Step
*
1
1
of Lemma
bm_compare_connex_le
.....assertion.....
1. K : Type
2. compare : K ─→ K ─→ ℤ@i
3. Trans(K;x,y.0 ≤ (compare x y))@i
4. AntiSym(K;x,y.0 ≤ (compare x y))@i
5. Connex(K;x,y.0 ≤ (compare x y))@i
6. Refl(K;x,y.(compare x y) = 0 ∈ ℤ)@i
7. Sym(K;x,y.(compare x y) = 0 ∈ ℤ)@i
8. k1 : K@i
9. k2 : K@i
10. ¬(0 ≤ (compare k1 k2))
⊢ (0 ≤ (compare k2 k1)) ∨ (0 ≤ (compare k1 k2))
BY
{ BackThruSomeHyp' }
Latex:
.....assertion.....
1. K : Type
2. compare : K {}\mrightarrow{} K {}\mrightarrow{} \mBbbZ{}@i
3. Trans(K;x,y.0 \mleq{} (compare x y))@i
4. AntiSym(K;x,y.0 \mleq{} (compare x y))@i
5. Connex(K;x,y.0 \mleq{} (compare x y))@i
6. Refl(K;x,y.(compare x y) = 0)@i
7. Sym(K;x,y.(compare x y) = 0)@i
8. k1 : K@i
9. k2 : K@i
10. \mneg{}(0 \mleq{} (compare k1 k2))
\mvdash{} (0 \mleq{} (compare k2 k1)) \mvee{} (0 \mleq{} (compare k1 k2))
By
BackThruSomeHyp'
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