Step * of Lemma fl-morph-face-lattice0

[J,I:fset(ℕ)]. ∀[f:J ⟶ I]. ∀[x:names(I)].  (((x=0))<f> dM-to-FL(J;¬(f x)) ∈ Point(face_lattice(J)))
BY
(Auto
   THEN RepUR ``fl-morph`` 0
   THEN (GenConclTerm ⌜fl-lift(names(I);NamesDeq;face_lattice(J);face_lattice-deq();λj.dM-to-FL(J;¬(f j));
                               λj.dM-to-FL(J;f j))⌝⋅
         THENA Auto
         )) }

1
1. fset(ℕ)
2. fset(ℕ)
3. J ⟶ I
4. names(I)
5. {g:Hom(face-lattice(names(I);NamesDeq);face_lattice(J))| 
        ∀x:names(I)
          (((g (x=0)) ((λj.dM-to-FL(J;¬(f j))) x) ∈ Point(face_lattice(J)))
          ∧ ((g (x=1)) ((λj.dM-to-FL(J;f j)) x) ∈ Point(face_lattice(J))))} 
6. fl-lift(names(I);NamesDeq;face_lattice(J);face_lattice-deq();λj.dM-to-FL(J;¬(f j));λj.dM-to-FL(J;f j))
v
∈ {g:Hom(face-lattice(names(I);NamesDeq);face_lattice(J))| 
   ∀x:names(I)
     (((g (x=0)) ((λj.dM-to-FL(J;¬(f j))) x) ∈ Point(face_lattice(J)))
     ∧ ((g (x=1)) ((λj.dM-to-FL(J;f j)) x) ∈ Point(face_lattice(J))))} 
⊢ (v (x=0)) dM-to-FL(J;¬(f x)) ∈ Point(face_lattice(J))


Latex:


Latex:
\mforall{}[J,I:fset(\mBbbN{})].  \mforall{}[f:J  {}\mrightarrow{}  I].  \mforall{}[x:names(I)].    (((x=0))<f>  =  dM-to-FL(J;\mneg{}(f  x)))


By


Latex:
(Auto
  THEN  RepUR  ``fl-morph``  0
  THEN  (GenConclTerm  \mkleeneopen{}fl-lift(names(I);NamesDeq;face\_lattice(J);face\_lattice-deq();
                                                          \mlambda{}j.dM-to-FL(J;\mneg{}(f  j));\mlambda{}j.dM-to-FL(J;f  j))\mkleeneclose{}\mcdot{}
              THENA  Auto
              ))




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