Thms det automata Sections AutomataTheory Doc

automata Def Automata(Alph;States) == (StatesAlphStates)States(States)

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

compute_list Def Result(DA)l == if null(l) InitialState(DA) else DA((Result(DA)tl(l)),hd(l)) fi (recursive)

Thm* Alph,St:Type, A:Automata(Alph;St), l:Alph*. (Result(A)l) St

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

Thm* T:Type. Fin(T) Prop

iff Def P Q == (P Q) & (P Q)

Thm* A,B:Prop. (A B) Prop

mem_f Def mem_f(T;a;bs) == Case of bs; nil False ; b.bs' b = a T mem_f(T;a;bs') (recursive)

Thm* T:Type, a:T, bs:T*. mem_f(T;a;bs) Prop

hd Def hd(l) == Case of l; nil "?" ; h.t h

Thm* A:Type, l:A*. ||l||1 hd(l) A

tl Def tl(l) == Case of l; nil nil ; h.t t

Thm* A:Type, l:A*. tl(l) A*

DA_act Def a == 1of(a)

Thm* Alph,States:Type, a:Automata(Alph;States). a StatesAlphStates

DA_init Def InitialState(a) == 1of(2of(a))

Thm* Alph,States:Type, a:Automata(Alph;States). InitialState(a) States

null Def null(as) == Case of as; nil true ; a.as' false

Thm* T:Type, as:T*. null(as)

Thm* null(nil)

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

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

biject Def Bij(A; B; f) == Inj(A; B; f) & Surj(A; B; f)

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

nat Def == {i:| 0i }

Thm* Type

rev_implies Def P Q == Q P

Thm* A,B:Prop. (A B) Prop

pi1 Def 1of(t) == t.1

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

pi2 Def 2of(t) == t.2

Thm* A:Type, B:(AType), p:a:AB(a). 2of(p) B(1of(p))

lelt Def i j < k == ij & j < k

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

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

inject 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

le Def AB == B < A

Thm* i,j:. ij Prop

not Def A == A False

Thm* A:Prop. (A) Prop

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