const bij : set set (set set) prop term equip = \x:set.\y:set.?f:set set.bij x y f const In : set set prop term iIn = In infix iIn 2000 2000 term PNoEq_ = \x:set.\p:set prop.\q:set prop.!y:set.y iIn x -> (p y <-> q y) term nIn = \x:set.\y:set.~ x iIn y term SNoEq_ = \x:set.\y:set.\z:set.PNoEq_ x (\w:set.w iIn y) \w:set.w iIn z const nat_p : set prop const ordinal : set prop axiom nat_p_ordinal: !x:set.nat_p x -> ordinal x const Sep : set (set prop) set const SNoS_ : set set const omega : set const SNoLev : set set const exp_SNo_nat : set set set const ordsucc : set set const Empty : set const SNo : set prop const add_SNo : set set set term + = add_SNo infix + 2281 2280 lemma !x:set.nat_p x -> equip (Sep (SNoS_ omega) \y:set.SNoLev y = x) (exp_SNo_nat (ordsucc (ordsucc Empty)) x) -> nat_p (exp_SNo_nat (ordsucc (ordsucc Empty)) x) -> ordinal (exp_SNo_nat (ordsucc (ordsucc Empty)) x) -> SNo (exp_SNo_nat (ordsucc (ordsucc Empty)) x) -> nat_p (exp_SNo_nat (ordsucc (ordsucc Empty)) x + exp_SNo_nat (ordsucc (ordsucc Empty)) x) -> ordinal (exp_SNo_nat (ordsucc (ordsucc Empty)) x + exp_SNo_nat (ordsucc (ordsucc Empty)) x) -> equip (Sep (SNoS_ omega) \y:set.SNoLev y = ordsucc x) (exp_SNo_nat (ordsucc (ordsucc Empty)) x + exp_SNo_nat (ordsucc (ordsucc Empty)) x) var x:set hyp nat_p x hyp equip (Sep (SNoS_ omega) \y:set.SNoLev y = x) (exp_SNo_nat (ordsucc (ordsucc Empty)) x) hyp nat_p (exp_SNo_nat (ordsucc (ordsucc Empty)) x) hyp ordinal (exp_SNo_nat (ordsucc (ordsucc Empty)) x) hyp SNo (exp_SNo_nat (ordsucc (ordsucc Empty)) x) claim nat_p (exp_SNo_nat (ordsucc (ordsucc Empty)) x + exp_SNo_nat (ordsucc (ordsucc Empty)) x) -> equip (Sep (SNoS_ omega) \y:set.SNoLev y = ordsucc x) (exp_SNo_nat (ordsucc (ordsucc Empty)) x + exp_SNo_nat (ordsucc (ordsucc Empty)) x)