Nuprl Lemma : lsum-mul-const

∀[T:Type]. ∀[L:T List]. ∀[f:{x:T| (x ∈ L)}  ⟶ ℤ]. ∀[c:ℤ].  (Σ(c * f[x] | x ∈ L) = (c * Σ(f[x] | x ∈ L)) ∈ ℤ)

Proof

Definitions occuring in Statement : lsum: Σ(f[x] | x ∈ L), l_member: (x ∈ l), list: T List, uall: ∀[x:A]. B[x], so_apply: x[s], set: {x:A| B[x]} , function: x:A ⟶ B[x], multiply: n * m, int: ℤ, universe: Type, equal: s = t ∈ T
Definitions unfolded in proof : uall: ∀[x:A]. B[x], member: t ∈ T, all: ∀x:A. B[x], nat: ℕ, implies: P ⇒ Q, false: False, ge: i ≥ j , uimplies: b supposing a, not: ¬A, satisfiable_int_formula: satisfiable_int_formula(fmla), exists: ∃x:A. B[x], top: Top, and: P ∧ Q, prop: ℙ, or: P ∨ Q, so_lambda: λ₂x.t[x], so_apply: x[s], decidable: Dec(P), cons: [a / b], le: A ≤ B, less_than': less_than'(a;b), colength: colength(L), nil: [], it: ⋅, guard: {T}, sq_type: SQType(T), less_than: a < b, squash: ↓T, so_lambda: λ₂x y.t[x; y], so_apply: x[s1;s2], subtype_rel: A ⊆r B, l_member: (x ∈ l), select: L[n], cand: A c∧ B, nat_plus: ℕ⁺, uiff: uiff(P;Q), iff: P ⇐⇒ Q, rev_implies: P ⇐ Q, true: True
Lemmas referenced : nat_properties, full-omega-unsat, intformand_wf, intformle_wf, itermConstant_wf, itermVar_wf, intformless_wf, istype-int, int_formula_prop_and_lemma, istype-void, int_formula_prop_le_lemma, int_term_value_constant_lemma, int_term_value_var_lemma, int_formula_prop_less_lemma, int_formula_prop_wf, ge_wf, istype-less_than, list-cases, lsum_nil_lemma, decidable__equal_int, intformnot_wf, intformeq_wf, itermMultiply_wf, int_formula_prop_not_lemma, int_formula_prop_eq_lemma, int_term_value_mul_lemma, l_member_wf, nil_wf, product_subtype_list, colength-cons-not-zero, colength_wf_list, istype-le, subtract-1-ge-0, subtype_base_sq, set_subtype_base, int_subtype_base, spread_cons_lemma, subtract_wf, itermSubtract_wf, itermAdd_wf, int_term_value_subtract_lemma, int_term_value_add_lemma, decidable__le, le_wf, lsum_cons_lemma, equal_wf, squash_wf, true_wf, add_functionality_wrt_eq, length_of_cons_lemma, add_nat_plus, length_wf_nat, decidable__lt, nat_plus_properties, add-is-int-iff, false_wf, cons_wf, length_wf, select_wf, lsum_wf, subtype_rel_sets_simple, cons_member, subtype_rel_self, iff_weakening_equal, mul-distributes, istype-nat, list_wf, istype-universe
Rules used in proof : sqequalSubstitution, sqequalTransitivity, computationStep, sqequalReflexivity, isect_memberFormation_alt, introduction, cut, thin, lambdaFormation_alt, extract_by_obid, sqequalHypSubstitution, isectElimination, hypothesisEquality, hypothesis, setElimination, rename, intWeakElimination, natural_numberEquality, independent_isectElimination, approximateComputation, independent_functionElimination, dependent_pairFormation_alt, lambdaEquality_alt, int_eqEquality, dependent_functionElimination, isect_memberEquality_alt, voidElimination, sqequalRule, independent_pairFormation, universeIsType, axiomEquality, isectIsTypeImplies, inhabitedIsType, functionIsTypeImplies, unionElimination, because_Cache, functionIsType, setIsType, promote_hyp, hypothesis_subsumption, productElimination, equalityIstype, dependent_set_memberEquality_alt, instantiate, equalityTransitivity, equalitySymmetry, applyLambdaEquality, imageElimination, baseApply, closedConclusion, baseClosed, applyEquality, intEquality, sqequalBase, multiplyEquality, pointwiseFunctionality, productIsType, inrFormation_alt, addEquality, imageMemberEquality, universeEquality

Latex:
\mforall{}[T:Type]. \mforall{}[L:T List]. \mforall{}[f:\{x:T| (x \mmember{} L)\} {}\mrightarrow{} \mBbbZ{}]. \mforall{}[c:\mBbbZ{}]. (\mSigma{}(c * f[x] | x \mmember{} L) = (c * \mSigma{}(f[x] | x \mmember{} L))) Date html generated: 2020_05_19-PM-09_47_23 Last ObjectModification: 2019_11_12-PM-11_31_42 Theory : list_1 Home Index