Step
*
1
1
1
1
2
of Lemma
path-comp-fun
1. T : Type
2. B : SeparationSpace
3. ∀f,g:Point(Path(B)). (f@r1 ≡ g@r0 ⇒ (∃h:Point(Path(B)). path-comp-rel(B;f;g;h)))
4. f : Point(Path(T ⟶ B))
5. g : Point(Path(T ⟶ B))
6. f@r1 ≡ g@r0
7. ∀x:T. (λt.(f t x) ∈ Point(Path(B)))
8. ∀x:T. (λt.(g t x) ∈ Point(Path(B)))
9. ∀x:T. ∃h:Point(Path(B)). path-comp-rel(B;λt.(f t x);λt.(g t x);h)
10. H : x:T ⟶ Point(Path(B))
11. ∀x:T. path-comp-rel(B;λt.(f t x);λt.(g t x);H x)
12. λt,x. (H x t) ∈ Point(Path(T ⟶ B))
13. [r0, (r1/r(2))] ⊆ [r0, r1]
14. [(r1/r(2)), r1] ⊆ [r0, r1]
15. t : {x:ℝ| x ∈ [(r1/r(2)), r1]}
⊢ (r(2) * t) - r1 ∈ {t:ℝ| (r0 ≤ t) ∧ (t ≤ r1)}
BY
{ (DSetVars THEN All Reduce THEN MemTypeCD THEN Auto) }
1
1. T : Type
2. B : SeparationSpace
3. ∀f,g:Point(Path(B)). (f@r1 ≡ g@r0 ⇒ (∃h:Point(Path(B)). path-comp-rel(B;f;g;h)))
4. f : Point(Path(T ⟶ B))
5. g : Point(Path(T ⟶ B))
6. f@r1 ≡ g@r0
7. ∀x:T. (λt.(f t x) ∈ Point(Path(B)))
8. ∀x:T. (λt.(g t x) ∈ Point(Path(B)))
9. ∀x:T. ∃h:Point(Path(B)). path-comp-rel(B;λt.(f t x);λt.(g t x);h)
10. H : x:T ⟶ Point(Path(B))
11. ∀x:T. path-comp-rel(B;λt.(f t x);λt.(g t x);H x)
12. λt,x. (H x t) ∈ Point(Path(T ⟶ B))
13. [r0, (r1/r(2))] ⊆ [r0, r1]
14. [(r1/r(2)), r1] ⊆ [r0, r1]
15. t : ℝ
16. r1 ≤ (r(2) * t)
17. t ≤ r1
18. r0 ≤ ((r(2) * t) - r1)
⊢ ((r(2) * t) - r1) ≤ r1
Latex:
Latex:
1. T : Type
2. B : SeparationSpace
3. \mforall{}f,g:Point(Path(B)). (f@r1 \mequiv{} g@r0 {}\mRightarrow{} (\mexists{}h:Point(Path(B)). path-comp-rel(B;f;g;h)))
4. f : Point(Path(T {}\mrightarrow{} B))
5. g : Point(Path(T {}\mrightarrow{} B))
6. f@r1 \mequiv{} g@r0
7. \mforall{}x:T. (\mlambda{}t.(f t x) \mmember{} Point(Path(B)))
8. \mforall{}x:T. (\mlambda{}t.(g t x) \mmember{} Point(Path(B)))
9. \mforall{}x:T. \mexists{}h:Point(Path(B)). path-comp-rel(B;\mlambda{}t.(f t x);\mlambda{}t.(g t x);h)
10. H : x:T {}\mrightarrow{} Point(Path(B))
11. \mforall{}x:T. path-comp-rel(B;\mlambda{}t.(f t x);\mlambda{}t.(g t x);H x)
12. \mlambda{}t,x. (H x t) \mmember{} Point(Path(T {}\mrightarrow{} B))
13. [r0, (r1/r(2))] \msubseteq{} [r0, r1]
14. [(r1/r(2)), r1] \msubseteq{} [r0, r1]
15. t : \{x:\mBbbR{}| x \mmember{} [(r1/r(2)), r1]\}
\mvdash{} (r(2) * t) - r1 \mmember{} \{t:\mBbbR{}| (r0 \mleq{} t) \mwedge{} (t \mleq{} r1)\}
By
Latex:
(DSetVars THEN All Reduce THEN MemTypeCD THEN Auto)
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