Nuprl Lemma : lnk-decl-dom2

∀[l,l2:IdLnk]. ∀[dt:tg:Id fp-> Type]. ∀[tg:Id].  l2 = l ∈ IdLnk supposing ↑rcv(l2,tg) ∈ dom(lnk-decl(l;dt))

Proof

Definitions occuring in Statement : lnk-decl: lnk-decl(l;dt), fpf-dom: x ∈ dom(f), fpf: a:A fp-> B[a], Kind-deq: KindDeq, rcv: rcv(l,tg), IdLnk: IdLnk, Id: Id, assert: ↑b, uimplies: b supposing a, uall: ∀[x:A]. B[x], universe: Type, equal: s = t ∈ T
Lemmas : assert-deq-member, Knd_wf, Kind-deq_wf, map_wf, rcv_wf, member_map, rcv_one_one, assert_wf, fpf-dom_wf, lnk-decl_wf-hasloc, subtype-fpf3, hasloc_wf, ldst_wf, top_wf, strong-subtype-set2, subtype_top, set_wf, Id_wf, fpf_wf, IdLnk_wf
\mforall{}[l,l2:IdLnk]. \mforall{}[dt:tg:Id fp-> Type]. \mforall{}[tg:Id]. l2 = l supposing \muparrow{}rcv(l2,tg) \mmember{} dom(lnk-decl(l;dt)) Date html generated: 2015_07_17-AM-11_15_45 Last ObjectModification: 2015_01_28-AM-07_38_37 Home Index