Proof of Nuprl Lemma : diff_functionality_wrt

Step * 1 of Lemma diff_functionality_wrt_permr

1. s : DSet
2. as : |s| List
3. as' : |s| List
4. bs : |s| List
5. bs' : |s| List
6. as ≡(|s|) as'
7. bs ≡(|s|) bs'
⊢ (as - bs) ≡(|s|) (as' - bs')
BY
{ (SeqOnM
   [(FLemma `permr_iff_eq_counts_a` [7])
   ; (FLemma `permr_iff_eq_counts_a` [6])
   ; BLemma `permr_iff_eq_counts_a`; D 0]
   THENA Auto
   ) }

1
1. s : DSet
2. as : |s| List
3. as' : |s| List
4. bs : |s| List
5. bs' : |s| List
6. as ≡(|s|) as'
7. bs ≡(|s|) bs'
8. ∀x:|s|. ((x #∈ bs) = (x #∈ bs') ∈ ℤ)
9. ∀x:|s|. ((x #∈ as) = (x #∈ as') ∈ ℤ)
10. x : |s|
⊢ (x #∈ (as - bs)) = (x #∈ (as' - bs')) ∈ ℤ

Latex:

Latex:
1. s : DSet 2. as : |s| List 3. as' : |s| List 4. bs : |s| List 5. bs' : |s| List 6. as \mequiv{}(|s|) as' 7. bs \mequiv{}(|s|) bs' \mvdash{} (as - bs) \mequiv{}(|s|) (as' - bs') By Latex: (SeqOnM [(FLemma `permr\_iff\_eq\_counts\_a` [7]) ; (FLemma `permr\_iff\_eq\_counts\_a` [6]) ; BLemma `permr\_iff\_eq\_counts\_a`; D 0] THENA Auto ) Home Index