Nuprl Lemma : transitive-reflexive-closure

Nuprl Lemma : transitive-reflexive-closure_transitivity

∀[A:Type]. ∀[R:A ⟶ A ⟶ ℙ]. ∀x,y,z:A. ((x R^* y) ⇒ (y R^* z) ⇒ (x R^* z))

Proof

Definitions occuring in Statement : transitive-reflexive-closure: R^*, uall: ∀[x:A]. B[x], prop: ℙ, infix_ap: x f y, all: ∀x:A. B[x], implies: P ⇒ Q, function: x:A ⟶ B[x], universe: Type
Definitions unfolded in proof : uall: ∀[x:A]. B[x], all: ∀x:A. B[x], implies: P ⇒ Q, transitive-reflexive-closure: R^*, infix_ap: x f y, or: P ∨ Q, member: t ∈ T, subtype_rel: A ⊆r B, prop: ℙ, uimplies: b supposing a, guard: {T}, iff: P ⇐⇒ Q, and: P ∧ Q, rev_implies: P ⇐ Q, utrans: UniformlyTrans(T;x,y.E[x; y])
Lemmas referenced : transitive-reflexive-closure_wf, iff_weakening_equal, equal_wf, transitive-closure-transitive
Rules used in proof : sqequalSubstitution, sqequalTransitivity, computationStep, sqequalReflexivity, isect_memberFormation, lambdaFormation, cut, hypothesis, addLevel, sqequalHypSubstitution, sqequalRule, unionElimination, thin, applyEquality, introduction, extract_by_obid, isectElimination, cumulativity, hypothesisEquality, functionExtensionality, because_Cache, lambdaEquality, universeEquality, equalityTransitivity, equalitySymmetry, independent_isectElimination, productElimination, independent_functionElimination, levelHypothesis, functionEquality, inrFormation

Latex:
\mforall{}[A:Type]. \mforall{}[R:A {}\mrightarrow{} A {}\mrightarrow{} \mBbbP{}]. \mforall{}x,y,z:A. ((x R\^{}* y) {}\mRightarrow{} (y R\^{}* z) {}\mRightarrow{} (x R\^{}* z)) Date html generated: 2017_01_19-PM-02_17_45 Last ObjectModification: 2017_01_14-PM-04_59_10 Theory : relations2 Home Index