Nuprl Lemma : rv-ip_functionality

[rv:InnerProductSpace]. ∀[x1,x2,y1,y2:Point].  (x1 ⋅ y1 x2 ⋅ y2) supposing (y1 ≡ y2 and x1 ≡ x2)


Proof




Definitions occuring in Statement :  rv-ip: x ⋅ y inner-product-space: InnerProductSpace ss-eq: x ≡ y ss-point: Point req: y uimplies: supposing a uall: [x:A]. B[x]
Definitions unfolded in proof :  sq_stable: SqStable(P) squash: T rv-ip: x ⋅ y exists: x:A. B[x] all: x:A. B[x] so_apply: x[s] prop: implies:  Q so_lambda: λ2x.t[x] and: P ∧ Q guard: {T} btrue: tt ifthenelse: if then else fi  eq_atom: =a y subtype_rel: A ⊆B record-select: r.x record+: record+ inner-product-space: InnerProductSpace uimplies: supposing a member: t ∈ T uall: [x:A]. B[x]
Lemmas referenced :  separation-space_wf real-vector-space_wf inner-product-space_wf subtype_rel_transitivity inner-product-space_subtype rv-ip_wf req_witness sq_stable__req exists_wf int-to-real_wf rless_wf rv-0_wf ss-sep_wf rmul_wf rv-mul_wf radd_wf rv-add_wf req_wf ss-eq_wf all_wf real_wf real-vector-space_subtype1 ss-point_wf subtype_rel_self
Rules used in proof :  dependent_functionElimination isect_memberEquality independent_isectElimination instantiate productElimination independent_functionElimination imageElimination baseClosed imageMemberEquality Error :applyLambdaEquality,  rename setElimination natural_numberEquality functionExtensionality hypothesisEquality lambdaEquality productEquality because_Cache equalitySymmetry equalityTransitivity functionEquality setEquality isectElimination extract_by_obid tokenEquality applyEquality hypothesis thin dependentIntersectionEqElimination sqequalRule dependentIntersectionElimination sqequalHypSubstitution cut introduction isect_memberFormation sqequalReflexivity computationStep sqequalTransitivity sqequalSubstitution

Latex:
\mforall{}[rv:InnerProductSpace].  \mforall{}[x1,x2,y1,y2:Point].    (x1  \mcdot{}  y1  =  x2  \mcdot{}  y2)  supposing  (y1  \mequiv{}  y2  and  x1  \mequiv{}  x2)



Date html generated: 2016_11_08-AM-09_14_44
Last ObjectModification: 2016_11_02-PM-00_08_55

Theory : inner!product!spaces


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