Step
*
1
1
2
of Lemma
bind-class-assoc
1. Info : Type
2. T : Type
3. S : Type
4. U : Type
5. X : es:EO+(Info) ⟶ e:E ⟶ bag(T)
6. Y : T ⟶ es:EO+(Info) ⟶ e:E ⟶ bag(S)
7. Z : S ⟶ es:EO+(Info) ⟶ e:E ⟶ bag(U)
8. es : EO+(Info)@i'
9. e : E@i
10. ≤loc(e) ∈ bag({e':E| e' ≤loc e } )
11. ⋃b∈≤loc(e).⋃y∈⋃a∈≤loc(b).⋃x∈X es a.Y[x] es.a b.Z[y] es.b e
= ⋃b∈≤loc(e).⋃a∈≤loc(b).⋃y∈⋃x∈X es a.Y[x] es.a b.Z[y] es.b e
∈ bag(U)
⊢ ⋃b∈≤loc(e).⋃y∈⋃a∈≤loc(b).⋃x∈X es a.Y[x] es.a b.Z[y] es.b e
= ⋃a∈≤loc(e).⋃x∈X es a.⋃b∈≤loc(e).⋃y∈Y[x] es.a b.Z[y] es.a.b e
∈ bag(U)
BY
{ (NthHypEq (-1) THEN EqCD THEN Auto THEN Thin (-1) THEN Symmetry) }
1
1. Info : Type
2. T : Type
3. S : Type
4. U : Type
5. X : es:EO+(Info) ⟶ e:E ⟶ bag(T)
6. Y : T ⟶ es:EO+(Info) ⟶ e:E ⟶ bag(S)
7. Z : S ⟶ es:EO+(Info) ⟶ e:E ⟶ bag(U)
8. es : EO+(Info)@i'
9. e : E@i
10. ≤loc(e) ∈ bag({e':E| e' ≤loc e } )
⊢ ⋃b∈≤loc(e).⋃a∈≤loc(b).⋃y∈⋃x∈X es a.Y[x] es.a b.Z[y] es.b e
= ⋃a∈≤loc(e).⋃x∈X es a.⋃b∈≤loc(e).⋃y∈Y[x] es.a b.Z[y] es.a.b e
∈ bag(U)
Latex:
Latex:
1. Info : Type
2. T : Type
3. S : Type
4. U : Type
5. X : es:EO+(Info) {}\mrightarrow{} e:E {}\mrightarrow{} bag(T)
6. Y : T {}\mrightarrow{} es:EO+(Info) {}\mrightarrow{} e:E {}\mrightarrow{} bag(S)
7. Z : S {}\mrightarrow{} es:EO+(Info) {}\mrightarrow{} e:E {}\mrightarrow{} bag(U)
8. es : EO+(Info)@i'
9. e : E@i
10. \mleq{}loc(e) \mmember{} bag(\{e':E| e' \mleq{}loc e \} )
11. \mcup{}b\mmember{}\mleq{}loc(e).\mcup{}y\mmember{}\mcup{}a\mmember{}\mleq{}loc(b).\mcup{}x\mmember{}X es a.Y[x] es.a b.Z[y] es.b e
= \mcup{}b\mmember{}\mleq{}loc(e).\mcup{}a\mmember{}\mleq{}loc(b).\mcup{}y\mmember{}\mcup{}x\mmember{}X es a.Y[x] es.a b.Z[y] es.b e
\mvdash{} \mcup{}b\mmember{}\mleq{}loc(e).\mcup{}y\mmember{}\mcup{}a\mmember{}\mleq{}loc(b).\mcup{}x\mmember{}X es a.Y[x] es.a b.Z[y] es.b e
= \mcup{}a\mmember{}\mleq{}loc(e).\mcup{}x\mmember{}X es a.\mcup{}b\mmember{}\mleq{}loc(e).\mcup{}y\mmember{}Y[x] es.a b.Z[y] es.a.b e
By
Latex:
(NthHypEq (-1) THEN EqCD THEN Auto THEN Thin (-1) THEN Symmetry)
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