Nuprl Lemma : bilinear_p

Nuprl Lemma : bilinear_p_wf

∀[A,B,C:Type]. ∀[+a:A ⟶ A ⟶ A]. ∀[+b:B ⟶ B ⟶ B]. ∀[+c:C ⟶ C ⟶ C]. ∀[f:A ⟶ B ⟶ C].

(IsBilinear(A;B;C;+a;+b;+c;f) ∈ ℙ)

Proof

Definitions occuring in Statement : bilinear_p: IsBilinear(A;B;C;+a;+b;+c;f), uall: ∀[x:A]. B[x], prop: ℙ, member: t ∈ T, function: x:A ⟶ B[x], universe: Type
Definitions unfolded in proof : bilinear_p: IsBilinear(A;B;C;+a;+b;+c;f), uall: ∀[x:A]. B[x], member: t ∈ T, prop: ℙ, and: P ∧ Q, so_lambda: λ₂x.t[x], so_apply: x[s], infix_ap: x f y
Lemmas referenced : uall_wf, equal_wf, infix_ap_wf
Rules used in proof : sqequalSubstitution, sqequalRule, sqequalReflexivity, sqequalTransitivity, computationStep, isect_memberFormation, introduction, cut, productEquality, lemma_by_obid, sqequalHypSubstitution, isectElimination, thin, cumulativity, hypothesisEquality, lambdaEquality, because_Cache, hypothesis, axiomEquality, equalityTransitivity, equalitySymmetry, functionEquality, isect_memberEquality, universeEquality

Latex:
\mforall{}[A,B,C:Type]. \mforall{}[+a:A {}\mrightarrow{} A {}\mrightarrow{} A]. \mforall{}[+b:B {}\mrightarrow{} B {}\mrightarrow{} B]. \mforall{}[+c:C {}\mrightarrow{} C {}\mrightarrow{} C]. \mforall{}[f:A {}\mrightarrow{} B {}\mrightarrow{} C]. (IsBilinear(A;B;C;+a;+b;+c;f) \mmember{} \mBbbP{}) Date html generated: 2016_05_15-PM-00_02_28 Last ObjectModification: 2015_12_26-PM-11_25_44 Theory : gen_algebra_1 Home Index