Thms exponent Sections AutomataTheory Doc

geom_series Def (qn) == if n=0 0 else (qn-1)+(qn-1) fi (recursive)

Thm* q,n:. (qn)

exp Def (basepower) == if power=0 1 else base(basepower-1) fi (recursive)

Thm* n,k:. (nk)

Thm* n,k:. (nk)

nat Def == {i:| 0i }

Thm* Type

le Def AB == B < A

Thm* i,j:. ij Prop

nat_plus Def == {i:| 0 < i }

Thm* Type

eq_int Def i=j == if i=j true ; false fi

Thm* i,j:. i=j

not Def A == A False

Thm* A:Prop. (A) Prop

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!abstractionimpliesfalseallpropmemberint_eq
btruebfalseintboolsetless_thannatural_number
universerecursive_def_noticeifthenelsemultiplysubtractadd