Nuprl Lemma : fillpath

Nuprl Lemma : fillpath_wf

∀[Gamma:j⊢]. ∀[A:{Gamma.𝕀 ⊢ _}]. ∀[cA:Gamma.𝕀 ⊢ CompOp(A)]. ∀[x:{Gamma ⊢ _:(A)[1(𝕀)]}]. ∀[y:{Gamma ⊢ _:(A)[0(𝕀)]}].

∀[z:{Gamma.𝕀 ⊢ _:((A)[0(𝕀)])p}].
(fillpath(Gamma;A;cA;x;y;z) ∈ {t:{Gamma.𝕀 ⊢ _:((A)[1(𝕀)])p}|

                                 ((t)[0(𝕀)] = x ∈ {Gamma ⊢ _:(A)[1(𝕀)]})

                                 ∧ ((t)[1(𝕀)] = app(transport-fun(Gamma;A;cA); y) ∈ {Gamma ⊢ _:(A)[1(𝕀)]})} ) supposing

(((z)[0(𝕀)] = app(rev-transport-fun(Gamma;A;cA); x) ∈ {Gamma ⊢ _:(A)[0(𝕀)]}) and
((z)[1(𝕀)] = y ∈ {Gamma ⊢ _:(A)[0(𝕀)]}))

Proof

Definitions occuring in Statement : fillpath: fillpath(Gamma;A;cA;x;y;z), rev-transport-fun: rev-transport-fun(Gamma;A;cA), transport-fun: transport-fun(Gamma;A;cA), composition-op: Gamma ⊢ CompOp(A), interval-1: 1(𝕀), interval-0: 0(𝕀), interval-type: 𝕀, cubical-app: app(w; u), csm-id-adjoin: [u], cc-fst: p, cube-context-adjoin: X.A, csm-ap-term: (t)s, cubical-term: {X ⊢ _:A}, csm-ap-type: (AF)s, cubical-type: {X ⊢ _}, cubical_set: CubicalSet, uimplies: b supposing a, uall: ∀[x:A]. B[x], and: P ∧ Q, member: t ∈ T, set: {x:A| B[x]} , equal: s = t ∈ T
Definitions unfolded in proof : uall: ∀[x:A]. B[x], member: t ∈ T, all: ∀x:A. B[x], cubical-type: {X ⊢ _}, interval-0: 0(𝕀), csm-id-adjoin: [u], csm-ap-type: (AF)s, csm-id: 1(X), csm-adjoin: (s;u), csm-ap: (s)x, uimplies: b supposing a, subtype_rel: A ⊆r B, fillpath: fillpath(Gamma;A;cA;x;y;z), cc-snd: q, interval-type: 𝕀, cc-fst: p, constant-cubical-type: (X), csm+: tau+, csm-comp: G o F, interval-1: 1(𝕀), pi2: snd(t), compose: f o g, pi1: fst(t), guard: {T}, implies: P ⇒ Q, csm-ap-term: (t)s, squash: ↓T, prop: ℙ, true: True, constrained-cubical-term: {Gamma ⊢ _:A[phi |⟶ t]}, same-cubical-term: X ⊢ u=v:A, case-endpoints: [r=0 ⊢→ a; r=1 ⊢→ b], respects-equality: respects-equality(S;T), and: P ∧ Q, cand: A c∧ B, face-term-implies: Gamma ⊢ (phi ⇒ psi), iff: P ⇐⇒ Q, rev_implies: P ⇐ Q, face-one: (i=1), cubical-term-at: u(a), face-zero: (i=0), or: P ∨ Q, dm-neg: ¬(x), lattice-extend: lattice-extend(L;eq;eqL;f;ac), lattice-fset-join: \/(s), reduce: reduce(f;k;as), list_ind: list_ind, fset-image: f"(s), f-union: f-union(domeq;rngeq;s;x.g[x]), list_accum: list_accum, dM0: 0, lattice-0: 0, 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 b then t else f fi , eq_atom: x =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, empty-fset: {}, nil: [], it: ⋅, opposite-lattice: opposite-lattice(L), lattice-1: 1, fset-singleton: {x}, cons: [a / b], dM1: 1, bdd-distributive-lattice: BoundedDistributiveLattice, so_lambda: λ₂x.t[x], so_apply: x[s], cubical-type-at: A(a), face-type: 𝔽, I_cube: A(I), functor-ob: ob(F), face-presheaf: 𝔽, lattice-point: Point(l), face_lattice: face_lattice(I), face-lattice: face-lattice(T;eq), free-dist-lattice-with-constraints: free-dist-lattice-with-constraints(T;eq;x.Cs[x]), constrained-antichain-lattice: constrained-antichain-lattice(T;eq;P), DeMorgan-algebra: DeMorganAlgebra, cubical-app: app(w; u)
Lemmas referenced : csm-ap-type_wf, cube-context-adjoin_wf, interval-type_wf, csm-id-adjoin_wf, interval-0_wf, cc-fst_wf_interval, interval-1_wf, csm_id_adjoin_fst_type_lemma, cubical-term-eqcd, csm-ap-term_wf, composition-term_wf, cubical_set_cumulativity-i-j, face-or_wf, face-zero_wf, cc-snd_wf, face-one_wf, csm+_wf_interval, csm-composition_wf, case-endpoints_wf, cubical-app_wf_fun, fill-type-down_wf, fill-type-up_wf, csm-interval-type, rev-transport-fun_wf, istype-cubical-term, composition-op_wf, cubical-type-cumulativity2, cubical-type_wf, cubical_set_wf, subset-cubical-term, context-subset_wf, face-type_wf, csm-face-type, context-adjoin-subset4, csm-context-subset-subtype2, cube_set_map_cumulativity-i-j, csm-face-zero, csm-face-one, csm-face-or, csm-case-endpoints, csm_id_adjoin_fst_term_lemma, term-p+0, term-p+1, squash_wf, true_wf, fill-type-down-0, cube_set_map_wf, fill-type-up-0, constrained-cubical-term-eqcd, fill-type-down-1, fill-type-up-1, context-subset-is-subset, case-term-same2, cubical-term-1-q1, cubical-term-0-q0, thin-context-subset, respects-equality-context-subset-term, context-subset-map, sub_cubical_set_transitivity, face-1_wf, context-1-subset, face-term-implies-subset, face-or-eq-1, equal_wf, istype-universe, lattice-point_wf, face_lattice_wf, dM-to-FL-dM1, subtype_rel_self, iff_weakening_equal, dM-to-FL_wf, dM0_wf, subtype_rel_set, bounded-lattice-structure_wf, lattice-structure_wf, lattice-axioms_wf, bounded-lattice-structure-subtype, bounded-lattice-axioms_wf, lattice-meet_wf, lattice-join_wf, cubical-term-at_wf, lattice-1_wf, I_cube_wf, fset_wf, nat_wf, case-endpoints-0, csm-id_wf, subset-cubical-term2, sub_cubical_set_self, csm-ap-id-term, dm-neg_wf, names_wf, names-deq_wf, dM1_wf, subtype_rel-equal, dM_wf, free-DeMorgan-lattice_wf, DeMorgan-algebra-structure_wf, DeMorgan-algebra-structure-subtype, subtype_rel_transitivity, DeMorgan-algebra-axioms_wf, case-endpoints-1, transport-fun_wf
Rules used in proof : sqequalSubstitution, sqequalTransitivity, computationStep, sqequalReflexivity, isect_memberFormation_alt, cut, introduction, extract_by_obid, sqequalHypSubstitution, isectElimination, thin, hypothesisEquality, instantiate, hypothesis, sqequalRule, dependent_functionElimination, Error :memTop, setElimination, rename, productElimination, because_Cache, equalityTransitivity, equalitySymmetry, independent_isectElimination, applyEquality, lambdaEquality_alt, cumulativity, universeIsType, universeEquality, inhabitedIsType, hyp_replacement, axiomEquality, equalityIstype, isect_memberEquality_alt, isectIsTypeImplies, independent_functionElimination, imageElimination, applyLambdaEquality, natural_numberEquality, imageMemberEquality, baseClosed, dependent_set_memberEquality_alt, independent_pairFormation, lambdaFormation_alt, inlFormation_alt, productEquality, isectEquality, inrFormation_alt, productIsType

Latex:
\mforall{}[Gamma:j\mvdash{}]. \mforall{}[A:\{Gamma.\mBbbI{} \mvdash{} \_\}]. \mforall{}[cA:Gamma.\mBbbI{} \mvdash{} CompOp(A)]. \mforall{}[x:\{Gamma \mvdash{} \_:(A)[1(\mBbbI{})]\}]. \mforall{}[y:\{Gamma \mvdash{} \_:(A)[0(\mBbbI{})]\}]. \mforall{}[z:\{Gamma.\mBbbI{} \mvdash{} \_:((A)[0(\mBbbI{})])p\}]. (fillpath(Gamma;A;cA;x;y;z) \mmember{} \{t:\{Gamma.\mBbbI{} \mvdash{} \_:((A)[1(\mBbbI{})])p\}| ((t)[0(\mBbbI{})] = x) \mwedge{} ((t)[1(\mBbbI{})] = app(transport-fun(Gamma;A;cA); y))\} \000C) supposing (((z)[0(\mBbbI{})] = app(rev-transport-fun(Gamma;A;cA); x)) and ((z)[1(\mBbbI{})] = y)) Date html generated: 2020_05_20-PM-04_56_27 Last ObjectModification: 2020_05_02-PM-03_20_30 Theory : cubical!type!theory Home Index