Proof of Nuprl Lemma : iseg_append

Step * 2 of Lemma iseg_append_iff

1. [T] : Type
2. u : T
3. v : T List
4. ∀l2,l3:T List. (v ≤ l2 @ l3 ⇐⇒ v ≤ l2 ∨ (∃l:T List. (0 < ||l|| ∧ (v = (l2 @ l) ∈ (T List)) ∧ l ≤ l3)))
⊢ ∀l2,l3:T List.
([u / v] ≤ l2 @ l3 ⇐⇒

 [u / v] ≤ l2 ∨ (∃l:T List. (0 < ||l|| ∧ ([u / v] = (l2 @ l) ∈ (T List)) ∧ l ≤ l3)))

BY
{ InductionOnList }

1
1. [T] : Type
2. u : T
3. v : T List
4. ∀l2,l3:T List. (v ≤ l2 @ l3 ⇐⇒ v ≤ l2 ∨ (∃l:T List. (0 < ||l|| ∧ (v = (l2 @ l) ∈ (T List)) ∧ l ≤ l3)))
⊢ ∀l3:T List. ([u / v] ≤ [] @ l3 ⇐⇒

 [u / v] ≤ [] ∨ (∃l:T List. (0 < ||l|| ∧ ([u / v] = ([] @ l) ∈ (T List)) ∧ l ≤ l3)))

2
1. [T] : Type
2. u : T
3. v : T List
4. ∀l2,l3:T List. (v ≤ l2 @ l3 ⇐⇒ v ≤ l2 ∨ (∃l:T List. (0 < ||l|| ∧ (v = (l2 @ l) ∈ (T List)) ∧ l ≤ l3)))
5. u1 : T
6. v1 : T List
7. ∀l3:T List
([u / v] ≤ v1 @ l3 ⇐⇒

 [u / v] ≤ v1 ∨ (∃l:T List. (0 < ||l|| ∧ ([u / v] = (v1 @ l) ∈ (T List)) ∧ l ≤ l3)))

⊢ ∀l3:T List
([u / v] ≤ [u1 / v1] @ l3
⇐⇒

 [u / v] ≤ [u1 / v1] ∨ (∃l:T List. (0 < ||l|| ∧ ([u / v] = ([u1 / v1] @ l) ∈ (T List)) ∧ l ≤ l3)))

Latex:

Latex:
1. [T] : Type 2. u : T 3. v : T List 4. \mforall{}l2,l3:T List. (v \mleq{} l2 @ l3 \mLeftarrow{}{}\mRightarrow{} v \mleq{} l2 \mvee{} (\mexists{}l:T List. (0 < ||l|| \mwedge{} (v = (l2 @ l)) \mwedge{} l \mleq{} l3))) \mvdash{} \mforall{}l2,l3:T List. ([u / v] \mleq{} l2 @ l3 \mLeftarrow{}{}\mRightarrow{} [u / v] \mleq{} l2 \mvee{} (\mexists{}l:T List. (0 < ||l|| \mwedge{} ([u / v] = (l2 @ l)) \mwedge{} l \mleq{} l3))) By Latex: InductionOnList Home Index