Proof of Nuprl Lemma : es-hist-is-concat

Step * 2 of Lemma es-hist-is-concat

1. [Info] : Type
2. es : EO+(Info)@i'
3. LL : Info List@i
4. L1 : Info List List@i
5. ∀e1,e2:E.
     ∀L:Info List
       (∃f:ℕ||L1|| + 1 ─→ E
         ((((f 0) = e1 ∈ E) ∧ f ||L1|| ≤loc e2 )
         c∧ (∀i:ℕ||L1||. (f i <loc f (i + 1)))
         c∧ ((∀i:ℕ||L1||. (es-hist(es;f i;pred(f (i + 1))) = L1[i] ∈ (Info List)))
            ∧ (es-hist(es;f ||L1||;e2) = L ∈ (Info List))))) supposing
          ((es-hist(es;e1;e2) = (concat(L1) @ L) ∈ (Info List)) and
          (¬(L = [] ∈ (Info List))) and
          (∀L∈L1.¬(L = [] ∈ (Info List))))
     supposing loc(e1) = loc(e2) ∈ Id@i
⊢ ∀e1,e2:E.
    ∀L:Info List
      (∃f:ℕ||[LL / L1]|| + 1 ─→ E
        ((((f 0) = e1 ∈ E) ∧ f ||[LL / L1]|| ≤loc e2 )
        c∧ (∀i:ℕ||[LL / L1]||. (f i <loc f (i + 1)))

        c∧ ((∀i:ℕ||[LL / L1]||. (es-hist(es;f i;pred(f (i + 1))) = [LL / L1][i] ∈ (Info List)))

           ∧ (es-hist(es;f ||[LL / L1]||;e2) = L ∈ (Info List))))) supposing
         ((es-hist(es;e1;e2) = (concat([LL / L1]) @ L) ∈ (Info List)) and
         (¬(L = [] ∈ (Info List))) and
         (∀L∈[LL / L1].¬(L = [] ∈ (Info List))))
    supposing loc(e1) = loc(e2) ∈ Id
BY
{ Auto }

1
1. [Info] : Type
2. es : EO+(Info)@i'
3. LL : Info List@i
4. L1 : Info List List@i
5. ∀e1,e2:E.
     ∀L:Info List
       (∃f:ℕ||L1|| + 1 ─→ E
         ((((f 0) = e1 ∈ E) ∧ f ||L1|| ≤loc e2 )
         c∧ (∀i:ℕ||L1||. (f i <loc f (i + 1)))
         c∧ ((∀i:ℕ||L1||. (es-hist(es;f i;pred(f (i + 1))) = L1[i] ∈ (Info List)))
            ∧ (es-hist(es;f ||L1||;e2) = L ∈ (Info List))))) supposing
          ((es-hist(es;e1;e2) = (concat(L1) @ L) ∈ (Info List)) and
          (¬(L = [] ∈ (Info List))) and
          (∀L∈L1.¬(L = [] ∈ (Info List))))
     supposing loc(e1) = loc(e2) ∈ Id@i
6. e1 : E@i
7. e2 : E@i
8. loc(e1) = loc(e2) ∈ Id
9. L : Info List@i
10. (∀L∈[LL / L1].¬(L = [] ∈ (Info List)))
11. ¬(L = [] ∈ (Info List))
12. es-hist(es;e1;e2) = (concat([LL / L1]) @ L) ∈ (Info List)
⊢ ∃f:ℕ||[LL / L1]|| + 1 ─→ E
   ((((f 0) = e1 ∈ E) ∧ f ||[LL / L1]|| ≤loc e2 )
   c∧ (∀i:ℕ||[LL / L1]||. (f i <loc f (i + 1)))
   c∧ ((∀i:ℕ||[LL / L1]||. (es-hist(es;f i;pred(f (i + 1))) = [LL / L1][i] ∈ (Info List)))
      ∧ (es-hist(es;f ||[LL / L1]||;e2) = L ∈ (Info List))))

Latex:

1. [Info] : Type 2. es : EO+(Info)@i' 3. LL : Info List@i 4. L1 : Info List List@i 5. \mforall{}e1,e2:E. \mforall{}L:Info List (\mexists{}f:\mBbbN{}||L1|| + 1 {}\mrightarrow{} E ((((f 0) = e1) \mwedge{} f ||L1|| \mleq{}loc e2 ) c\mwedge{} (\mforall{}i:\mBbbN{}||L1||. (f i <loc f (i + 1))) c\mwedge{} ((\mforall{}i:\mBbbN{}||L1||. (es-hist(es;f i;pred(f (i + 1))) = L1[i])) \mwedge{} (es-hist(es;f ||L1||;e2) = L)))) supposing ((es-hist(es;e1;e2) = (concat(L1) @ L)) and (\mneg{}(L = [])) and (\mforall{}L\mmember{}L1.\mneg{}(L = []))) supposing loc(e1) = loc(e2)@i \mvdash{} \mforall{}e1,e2:E. \mforall{}L:Info List (\mexists{}f:\mBbbN{}||[LL / L1]|| + 1 {}\mrightarrow{} E ((((f 0) = e1) \mwedge{} f ||[LL / L1]|| \mleq{}loc e2 ) c\mwedge{} (\mforall{}i:\mBbbN{}||[LL / L1]||. (f i <loc f (i + 1))) c\mwedge{} ((\mforall{}i:\mBbbN{}||[LL / L1]||. (es-hist(es;f i;pred(f (i + 1))) = [LL / L1][i])) \mwedge{} (es-hist(es;f ||[LL / L1]||;e2) = L)))) supposing ((es-hist(es;e1;e2) = (concat([LL / L1]) @ L)) and (\mneg{}(L = [])) and (\mforall{}L\mmember{}[LL / L1].\mneg{}(L = []))) supposing loc(e1) = loc(e2) By Auto Home Index