Step
*
2
1
of Lemma
sorted-by-unique
1. T : Type
2. R : T ⟶ T ⟶ ℙ
3. Trans(T;a,b.R a b)
4. AntiSym(T;a,b.R a b)
5. u : T
6. v : T List
7. ∀[sb:T List]
(v = sb ∈ (T List)) supposing
(no_repeats(T;v) and
sorted-by(R;v) and
no_repeats(T;sb) and
sorted-by(R;sb) and
set-equal(T;v;sb))
⊢ ([u / v] = [] ∈ (T List)) supposing
(no_repeats(T;[u / v]) and
sorted-by(R;[u / v]) and
no_repeats(T;[]) and
sorted-by(R;[]) and
set-equal(T;[u / v];[]))
BY
{ Auto }
1
1. T : Type
2. R : T ⟶ T ⟶ ℙ
3. Trans(T;a,b.R a b)
4. AntiSym(T;a,b.R a b)
5. u : T
6. v : T List
7. ∀[sb:T List]
(v = sb ∈ (T List)) supposing
(no_repeats(T;v) and
sorted-by(R;v) and
no_repeats(T;sb) and
sorted-by(R;sb) and
set-equal(T;v;sb))
8. set-equal(T;[u / v];[])
9. sorted-by(R;[])
10. no_repeats(T;[])
11. sorted-by(R;[u / v])
12. no_repeats(T;[u / v])
⊢ [u / v] = [] ∈ (T List)
Latex:
Latex:
1. T : Type
2. R : T {}\mrightarrow{} T {}\mrightarrow{} \mBbbP{}
3. Trans(T;a,b.R a b)
4. AntiSym(T;a,b.R a b)
5. u : T
6. v : T List
7. \mforall{}[sb:T List]
(v = sb) supposing
(no\_repeats(T;v) and
sorted-by(R;v) and
no\_repeats(T;sb) and
sorted-by(R;sb) and
set-equal(T;v;sb))
\mvdash{} ([u / v] = []) supposing
(no\_repeats(T;[u / v]) and
sorted-by(R;[u / v]) and
no\_repeats(T;[]) and
sorted-by(R;[]) and
set-equal(T;[u / v];[]))
By
Latex:
Auto
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