Nuprl Lemma : decidable_

Nuprl Lemma : decidable__pcw-pp-barred

∀[P:Type]. ∀[A:P ⟶ Type]. ∀[B:p:P ⟶ A[p] ⟶ Type]. ∀[C:p:P ⟶ a:A[p] ⟶ B[p;a] ⟶ P].
∀pp:n:ℕ × (ℕn ⟶ pcw-step(P;p.A[p];p,a.B[p;a];p,a,b.C[p;a;b])). Dec(Barred(pp))

Proof

Definitions occuring in Statement : pcw-pp-barred: Barred(pp), pcw-step: pcw-step(P;p.A[p];p,a.B[p; a];p,a,b.C[p; a; b]), int_seg: {i..j^-}, nat: ℕ, decidable: Dec(P), uall: ∀[x:A]. B[x], so_apply: x[s1;s2;s3], so_apply: x[s1;s2], so_apply: x[s], all: ∀x:A. B[x], function: x:A ⟶ B[x], product: x:A × B[x], natural_number: $n, universe: Type
Definitions unfolded in proof : uall: ∀[x:A]. B[x], all: ∀x:A. B[x], member: t ∈ T, nat: ℕ, pcw-pp-barred: Barred(pp), decidable: Dec(P), or: P ∨ Q, so_lambda: λ₂x.t[x], so_apply: x[s], so_lambda: λ₂x y.t[x; y], so_apply: x[s1;s2], so_lambda: so_lambda(x,y,z.t[x; y; z]), so_apply: x[s1;s2;s3], ge: i ≥ j , le: A ≤ B, and: P ∧ Q, int_seg: {i..j^-}, lelt: i ≤ j < k, iff: P ⇐⇒ Q, not: ¬A, rev_implies: P ⇐ Q, implies: P ⇒ Q, false: False, prop: ℙ, uiff: uiff(P;Q), uimplies: b supposing a, subtract: n - m, subtype_rel: A ⊆r B, top: Top, less_than': less_than'(a;b), true: True, pcw-step: pcw-step(P;p.A[p];p,a.B[p; a];p,a,b.C[p; a; b]), spreadn: spread3, isr: isr(x), assert: ↑b, ifthenelse: if b then t else f fi , bfalse: ff, btrue: tt
Lemmas referenced : nat_properties, decidable__lt, nat_wf, int_seg_wf, pcw-step_wf, subtract_wf, decidable__le, false_wf, not-le-2, less-iff-le, condition-implies-le, minus-one-mul, zero-add, minus-one-mul-top, minus-add, minus-minus, add-associates, add-swap, add-commutes, add_functionality_wrt_le, add-zero, le-add-cancel, not-lt-2, add-mul-special, zero-mul, le-add-cancel-alt, lelt_wf, decidable__and2, less_than_wf, decidable__false, true_wf, decidable__true, equal_wf
Rules used in proof : sqequalSubstitution, sqequalTransitivity, computationStep, sqequalReflexivity, isect_memberFormation, lambdaFormation, productElimination, thin, cut, introduction, extract_by_obid, sqequalHypSubstitution, isectElimination, hypothesisEquality, hypothesis, setElimination, rename, sqequalRule, dependent_functionElimination, natural_numberEquality, unionElimination, productEquality, functionEquality, cumulativity, lambdaEquality, applyEquality, functionExtensionality, universeEquality, dependent_set_memberEquality, independent_pairFormation, voidElimination, independent_functionElimination, independent_isectElimination, addEquality, isect_memberEquality, voidEquality, intEquality, minusEquality, because_Cache, equalityTransitivity, equalitySymmetry, inrFormation

Latex:
\mforall{}[P:Type]. \mforall{}[A:P {}\mrightarrow{} Type]. \mforall{}[B:p:P {}\mrightarrow{} A[p] {}\mrightarrow{} Type]. \mforall{}[C:p:P {}\mrightarrow{} a:A[p] {}\mrightarrow{} B[p;a] {}\mrightarrow{} P]. \mforall{}pp:n:\mBbbN{} \mtimes{} (\mBbbN{}n {}\mrightarrow{} pcw-step(P;p.A[p];p,a.B[p;a];p,a,b.C[p;a;b])). Dec(Barred(pp)) Date html generated: 2017_04_14-AM-07_42_07 Last ObjectModification: 2017_02_27-PM-03_13_51 Theory : co-recursion Home Index