{ (RepUR ``rel_star`` 0 THEN Assert ⌜∃n:ℕ. (x if (n =_z 0) then λx,y. (x = y ∈ T) else (R o ((S o R)^n - 1 o S)) fi  y)⌝⋅\000C) }

1
.....assertion.....
1. [T] : Type
2. [R] : T ⟶ T ⟶ ℙ
3. [S] : T ⟶ T ⟶ ℙ
4. ∀n:ℕ. (R o S)^n ⇐⇒ if (n =_z 0) then λx,y. (x = y ∈ T) else (R o ((S o R)^n - 1 o S)) fi
5. x : T
6. y : T
7. x (R o ((S o R)^* o S)) y
⊢ ∃n:ℕ. (x if (n =_z 0) then λx,y. (x = y ∈ T) else (R o ((S o R)^n - 1 o S)) fi y)

2
1. [T] : Type
2. [R] : T ⟶ T ⟶ ℙ
3. [S] : T ⟶ T ⟶ ℙ
4. ∀n:ℕ. (R o S)^n ⇐⇒ if (n =_z 0) then λx,y. (x = y ∈ T) else (R o ((S o R)^n - 1 o S)) fi
5. x : T
6. y : T
7. x (R o ((S o R)^* o S)) y
8. ∃n:ℕ. (x if (n =_z 0) then λx,y. (x = y ∈ T) else (R o ((S o R)^n - 1 o S)) fi y)
⊢ ∃n:ℕ. (x (R o S)^n y)

Latex:

Latex:
1. [T] : Type 2. [R] : T {}\mrightarrow{} T {}\mrightarrow{} \mBbbP{} 3. [S] : T {}\mrightarrow{} T {}\mrightarrow{} \mBbbP{} 4. \mforall{}n:\mBbbN{} (R o S)\^{}n \mLeftarrow{}{}\mRightarrow{} if (n =\msubz{} 0) then \mlambda{}x,y. (x = y) else (R o ((S o R)\^{}n - 1 o S)) fi 5. x : T 6. y : T 7. x (R o (rel\_star(T; (S o R)) o S)) y \mvdash{} rel\_star(T; (R o S)) x y By Latex: (RepUR ``rel\_star`` 0 THEN Assert \mkleeneopen{}\mexists{}n:\mBbbN{}. (x if (n =\msubz{} 0) then \mlambda{}x,y. (x = y) else (R o ((S o R)\^{}n - 1 o S)) fi y)\mkleeneclose{}\mcdot{} ) Home Index