Step
*
of Lemma
list-if-has-value-length
∀l:Base. l ∈ Base List supposing (||l||)↓
BY
{ ((UnivCD THENA Auto)
THEN All(RepUR ``length list_ind``)
THEN Compactness (-1)
THEN Unhide
THEN Thin (-3)
THEN MoveToConcl (-3)
THEN NatInd (-1)
THEN Reduce 0
THEN Strictness
THEN (UnivCD THENA Auto)
THEN BotDiv
THEN (RWO "fun_exp_unroll_1" (-1) THENA Auto)
THEN Reduce (-1)
THEN HasValueD (-1)
THEN HVimplies2 (-2) [1]) }
1
1. j : ℤ
2. 0 < j
3. ∀l:Base
((λlist_ind,L. eval v = L in
if v is a pair then let a,b = v
in (list_ind b) + 1 otherwise if v = Ax then 0 otherwise ⊥^j - 1
⊥
l)↓
⇒ (l ∈ Base List))
4. l : Base@i
5. ((λlist_ind,L. eval v = L in
if v is a pair then let a,b = v
in (list_ind b) + 1 otherwise if v = Ax then 0 otherwise ⊥^j - 1
⊥
(snd(l)))
+ 1)↓@i
6. 0 ≤ 0
7. l ~ <fst(l), snd(l)>
⊢ <fst(l), snd(l)> ∈ Base List
2
1. j : ℤ
2. 0 < j
3. ∀l:Base
((λlist_ind,L. eval v = L in
if v is a pair then let a,b = v
in (list_ind b) + 1 otherwise if v = Ax then 0 otherwise ⊥^j - 1
⊥
l)↓
⇒ (l ∈ Base List))
4. l : Base@i
5. (if l = Ax then 0 otherwise ⊥)↓@i
6. (l)↓
7. ∀a,b:Top. (if l is a pair then a otherwise b ~ b)
⊢ l ∈ Base List
Latex:
Latex:
\mforall{}l:Base. l \mmember{} Base List supposing (||l||)\mdownarrow{}
By
Latex:
((UnivCD THENA Auto)
THEN All(RepUR ``length list\_ind``)
THEN Compactness (-1)
THEN Unhide
THEN Thin (-3)
THEN MoveToConcl (-3)
THEN NatInd (-1)
THEN Reduce 0
THEN Strictness
THEN (UnivCD THENA Auto)
THEN BotDiv
THEN (RWO "fun\_exp\_unroll\_1" (-1) THENA Auto)
THEN Reduce (-1)
THEN HasValueD (-1)
THEN HVimplies2 (-2) [1])
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