Def n == 1of(n)

Thm* Alph,States:Type, n:NDA(Alph;States). n StatesAlphStatesProp

Def Dec(P) == P P

Thm* A:Prop. Dec(A) Prop

Def Fin(s) == n:, f:(ns). Bij(n; s; f)

Thm* T:Type. Fin(T) Prop

Def NDA(Alph;States) == (StatesAlphStatesProp)States(States)

Thm* Alph,States:Type{i}. nd_automata{i}(Alph;States) Type{i'}

Thm* A:Type, B:(AType), p:a:AB(a). 1of(p) A

Def {i..j} == {k:| i k < j }

Thm* m,n:. {m..n} Type

Def == {i:| 0i }

Thm* Type

Def AB == B < A

Thm* i,j:. ij Prop

Def A == A False

Thm* A:Prop. (A) Prop

Thm* A,B:Type, f:(AB). Bij(A; B; f) Prop

Def Surj(A; B; f) == b:B. a:A. f(a) = b

Thm* A,B:Type, f:(AB). Surj(A; B; f) Prop

Def Inj(A; B; f) == a1,a2:A. f(a1) = f(a2) B a1 = a2

Thm* A,B:Type, f:(AB). Inj(A; B; f) Prop