Nuprl - Some Definitions

IF YOU CAN SEE THIS go to /sfa/Nuprl/Shared/Xindentation_hack_doc.html

	Some definitions of interest.

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

	Thm* i,j:. (i=j)

eqfun_p	Def IsEqFun(T;eq) == x,y:T. (x eq y) x = y

	Thm* T:Type, eq:(TT). IsEqFun(T;eq) Prop

injection_type	Def A inj B == {f:(AB)\| Inj(A; B; f) }

	Thm* A,B:Type. A inj B Type

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

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

least	Def least i:. p(i) == if p(0) 0 else (least i:. p(i+1))+1 fi (recursive)

	Thm* k:, p:{p:(k)\| i:k. p(i) }. (least i:. p(i)) k

	Thm* p:{p:()\| i:. p(i) }. (least i:. p(i))

nat	Def == {i:\| 0i }

	Thm* Type

so_lambda2	Def (1,2. b(1;2))(1,2) == b(1;2)

surjection_type	Def A onto B == {f:(AB)\| Surj(A; B; f) }

	Thm* A,B:Type. A onto B Type

About:

IF YOU CAN SEE THIS go to /sfa/Nuprl/Shared/Xindentation_hack_doc.html