Step
*
1
1
1
of Lemma
lattice-hom-fset-join
1. l1 : BoundedLattice
2. l2 : BoundedLattice
3. eq1 : EqDecider(Point(l1))
4. eq2 : EqDecider(Point(l2))
5. f : Hom(l1;l2)
6. s : Base
7. s1 : Base
8. s = s1 ∈ (x,y:Point(l1) List//set-equal(Point(l1);x;y))
9. s ∈ Point(l1) List
10. s1 ∈ Point(l1) List
11. set-equal(Point(l1);s;s1)
⊢ (f \/(s)) = \/(f"(s)) ∈ Point(l2)
BY
{ ((GenConcl ⌜s = L ∈ (Point(l1) List)⌝⋅ THENA Auto) THEN All Thin) }
1
1. l1 : BoundedLattice
2. l2 : BoundedLattice
3. eq1 : EqDecider(Point(l1))
4. eq2 : EqDecider(Point(l2))
5. f : Hom(l1;l2)
6. L : Point(l1) List
⊢ (f \/(L)) = \/(f"(L)) ∈ Point(l2)
Latex:
Latex:
1. l1 : BoundedLattice
2. l2 : BoundedLattice
3. eq1 : EqDecider(Point(l1))
4. eq2 : EqDecider(Point(l2))
5. f : Hom(l1;l2)
6. s : Base
7. s1 : Base
8. s = s1
9. s \mmember{} Point(l1) List
10. s1 \mmember{} Point(l1) List
11. set-equal(Point(l1);s;s1)
\mvdash{} (f \mbackslash{}/(s)) = \mbackslash{}/(f"(s))
By
Latex:
((GenConcl \mkleeneopen{}s = L\mkleeneclose{}\mcdot{} THENA Auto) THEN All Thin)
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