NULL_SET_OF

Entry	Value
Name	NULL_SET_OF_LIST
Conclusion	!l. set_of_list l = {} <=> NULL l
Constructive Proof	No
Axiom	!t. t \/ ~t (\a. a = (\b. (\c. c) = (\c. c))) (\d. (\e. d e) = d)
Classical Lemmas	!x s. ~(x INSERT s = {}) !t. ~ ~t <=> t !t. (t <=> T) \/ (t <=> F) !p. (?x. ~p x) <=> ~(!x. p x) !p. ~(!x. p x) <=> (?x. ~p x) !p. ~(?x. p x) <=> (!x. ~p x)
Constructive Lemmas	T !x y s. x IN y INSERT s <=> x = y \/ x IN s !x y. x = y <=> y = x !x y. x = y ==> y = x !h t. ~NULL (CONS h t) !h t. set_of_list (CONS h t) = h INSERT set_of_list t !x s. ~(x INSERT s = {}) !x s. x INSERT s = {y \| y = x \/ y IN s} !x. ~(x IN {}) !x. x = x !p1 p2 q1 q2. (p1 ==> p2) /\ (q1 ==> q2) ==> p1 /\ q1 ==> p2 /\ q2 !p1 p2 q1 q2. (p1 ==> p2) /\ (q1 ==> q2) ==> p1 \/ q1 ==> p2 \/ q2 !t. (!x. t) <=> t !t. ~ ~t <=> t !t. (F <=> t) <=> ~t !t. (T <=> t) <=> t !t. (t <=> F) <=> ~t !t. (t <=> T) <=> t !t. F ==> t <=> T !t. T ==> t <=> t !t. t ==> F <=> ~t !t. t ==> T <=> T !t. F \/ t <=> t !t. T \/ t <=> T !t. t \/ F <=> t !t. t \/ T <=> T !t. t \/ t <=> t !t. t ==> t !t. (t <=> T) \/ (t <=> F) !f y. (\x. f x) y = f y !f g. (!x. f x = g x) <=> f = g !f g. (!x. f x = g x) ==> f = g !t. (\x. t x) = t !p a. (?x. a = x /\ p x) <=> p a !p x. x IN GSPEC p <=> p x !p x. x IN {y \| p y} <=> p x !p q. (!x. p x ==> q x) ==> (?x. p x) ==> (?x. q x) !p. (?x. ~p x) <=> ~(!x. p x) !p. ~(!x. p x) <=> (?x. ~p x) !p. ~(?x. p x) <=> (!x. ~p x) !p. p [] /\ (!h t. p t ==> p (CONS h t)) ==> (!l. p l) !s t. (!x. x IN s <=> x IN t) <=> s = t !s t. (!x. x IN s <=> x IN t) ==> s = t NULL [] F <=> (!p. p) T <=> (\p. p) = (\p. p) ~F <=> T ~T <=> F (~) = (\p. p ==> F) (/\) = (\p q. (\f. f p q) = (\f. f T T)) (==>) = (\p q. p /\ q <=> p) (\/) = (\p q. !r. (p ==> r) ==> (q ==> r) ==> r) (!) = (\p. p = (\x. T)) (?) = (\p. !q. (!x. p x ==> q) ==> q) {} = {x \| F} set_of_list [] = {}
Contained Package	list-set-thm
Comment	Standard HOL library retrieved from OpenTheory

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