Nuprl Lemma : dM-meet-inc-opp

[i:ℕ]. (<i> ∧ <1-i> {{inr ,inl i}})


Proof



Definitions occuring in Statement :  dM_opp: <1-x> dM_inc: <x> dM: dM(I) lattice-meet: a ∧ b fset-pair: {a,b} fset-singleton: {x} nat: uall: [x:A]. B[x] inr: inr  inl: inl x sqequal: t
Definitions unfolded in proof :  uall: [x:A]. B[x] member: t ∈ T lattice-meet: a ∧ b record-select: r.x dM: dM(I) free-DeMorgan-algebra: free-DeMorgan-algebra(T;eq) mk-DeMorgan-algebra: mk-DeMorgan-algebra(L;n) record-update: r[x := v] ifthenelse: if then else fi  eq_atom: =a y bfalse: ff free-DeMorgan-lattice: free-DeMorgan-lattice(T;eq) free-dist-lattice: free-dist-lattice(T; eq) mk-bounded-distributive-lattice: mk-bounded-distributive-lattice mk-bounded-lattice: mk-bounded-lattice(T;m;j;z;o) btrue: tt fset-ac-glb: fset-ac-glb(eq;ac1;ac2) fset-minimals: fset-minimals(x,y.less[x; y]; s) fset-filter: {x ∈ P[x]} filter: filter(P;l) reduce: reduce(f;k;as) list_ind: list_ind f-union: f-union(domeq;rngeq;s;x.g[x]) list_accum: list_accum dM_inc: <x> dminc: <i> free-dl-inc: free-dl-inc(x) fset-singleton: {x} cons: [a b] nil: [] it: fset-union: x ⋃ y l-union: as ⋃ bs fset-image: f"(s) dM_opp: <1-x> dmopp: <1-i> insert: insert(a;L) eval_list: eval_list(t) deq-member: x ∈b L fset-minimal: fset-minimal(x,y.less[x; y];s;a) fset-null: fset-null(s) null: null(as) f-proper-subset-dec: f-proper-subset-dec(eq;xs;ys) band: p ∧b q deq-f-subset: deq-f-subset(eq) isl: isl(x) decidable__f-subset decidable__all_fset decidable_functionality iff_preserves_decidability decidable__assert bor: p ∨bq union-deq: union-deq(A;B;a;b) sumdeq: sumdeq(a;b) bnot: ¬bb decidable__fset-member deq-fset-member: a ∈b s names-deq: NamesDeq int-deq: IntDeq eq_int: (i =z j) nat: iff_weakening_uiff fset-all-iff deq-fset: deq-fset(eq) decidable__equal_fset decidable__and2 mk_deq: mk_deq(p) decidable__and fset-pair: {a,b}
Lemmas referenced :  nat_wf decidable__f-subset decidable__all_fset decidable_functionality iff_preserves_decidability decidable__assert decidable__fset-member iff_weakening_uiff fset-all-iff decidable__equal_fset decidable__and2 decidable__and
Rules used in proof :  sqequalSubstitution sqequalTransitivity computationStep sqequalReflexivity isect_memberFormation introduction cut sqequalRule int_eqReduceTrueSq sqequalHypSubstitution setElimination thin rename hypothesisEquality hypothesis because_Cache sqequalAxiom extract_by_obid
Latex:
\mforall{}[i:\mBbbN{}].  (<i>  \mwedge{}  ə-i>  \msim{}  \{\{inr  i  ,inl  i\}\})


Date html generated: 2018_05_23-AM-08_28_42
Last ObjectModification: 2018_05_20-PM-05_38_01

Theory : cubical!type!theory


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