Nuprl Lemma : csm-discrete-pi

∀[A:Type]. ∀[B:A ⟶ Type]. ∀[X,Y:j⊢]. ∀[s:Y j⟶ X].
((Πdiscr(A) discrete-family(A;a.B[a]))s = Y ⊢ Πdiscr(A) discrete-family(A;a.B[a]) ∈ {Y ⊢ _})

Proof

Definitions occuring in Statement : discrete-family: discrete-family(A;a.B[a]), discrete-cubical-type: discr(T), cubical-pi: ΠA B, csm-ap-type: (AF)s, cubical-type: {X ⊢ _}, cube_set_map: A ⟶ B, cubical_set: CubicalSet, uall: ∀[x:A]. B[x], so_apply: x[s], function: x:A ⟶ B[x], universe: Type, equal: s = t ∈ T
Definitions unfolded in proof : uall: ∀[x:A]. B[x], all: ∀x:A. B[x], member: t ∈ T, so_lambda: λ₂x.t[x], so_apply: x[s], discrete-cubical-type: discr(T), csm-ap-type: (AF)s, discrete-family: discrete-family(A;a.B[a]), cc-snd: q, cc-fst: p, csm-comp: G o F, csm-adjoin: (s;u), compose: f o g, csm-ap: (s)x, pi2: snd(t)
Lemmas referenced : csm-cubical-pi, discrete-cubical-type_wf, discrete-family_wf, cube_set_map_wf, cubical_set_wf, istype-universe
Rules used in proof : sqequalSubstitution, sqequalTransitivity, computationStep, sqequalReflexivity, isect_memberFormation_alt, cut, introduction, extract_by_obid, sqequalHypSubstitution, dependent_functionElimination, thin, hypothesisEquality, isectElimination, hypothesis, sqequalRule, lambdaEquality_alt, applyEquality, universeIsType, because_Cache, instantiate, functionIsType, inhabitedIsType, universeEquality

Latex:
\mforall{}[A:Type]. \mforall{}[B:A {}\mrightarrow{} Type]. \mforall{}[X,Y:j\mvdash{}]. \mforall{}[s:Y j{}\mrightarrow{} X]. ((\mPi{}discr(A) discrete-family(A;a.B[a]))s = Y \mvdash{} \mPi{}discr(A) discrete-family(A;a.B[a])) Date html generated: 2020_05_20-PM-03_38_23 Last ObjectModification: 2020_04_07-PM-04_28_56 Theory : cubical!type!theory Home Index