Proof of Nuprl Lemma : select-remove-first

Step * of Lemma select-remove-first

∀[T:Type]. ∀[L:T List]. ∀[P:{x:T| (x ∈ L)}  ⟶ 𝔹]. ∀[i:ℕ||remove-first(P;L)||].
  (remove-first(P;L)[i] ~ L[i] supposing ∀j:ℕi + 1. (¬↑(P L[j]))
  ∧ remove-first(P;L)[i] ~ L[i + 1] supposing ∃j:ℕi + 1. (↑(P L[j])))
BY
{ TACTIC:(RepeatFor 3 ((D 0
                        THENA (Auto
                               THEN (Assert ||remove-first(P;L)|| ≤ ||L|| BY
                                           BLemma `length-remove-first-le`)
                               THEN Auto)
                        ))
          THEN ((Assert ||remove-first(P;L)|| ≤ ||L|| BY
                       (BLemma `length-remove-first-le` THEN Auto))
                THEN (D 0 THENA Auto)
                THEN ListInd 2
                THEN Unfold `remove-first` 0
                THEN Reduce 0
                THEN Try (Fold `remove-first` 0)
                THEN (D 0 THENA Auto)
                THEN Try (Complete (Auto))
                THEN (Assert P u ∈ 𝔹 BY
                            Auto)
                THEN (Assert P ∈ {x:T| (x ∈ v)}  ⟶ 𝔹 BY
                            ExtWith [`z'] [{x:T| (x ∈ [u / v])}  ⟶ 𝔹] ⋅
                            THEN Auto)

                THEN (InstHyp [⌜P⌝] (-4)⋅ THENA (Auto THEN BLemma `length-remove-first-le` THEN Auto))

                THEN Thin (-5)
                THEN (AutoSplit THENA Auto)⋅)⋅
          ) }

1
1. T : Type
2. u : T
3. v : T List
4. P : {x:T| (x ∈ [u / v])}  ⟶ 𝔹
5. P u ∈ 𝔹
6. P ∈ {x:T| (x ∈ v)}  ⟶ 𝔹
7. ∀i:ℕ||remove-first(P;v)||
     (remove-first(P;v)[i] ~ v[i] supposing ∀j:ℕi + 1. (¬↑(P v[j]))
     ∧ remove-first(P;v)[i] ~ v[i + 1] supposing ∃j:ℕi + 1. (↑(P v[j])))
8. ↑(P u)
⊢ (||v|| ≤ (||v|| + 1))
⇒ (∀i:ℕ||v||
      (v[i] ~ [u / v][i] supposing ∀j:ℕi + 1. (¬↑(P [u / v][j]))
      ∧ v[i] ~ [u / v][i + 1] supposing ∃j:ℕi + 1. (↑(P [u / v][j]))))

2
1. T : Type
2. u : T
3. v : T List
4. P : {x:T| (x ∈ [u / v])}  ⟶ 𝔹
5. ¬↑(P u)
6. ff ∈ 𝔹
7. P ∈ {x:T| (x ∈ v)}  ⟶ 𝔹
8. ∀i:ℕ||remove-first(P;v)||
     (remove-first(P;v)[i] ~ v[i] supposing ∀j:ℕi + 1. (¬↑(P v[j]))
     ∧ remove-first(P;v)[i] ~ v[i + 1] supposing ∃j:ℕi + 1. (↑(P v[j])))
⊢ ((||remove-first(P;v)|| + 1) ≤ (||v|| + 1))
⇒ (∀i:ℕ||remove-first(P;v)|| + 1
      ([u / remove-first(P;v)][i] ~ [u / v][i] supposing ∀j:ℕi + 1. (¬↑(P [u / v][j]))

      ∧ [u / remove-first(P;v)][i] ~ [u / v][i + 1] supposing ∃j:ℕi + 1. (↑(P [u / v][j]))))

Latex:

Latex:
\mforall{}[T:Type]. \mforall{}[L:T List]. \mforall{}[P:\{x:T| (x \mmember{} L)\} {}\mrightarrow{} \mBbbB{}]. \mforall{}[i:\mBbbN{}||remove-first(P;L)||]. (remove-first(P;L)[i] \msim{} L[i] supposing \mforall{}j:\mBbbN{}i + 1. (\mneg{}\muparrow{}(P L[j])) \mwedge{} remove-first(P;L)[i] \msim{} L[i + 1] supposing \mexists{}j:\mBbbN{}i + 1. (\muparrow{}(P L[j]))) By Latex: TACTIC:(RepeatFor 3 ((D 0 THENA (Auto THEN (Assert ||remove-first(P;L)|| \mleq{} ||L|| BY BLemma `length-remove-first-le`) THEN Auto) )) THEN ((Assert ||remove-first(P;L)|| \mleq{} ||L|| BY (BLemma `length-remove-first-le` THEN Auto)) THEN (D 0 THENA Auto) THEN ListInd 2 THEN Unfold `remove-first` 0 THEN Reduce 0 THEN Try (Fold `remove-first` 0) THEN (D 0 THENA Auto) THEN Try (Complete (Auto)) THEN (Assert P u \mmember{} \mBbbB{} BY Auto) THEN (Assert P \mmember{} \{x:T| (x \mmember{} v)\} {}\mrightarrow{} \mBbbB{} BY ExtWith [`z'] [\{x:T| (x \mmember{} [u / v])\} {}\mrightarrow{} \mBbbB{}] \mcdot{} THEN Auto) THEN (InstHyp [\mkleeneopen{}P\mkleeneclose{}] (-4)\mcdot{} THENA (Auto THEN BLemma `length-remove-first-le` THEN Auto)) THEN Thin (-5) THEN (AutoSplit THENA Auto)\mcdot{})\mcdot{} ) Home Index