; nelim daemon] ##| #a; #a'; #H; napply conj; #x; nnormalize; #K [ nelim daemon | nelim daemon]##]