Nuprl - Some Definitions

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	Some definitions of interest.

hall	Def all == p:'a. x:'a. (p(x))

	Thm* 'a:S. all (('a hbool) hbool)

assert	Def b == if b True else False fi

	Thm* b:. b Prop

hequal	Def equal == x:'a. y:'a. x = y

	Thm* 'a:S. equal ('a 'a hbool)

himplies	Def implies == p:. q:. pq

	Thm* implies (hbool hbool hbool)

hnum	Def hnum ==

	Thm* hnum S

hsuc	Def suc == n:. n+1

	Thm* suc (hnum hnum)

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

	Thm* Type

	Thm* S

tlambda	Def (x:T. b(x))(x) == b(x)

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