{ [Info:Type]. [es:EO+(Info)]. [T:Type]. [X:EClass(T  )]. [e:E].
    uiff(e  Tagged_tt(X);(e  X)  ((snd(X(e))))) }

{ Proof }


Definitions occuring in Statement :  es-tagged-true-class: Tagged_tt(X) eclass-val: X(e) in-eclass: e  X eclass: EClass(A[eo; e]) event-ordering+: EO+(Info) es-E: E assert: b bool: uiff: uiff(P;Q) uall: [x:A]. B[x] pi2: snd(t) and: P  Q product: x:A  B[x] universe: Type
Definitions :  intensional-universe: IType tag-by: zT fset: FSet{T} dataflow: dataflow(A;B) isect2: T1  T2 b-union: A  B list: type List fpf-cap: f(x)?z record: record(x.T[x]) is_list_splitting: is_list_splitting(T;L;LL;L2;f) is_accum_splitting: is_accum_splitting(T;A;L;LL;L2;f;g;x) req: x = y rnonneg: rnonneg(r) rleq: x  y i-member: r  I partitions: partitions(I;p) modulus-of-ccontinuity: modulus-of-ccontinuity(omega;I;f) fpf-sub: f  g squash: T sq_stable: SqStable(P) cand: A c B cond-class: [X?Y] so_apply: x[s] union: left + right or: P  Q guard: {T} eq_knd: a = b l_member: (x  l) fpf-dom: x  dom(f) es-E-interface: E(X) fpf: a:A fp-B[a] so_lambda: x.t[x] eclass-val: X(e) pi2: snd(t) strong-subtype: strong-subtype(A;B) set: {x:A| B[x]}  le: A  B ge: i  j  not: A less_than: a < b es-tagged-true-class: Tagged_tt(X) in-eclass: e  X rev_implies: P  Q iff: P  Q implies: P  Q prop: pair: <a, b> void: Void false: False true: True decide: case b of inl(x) =s[x] | inr(y) =t[y] assert: b uimplies: b supposing a and: P  Q uiff: uiff(P;Q) bag: bag(T) subtype: S  T subtype_rel: A r B atom: Atom apply: f a top: Top es-base-E: es-base-E(es) token: "$token" ifthenelse: if b then t else f fi  record-select: r.x bool: product: x:A  B[x] event_ordering: EO es-E: E lambda: x.A[x] so_lambda: x y.t[x; y] eclass: EClass(A[eo; e]) dep-isect: Error :dep-isect,  eq_atom: x =a y eq_atom: eq_atom$n(x;y) record+: record+ all: x:A. B[x] function: x:A  B[x] isect: x:A. B[x] uall: [x:A]. B[x] universe: Type member: t  T event-ordering+: EO+(Info) equal: s = t tactic: Error :tactic,  Unfold: Error :Unfold,  Auto: Error :Auto,  CollapseTHENA: Error :CollapseTHENA,  CollapseTHEN: Error :CollapseTHEN,  Knd: Knd IdLnk: IdLnk Id: Id rationals: natural_number: $n real: grp_car: |g| nat: bag-size: bag-size(bs) limited-type: LimitedType bfalse: ff btrue: tt eq_bool: p =b q lt_int: i <z j le_int: i z j eq_int: (i = j) null: null(as) set_blt: a < b grp_blt: a < b infix_ap: x f y dcdr-to-bool: [d] bl-all: (xL.P[x])_b bl-exists: (xL.P[x])_b b-exists: (i<n.P[i])_b eq_type: eq_type(T;T') qeq: qeq(r;s) q_less: q_less(r;s) q_le: q_le(r;s) deq-member: deq-member(eq;x;L) deq-disjoint: deq-disjoint(eq;as;bs) deq-all-disjoint: deq-all-disjoint(eq;ass;bs) eq_id: a = b eq_lnk: a = b es-eq-E: e = e' es-bless: e <loc e' es-ble: e loc e' bimplies: p  q band: p  q bor: p q bnot: b unit: Unit int: empty-bag: {} single-bag: {x} pi1: fst(t) es-filter-image: f[X] MaAuto: Error :MaAuto,  THENM: Error :THENM,  bag_size_empty: bag_size_empty{bag_size_empty_compseq_tag_def:o} sq_type: SQType(T) SplitOn: Error :SplitOn,  bag_size_single: bag_size_single{bag_size_single_compseq_tag_def:o}(x)
Lemmas :  bool_cases subtype_base_sq bool_subtype_base not_wf bnot_wf assert_of_bnot eqff_to_assert uiff_transitivity eqtt_to_assert es-is-filter-image bag_wf single-bag_wf pi1_wf iff_weakening_uiff iff_functionality_wrt_iff bag-size_wf nat_wf pi1_wf_top empty-bag_wf es-filter-image_wf pi2_wf bool_wf eclass-val_wf ifthenelse_wf false_wf assert_wf true_wf in-eclass_wf assert_witness uiff_wf event-ordering+_inc subtype_rel_self es-base-E_wf es-E_wf event-ordering+_wf eclass_wf es-tagged-true-class_wf top_wf member_wf subtype_rel_wf es-interface-top rev_implies_wf iff_wf sq_stable__assert intensional-universe_wf es-interface-subtype_rel2
\mforall{}[Info:Type].  \mforall{}[es:EO+(Info)].  \mforall{}[T:Type].  \mforall{}[X:EClass(T  \mtimes{}  \mBbbB{})].  \mforall{}[e:E].
    uiff(\muparrow{}e  \mmember{}\msubb{}  Tagged\_tt(X);(\muparrow{}e  \mmember{}\msubb{}  X)  \mwedge{}  (\muparrow{}(snd(X(e)))))


Date html generated: 2011_08_16-PM-04_16_32
Last ObjectModification: 2011_06_20-AM-00_45_09

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