Nuprl Lemma : infn-nonneg

∀[I:{I:Interval| icompact(I)} ]
∀n:ℕ. ∀f:{f:I^n ⟶ ℝ| ∀a,b:I^n. (req-vec(n;a;b) ⇒ ((f a) = (f b)))} .
r0 ≤ (infn(n;I) f) supposing ∀a:I^n. (r0 ≤ (f a))

Proof

Definitions occuring in Statement : infn: infn(n;I), interval-vec: I^n, req-vec: req-vec(n;x;y), icompact: icompact(I), interval: Interval, rleq: x ≤ y, req: x = y, int-to-real: r(n), real: ℝ, nat: ℕ, uimplies: b supposing a, uall: ∀[x:A]. B[x], all: ∀x:A. B[x], implies: P ⇒ Q, set: {x:A| B[x]} , apply: f a, function: x:A ⟶ B[x], natural_number: $n
Definitions unfolded in proof : uall: ∀[x:A]. B[x], member: t ∈ T, all: ∀x:A. B[x], uimplies: b supposing a, rleq: x ≤ y, rnonneg: rnonneg(x), le: A ≤ B, and: P ∧ Q, prop: ℙ, implies: P ⇒ Q, interval-vec: I^n
Lemmas referenced : rleq-infn, le_witness_for_triv, interval-vec_wf, rleq_wf, int-to-real_wf, real_wf, req-vec_wf, req_wf, istype-nat, interval_wf, icompact_wf
Rules used in proof : sqequalSubstitution, sqequalTransitivity, computationStep, sqequalReflexivity, isect_memberFormation_alt, introduction, cut, lambdaFormation_alt, extract_by_obid, sqequalHypSubstitution, isectElimination, thin, hypothesisEquality, dependent_functionElimination, because_Cache, independent_isectElimination, hypothesis, sqequalRule, lambdaEquality_alt, productElimination, equalityTransitivity, equalitySymmetry, functionIsTypeImplies, inhabitedIsType, functionIsType, universeIsType, setElimination, rename, natural_numberEquality, applyEquality, setIsType, isect_memberEquality_alt, isectIsTypeImplies

Latex:
\mforall{}[I:\{I:Interval| icompact(I)\} ] \mforall{}n:\mBbbN{}. \mforall{}f:\{f:I\^{}n {}\mrightarrow{} \mBbbR{}| \mforall{}a,b:I\^{}n. (req-vec(n;a;b) {}\mRightarrow{} ((f a) = (f b)))\} . r0 \mleq{} (infn(n;I) f) supposing \mforall{}a:I\^{}n. (r0 \mleq{} (f a)) Date html generated: 2019_10_30-AM-08_25_47 Last ObjectModification: 2019_05_28-PM-05_29_31 Theory : reals Home Index