Proof of Nuprl Lemma : real-closed-interval-lattice

Step * 2 1 of Lemma real-closed-interval-lattice_wf

1. a : ℝ
2. b : ℝ
3. a ≤ b
4. EquivRel({r:ℝ| (a ≤ r) ∧ (r ≤ b)} ;x,y.x = y)
5. ∀[a1,b:{r:ℝ| (a ≤ r) ∧ (r ≤ b)} ].  (rmin(a1;b) = rmin(b;a1))
6. ∀[a1,b:{r:ℝ| (a ≤ r) ∧ (r ≤ b)} ].  (rmax(a1;b) = rmax(b;a1))
7. ∀[a1,b1,c:{r:ℝ| (a ≤ r) ∧ (r ≤ b)} ].  (rmin(a1;rmin(b1;c)) = rmin(rmin(a1;b1);c))
8. ∀[a1,b1,c:{r:ℝ| (a ≤ r) ∧ (r ≤ b)} ].  (rmax(a1;rmax(b1;c)) = rmax(rmax(a1;b1);c))
9. ∀[a1,b:{r:ℝ| (a ≤ r) ∧ (r ≤ b)} ].  (rmax(a1;rmin(a1;b)) = a1)
10. ∀[a1,b:{r:ℝ| (a ≤ r) ∧ (r ≤ b)} ].  (rmin(a1;rmax(a1;b)) = a1)
11. a1 : ℝ
12. a ≤ a1
13. a1 ≤ b
⊢ rmin(a1;b) = a1
BY
{ (BLemma `rmin-req2` THEN Auto) }

Latex:

Latex:
1. a : \mBbbR{} 2. b : \mBbbR{} 3. a \mleq{} b 4. EquivRel(\{r:\mBbbR{}| (a \mleq{} r) \mwedge{} (r \mleq{} b)\} ;x,y.x = y) 5. \mforall{}[a1,b:\{r:\mBbbR{}| (a \mleq{} r) \mwedge{} (r \mleq{} b)\} ]. (rmin(a1;b) = rmin(b;a1)) 6. \mforall{}[a1,b:\{r:\mBbbR{}| (a \mleq{} r) \mwedge{} (r \mleq{} b)\} ]. (rmax(a1;b) = rmax(b;a1)) 7. \mforall{}[a1,b1,c:\{r:\mBbbR{}| (a \mleq{} r) \mwedge{} (r \mleq{} b)\} ]. (rmin(a1;rmin(b1;c)) = rmin(rmin(a1;b1);c)) 8. \mforall{}[a1,b1,c:\{r:\mBbbR{}| (a \mleq{} r) \mwedge{} (r \mleq{} b)\} ]. (rmax(a1;rmax(b1;c)) = rmax(rmax(a1;b1);c)) 9. \mforall{}[a1,b:\{r:\mBbbR{}| (a \mleq{} r) \mwedge{} (r \mleq{} b)\} ]. (rmax(a1;rmin(a1;b)) = a1) 10. \mforall{}[a1,b:\{r:\mBbbR{}| (a \mleq{} r) \mwedge{} (r \mleq{} b)\} ]. (rmin(a1;rmax(a1;b)) = a1) 11. a1 : \mBbbR{} 12. a \mleq{} a1 13. a1 \mleq{} b \mvdash{} rmin(a1;b) = a1 By Latex: (BLemma `rmin-req2` THEN Auto) Home Index