Step
*
2
1
1
1
1
of Lemma
l-last-is-last
1. u : Base
2. v : Base
3. j : ℤ
4. 0 < j
5. ∀l:Base
((exception(u; v) ≤ λselect,n,L. let x,y = L in if (n) < (1) then x else eval m = n - 1 in select m y^j - 1 ⊥ (||\000Cl|| - 1) l)
⇒ (exception(u; v) ≤ l-last(l)))
6. l : Base
7. exception(u; v) ≤ if (||<fst(l), snd(l)>|| - 1) < (1)
then fst(l)
else eval m = ||<fst(l), snd(l)>|| - 1 - 1 in
λselect,n,L. let x,y = L in if (n) < (1) then x else eval m = n - 1 in select m y^j - 1 ⊥\000C m (snd(l))
8. l ∈ Top × Top
9. is-exception(if (||<fst(l), snd(l)>|| - 1) < (1)
then fst(l)
else eval m = ||<fst(l), snd(l)>|| - 1 - 1 in
λselect,n,L. let x,y = L in if (n) < (1) then x else eval m = n - 1 in select m y^j - 1 ⊥ m (s\000Cnd(l)))
10. ||<fst(l), snd(l)>|| - 1 ∈ ℤ
11. 1 ∈ ℤ
⊢ exception(u; v) ≤ l-last(<fst(l), snd(l)>)
BY
{ TACTIC:(Thin (-3) THEN (Assert (||<fst(l), snd(l)>|| - 1)↓ BY Auto) THEN Unfold `subtract` -1 THEN HasValueD (-1)) }
1
1. u : Base
2. v : Base
3. j : ℤ
4. 0 < j
5. ∀l:Base
((exception(u; v) ≤ λselect,n,L. let x,y = L in if (n) < (1) then x else eval m = n - 1 in select m y^j - 1 ⊥ (||\000Cl|| - 1) l)
⇒ (exception(u; v) ≤ l-last(l)))
6. l : Base
7. exception(u; v) ≤ if (||<fst(l), snd(l)>|| - 1) < (1)
then fst(l)
else eval m = ||<fst(l), snd(l)>|| - 1 - 1 in
λselect,n,L. let x,y = L in if (n) < (1) then x else eval m = n - 1 in select m y^j - 1 ⊥\000C m (snd(l))
8. l ∈ Top × Top
9. ||<fst(l), snd(l)>|| - 1 ∈ ℤ
10. 1 ∈ ℤ
11. (||<fst(l), snd(l)>|| + (-1))↓
12. ||<fst(l), snd(l)>|| ∈ ℤ
13. -1 ∈ ℤ
⊢ exception(u; v) ≤ l-last(<fst(l), snd(l)>)
Latex:
Latex:
1. u : Base
2. v : Base
3. j : \mBbbZ{}
4. 0 < j
5. \mforall{}l:Base
((exception(u; v) \mleq{} \mlambda{}select,n,L. let x,y = L
in if (n) < (1) then x else eval m = n - 1 in select m y\^{}j -\000C 1
\mbot{}
(||l|| - 1)
l)
{}\mRightarrow{} (exception(u; v) \mleq{} l-last(l)))
6. l : Base
7. exception(u; v) \mleq{} if (||<fst(l), snd(l)>|| - 1) < (1)
then fst(l)
else eval m = ||<fst(l), snd(l)>|| - 1 - 1 in
\mlambda{}select,n,L. let x,y = L
in if (n) < (1) then x else eval m = n - 1 in select m y\000C\^{}j - 1
\mbot{}
m
(snd(l))
8. l \mmember{} Top \mtimes{} Top
9. is-exception(if (||<fst(l), snd(l)>|| - 1) < (1)
then fst(l)
else eval m = ||<fst(l), snd(l)>|| - 1 - 1 in
\mlambda{}select,n,L. let x,y = L
in if (n) < (1) then x else eval m = n - 1 in select m y\^{}j - \000C1
\mbot{}
m
(snd(l)))
10. ||<fst(l), snd(l)>|| - 1 \mmember{} \mBbbZ{}
11. 1 \mmember{} \mBbbZ{}
\mvdash{} exception(u; v) \mleq{} l-last(<fst(l), snd(l)>)
By
Latex:
TACTIC:(Thin (-3)
THEN (Assert (||<fst(l), snd(l)>|| - 1)\mdownarrow{} BY
Auto)
THEN Unfold `subtract` -1
THEN HasValueD (-1))
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