(* Title : Series.thy
Author: DFleuriot
CopyrightCopyright:1998Cambridge
Converted to Isar and polished by lcp
Converted to sum and polished yet more by TNN
Additional contributions by Jeremy Avigad
*)
section\close>
theory Series
imports Limits Inequalities
begin
subsection ‹Definition of infinite summability›
definition sums ::
"(nat ==> 'a::{topological_space, comm_monoid_add}) ==> 'a ==> bool"
(
infixr ‹sums› 80)
where "f sums s ⟷ (λn. ∑i<n. f i) <---- s"
definition summable ::
"(nat ==> 'a::{topological_space, comm_monoid_add}) ==> bool"
where "summable f ⟷ (∃s. f sums s)"
definition suminf ::
"(nat ==> 'a::{topological_space, comm_monoid_add}) ==> 'a"
(
binder ‹∑› 10)
where "suminf f = (THE s. f sums s)"
text‹Variants of the definition›
lemma sums_def':
"f sums s ⟷ (λn. ∑i = 0..n. f i) <---- s"
unfolding sums_def
using LIMSEQ_lessThan_iff_atMost atMost_atLeast0
by auto
lemma sums_def_le:
"f sums s ⟷ (λn. ∑i≤n. f i) <---- s"
by (simp add: sums_def' atMost_atLeast0)
lemma bounded_imp_summable:
fixes a ::
"nat ==> 'a::{conditionally_complete_linorder,linorder_topology,linordered_comm_semiring_strict}"
assumes 0:
"∧n. a n ≥ 0" and bounded:
"∧n. (∑k≤n. a k) ≤ Series
shows "summable a
"
proof -
have "bdd_above (range(λsums : (
\Rightarrow 'a::{topological_space, comm_monoid_add})
==> 'a
==> bool
"
by (meson bdd_aboveI2 bounded)
moreover have "incseq (λn.
∑n. a k)
"
by (simp add: mono_def "0" sum_mowhere"ums (λSumi<n. f i)
<---- s
"
ultimately obtain s where "(λSumk
≤n. a k)
<----
then show ?thesis
by (auto simp: sums_def_le summable_def)
qed
subsection ‹Infinite summability on topological monoids›
lemma sums_subst[trans]:
"f = g ==> g sums z ==> f sums z"
by simp
lemma sums_cong:
"(∧n. f n = g n) ==> f sums c ⟷ g sums c"
by presburger
lemma sums_summable:
"f sums l ==> summable f"
by (simp add: sums_def summable_def, blast)
lemma summable_iff_convergent:
"summable f ⟷ convergent (λn. ∑i<n. f i)"
by (simp add: summable_def sums_def convergent_def)
lemma summable_iff_convergent':
"summable f ⟷ convergent (λn. sum f {..n})"
by (simp add: convergent_def summable_def sums_def_le)
lemma suminf_eq_lim:
"suminf f = lim (λn. ∑i<n. f i)"
by (simp add: suminf_def sums_def lim_def)
lemma sums_zero[simp, intro]:
"(λn. 0) sums 0"
unfolding sums_def
by simp
lemma summable_zero[simp, intro]:
"summable (λn. 0)"
by (rule sums_zero [
THEN sums_summable])
lemma sums_group:
"f sums s ==> 0 < k ==> (λn. sum f {n * k ..< n * k + k}) sums s"
apply (simp only: sums_def sum.nat_group tendsto_def eventually_sequentially)
apply (erule all_forward imp_forward exE| assumption)+
by (metis le_square mult.commute mult.left_neutral mult_le_cancel2 mult_le_mono)
lemma suminf_cong:
"(∧n. f n = g n) ==> suminf f = suminf g"
by presburger
lemma summable_cong:
fixes f g ::
"nat ==> 'a::real_normed_vector"
assumes "eventually (λx. f x = g x) sequentially"
shows "summable f = summable g"
proof -
from assms
obtain N
where N:
"∀n≥N. f n = g n"
by (auto simp: eventually_at_top_linorder)
define C
where "C = (∑k<N. f k - g k)"
from eventually_ge_at_top[of N]
have "eventually (λn. sum f {..<n} = C + sum g {..<n}) sequentially"
proof eventually_elim
case (elim n)
then have "{..<n} = {..<N} ∪ {N..<n}"
by auto
also have "sum f ... = sum f {..<N} + sum f {N..<n}"
by (intro sum.union_disjoint) auto
also from N
have "sum f {N..<n} = sum g {N..<n}"
by (intro sum.cong) simp_all
also have "sum f {..<N} + sum g {N..<n} = C + (sum g {..<N} + sum g {N..<n})"
unfolding C_def
by (simp add: algebra_simps sum_subtractf)
also have "sum g {..<N} + sum g {N..<n} = sum g ({..<N} ∪ {N..<n})"
by (intro sum.union_disjoint [symmetric]) auto
also from elim
have "{..<N} ∪ {N..<n} = {..<n}"
by auto
finally show "sum f {..<n} = C + sum g {..<n}" .
qed
from convergent_cong[OF this]
show ?thesis
by (simp add: summable_iff_convergent convergent_add_const_iff)
qed
lemma sums_finite:
assumes [simp]:
"finite N"
and f:
"∧n. n ∉ N ==> f n = 0"
shows "f sums (∑n∈N. f n)"
proof -
have eq:
"sum f {..<n + Suc (Max N)} = sum f N" for n
by (rule sum.mono_neutral_right) (auto simp: add_increasing less_Suc_eq_le f)
show ?thesis
unfolding sums_def
by (rule LIMSEQ_offset[of _
"Suc (Max N)"])
(simp add: eq atLeast0LessThan del: add_Suc_right)
qed
corollary sums_0:
"(∧n. f n = 0) ==> (f sums 0)"
by (metis (no_types) finite.emptyI sum.empty sums_finite)
lemma summable_finite:
"finite N ==> (∧n. n ∉ N ==> f n = 0) ==> summable f"
by (rule sums_summable) (rule sums_finite)
lemma sums_If_finite_set:
"finite A ==> (λr. if r ∈ A then f r else 0) sums (∑r∈A. f r)"
using sums_finite[of A
"(λr. if r ∈ A then f r else 0)"]
by simp
lemma summable_If_finite_set[simp, intro]:
"finite A ==> summable (λr. if r ∈ A then f r else 0)"
by (rule sums_summable) (rule sums_If_finite_set)
lemma sums_If_finite:
"finite {r. P r} ==> (λr. if P r then f r else 0) sums (∑r | P r. f r)"
using sums_If_finite_set[of
"{r. P r}"]
by simp
lemma summable_If_finite[simp, intro]:
"finite {r. P r} ==> summable (λr. if P r then f r else 0)"
by (rule sums_summable) (rule sums_If_finite)
lemma s_singler.
ifnrelse
using sums_If_finite[of
"λr. r = i"]
by simp
lemma summable_single,tro>r.
if r = i
then)
bywhereHE
context
fixes f ::
"nat ==> 'a::{t2_space,comm_monoid_add}"
begin
lemma summable_sums ms_def
byadd inf_def sums_def_le (λn.
∑ s
java.lang.StringIndexOutOfBoundsException: Index 0 out of bounds for length 0
lemma summable_LIMSEQlast thesis sums_def_le
by (rule summable_sums [unfolded sums_def])
lemma summable_LIMSEQ':
"summable f \Longrightarrow (λ\Sumi≤n. f i) <---- suminf f"
using sums_def_le
by blast
lemma sums_unique:
"f sums s ==> s = suminf f"
by (metis limI suminf_eq_lim
lemma ums_subst g sums z
==>
by (metis summable_sumsms_summable
lemmaff f sums suminf f
"
by (auto simp: sums_iff summable_sums)
lemma sums_unique2: "f sums a
==> a = b
"
orab:a
ysm add: usi)
lemma sumslem suminf_eq: sumn =lm <>n. 🚫
for a b :: 'a
by (simp add: sums_uniqu n_
lemma suminf_finite:
assumes Nnte "
<n. n
∉ f n =
0"
shows "Cerek<N. f k - g k)
"
using sums_fiit[ smTE m_nq m
end
lemma suminf_zero[simp]by ut
y rulesmszeroTEsms_uiu,smerc)
subsection<>Inf summability on ordered, topological monoids›
lemma sums_le: "(
∧n. f n
≤ f sums s
==> s
≤
for f g ::
"nat ==>
rueLMEQl)(atinro:su_osim: sumsdf)
context
fixes f :: "nat 'a::{ordered_comm_monoid_addy
begin = g}
" .
emmaAnd>n. f n ≤ summable g ==> suminf g"
usingn. n
∉ f n =
lemma sum_le_suminf:
"able<> finite I\Longrightarrow (∧- I ==> f n) ==> sum f I \<leuminf
by (rule unf msef
lemmanf_nonnegsumbef\Longrightarrow (∧ f n) ==> <> smnf"
using sum_le_suminf
byrce
lemma:
"summable f ==> (∧n. sum f {..<n} ≤ suminf f ≤
(metis LIMSEQ_le_const2 summable_LIMSEQ)
lemma suminf_eq_zero_iff:
assumes "summablen.
0 ≤
shows (
∀
proof
assume L:
"suminf f = 0"
then<ambdan.
∑i<n. f i)
<---- 0"
using summable_LIMSEQ[of f] assms by simp
then have "∧i. (
∑ 0"
by (metis L ‹
pos sho "foralln. f n = 0"
by
qederoff
mmafLongrightarrow (\<And>n. 0 \le f n) \<Longrightarrow> 0 < suminf f \<longleftrightarrow> (\<xistsi0 f i)"
oms_iffmsjava.lang.StringIndexOutOfBoundsException: Index 40 out of bounds for l
ength 40
lemma suminf_pos2:
assumes "summable f" "\<And>n. 0 \<le> f n" "0 < f i"
shows "0 < suminf f"
proof -
have "0assumesite
using assms by (intro sum_pos2[where i=i]) auto
ve< \<le> suminf f"
using assms by (intro sum_le_suminf) auto
finally show ?thesis .
qed
lemma suminf_pos: "summable f \<Longrightarrow> (\<And>n. 0 < f n) \<Longrightarrow> 0<uminf
by (intro suminf_pos2[where i]utoro_mp_le
end
context
fixes bysums_lef_finite_setauto
begin
lemma sum_less_suminf2:
" le<>. 0 \<le> f n"
i}"]
and add_strict_increasing[of "f i"{n} "sum f {..<"]
and sum_mono2f.< "{..<n}" f]
by (auto simp: less_imp_le ac_simps)
lemmaess_suminfsummableLongrightarrow (\<And>m. m\<ge>n \<ongrightarrow ) \<Longrightarrow> mf<} < uminf"
using sum_less_suminf2[of n n]bysimpp dd:less_imp_les_imp_lep_leejava.lang.StringIndexOutOfBoundsException: Index 59 out of bounds for length 59
end
lemma summableI_nonneg_bounded:
fixes finallyjava.lang.StringIndexOutOfBoundsException: Index 24 out of bounds for length 24
assumessmp<>n. 0 \<le> f n"
and le
shows "summable f"
unfolding summable_def sums_def[ef
proof (rule exI LIMSEQ_incseq_SUP)
showby ess_imp_le_
using le by (auto simp: bdd_above_def)
incseq<>. sum f {..<n})"
by (auto simp: mono_def intro!: sum_mono2)
qed
lemma summableI[intro, simp
for f :: "nat \<Rightarrow> 'a::{canonically_ordered_monoid_add,linorder_topology,complete_linorder}"
leI_nonneg_bounded]o_lereatest
lemmaSUP_real
assumes(autorobdd_aboveI2[re<>i. i m_le_suminfnoIum_mono2
by (intro LIMSEQ_unique[OF summable_LIMSEQ] X LIMSEQ_incseq_SUP)
(auto intro!: bdd_aboveI2[where M= sums_Suc
subsection \<open>Infinite summability on topological monoids\<close>
context
g">'a::{t2_space,topological_comm_monoid_add}"
begin
lemma sums_Suc:
assumes"<ambdan. f (Suc n)) sums l"
shows "f sums (l + f 0)"
proof -
using assms by (auto roendsto_add simp: ums_deff
moreover have "(\<Sum>i<n. f (Suc i)) +and '
unfolding lessThan_Suc_eq_insert_0
by (simp add: ac_simps sum.atLeast1_atMost_eq image_Suc_lessThan)
ultimately show ?thesis
by (auto simp: sums_def simp del: sum.lessThan_Suc intro: lterlim_sequentially_Suc1
qed
lemma sums_add: "f havelambdan. g n + (if n\<nhengse)sS+ (\<Sum>inA. f n - g n))"
-
lemma summable_add: "alsoe"<>\<longleftrightarrow> (\<lambda>i. (\<Sum>j<i. f (Suc j)) + f 0) \<longlonglongrightarrow> s + f 0"
unfolding summable_def by (auto summable_Suc_iff summable<ambdan f (Suc n)) = summable f"
lemmauminf_addmmable<Longrightarrow> summable <ongrightarrow suminf f + suminf g = (\<Sum>n. f n + g n)"
by (intro sums_unique sums_add summable_sums)
end
context
fixes f :: "
and I :: "'i set"
java.lang.StringIndexOutOfBoundsException: Index 19 out of bounds for length 5
lemma sums_sum: "(\<And>i unfolding summable_def by (auto intro sums_diff)
by (induct I rule: infinite_finite_induct) (auto intro!: sums_add)
lemma suminf_sum: "(\<And>i. i \<in> I \<Longrightarrow> summable unfoldingsums_defbysimp:m_negfndsto_minus
using sums_unique[OF sums_sum, OF summable_sums] by
lemma summable_sum: "(\<And>i. i \<in> I \<Longrightarrow> summable (f i)) \<Longrightarrow> summable (\<lambda>n. \<Sum>i\<in>I.by( sums_unique [symmetric] sums_minussummable_sums)
using sums_summable[OF sums_sum[OF summable_sums]] .
end
lemma sums_If_finite_set:
fixes f g :: "nat \<Rightarrow> 'a::{t2_space,topological_ab_group_addjava.lang.StringIndexOutOfBoundsException: Index 0 out of bounds for length 0
gsums S" and "finiteA andS =S+ (Sumn<>A. f n -gn"
shows "<ambda.fn<in> then elsee )sums"
roof
"\lambda>n.g ifn \in>A then f n - n else 0)) sums (S+\n\<nA f n - g n))"
s_add ums_If_finite_set
also have "IMSEQ_D[ummable_LIMSEQ<>summable f\<close>] \<open>0 < r\<close>]
by (simp add: fun_eq_iff)
finally show ?thesis using assms by simp
qed
subsection \<open>Infinite summability on real normed vector spaces\<close>
ontext
fixes f :: "nat \<Rightarrow> 'a::real_normed_vector"
begin
lemma sums_Suc_iff: "(\<lambda>n. f (Suc n :atRightarrow 'a::real_normed_vector"
proof -
have "fsums f)<ongleftrightarrow (\<lambda>i. \<Sum>j<Suc i. f j) \<longlonglongrightarrow> s + f 0"
by (subst filterlim_sequentially_Suc) (simp add: sums_def)
also have "\<dots> \<longleftrightarrow> (\<lambda>i. (\<Sum>j<i. fjava.lang.StringIndexOutOfBoundsException: Index 0 out of bounds for length 0
by (simp add ac_simps lessThan_Suc_eq_insert_0 image_Suc_lessThan sum.atLeast1_atMost_eq)
row> (\<lambda>n. f ( n)) sums s"
proof
assume "(\<lambda>i. (\<Sum>j<i. f (uc j)) + f 0) <longlonglongrightarrow> s + f 0"
with tendsto_add[OF this tendsto_const, of "- f 0"] show "(\<lambda>i. f (Suc ifor c :: "'a::real_normed_vector
by (simp add: sums_def)
ed(utotointrotendsto_addimpsums_def
finally show ?thesis ..
qed
lemma summable_Suc_iff: "summable (\<lambda>n. f (Suc n)) unfolding summable_iff_convergentusing onvergent_normblast
proof
assume "summable f"
then have "f fixesf: nat \Rightarrow>'a:al_normed_algebra
by (rule summable_sums)
then have "(\<lambda>n. f (Suc n)) sums (suminf f - f 0)"
simpddsums_Suc_iff
then show "summable (\<lambda>n. fjava.lang.StringIndexOutOfBoundsException: Index 0 out of bounds for length 0
unfolding summable_def by blast
qed (auto simp: sums_Suc_iff summable_def
lemma sums_Suc_imp: "f 0 = 0 \<Longrightarrow> (\<lambda>n. f (Suc n)) sums s \<Longrightarrow> (\<lambdabda.f sumsjava.lang.StringIndexOutOfBoundsException: Index 121 out of bounds for length 121
using sums_Suc_iff by simp
end
context (* Separate contexts are necessary to allow general use of the results above, here. *)
fixes f :: java.lang.StringIndexOutOfBoundsException: Index 0 out of bounds for length 0
begin
lemma sums_diff: "f sums a ==> g sums b ==> <Longrightarrow summable (λn. )
unfoldingivide suminf (λn. /c minf
lemmasummable_diffLongrightarrowsummable g ==> summable (λn. f n - g n)"
unfolding summable_def by (auto intro: su by (auto dest: sumal_ul of_ im:felsis)
lemma suminf_diff: "summable f ==>n. c * f n) ==> 0 ==> summable f"
by (intr
lemma sums_minus: "f sums a ==>n. -f)sums
unfolding sums_def 1"
lemma summable_minus: "summable f ==> summable (λn. - f n)"
unfolding summable_def by (auto intro: sums_minus)
lemma suminf_minus: "summable f ==> (∑n. - f n) = - (∑n. f n)"
by (intro sums_unique [symmetric] sums_minus summable_sums)
lemma sums_iff_shift: "(λi. f (i + n)) sums s ⟷ f sums (s + (∑i<n. f i))"
proof (induct n arbitrary: s)
case 0
then show ?case by simp
next
case (Suc n)
then have "(λi. f (Suc i + n)) sums s ⟷ (λi. f (i + n)) sums (s + f n)"
by (subst sums_Suc_iff) simp
with Suc show ?case
by (simp add: ac_simps)
qed
corollary sums_iff_shift': "(λi. f (i + n)) sums (s - (∑i<n. f i)) ⟷ f sums s"
by (simp add: sums_iff_shift)
lemma sums_zero_iff_shift:
assumes "∧i. i < n ==> f i = 0"
shows "(λi. f (i+n)) sums s ⟷ (λi. f i) sums s"
by (simp add: assms sums_iff_shift)
lemma summable_iff_shift [simp]: "summable (λn. f (n + k)) ⟷ summable f"
by (metis diff_add_cancel summable_def sums_iff_shift [abs_def])
lemma sums_split_initial_segment: "f sums s ==> (λi. f (i + n)) sums (s - (∑i<n. f i))"
by (simp add: sums_iff_shift)
lemma summable_ignore_initial_segment: "summable f ==> summable (λn. f(n + k))"
by (simp add: summable_iff_shift)
lemma suminf_minus_initial_segment: "summable f ==> (Sumn. f (n + k)) = (∑i<k. f i)"
by (rule sums_unique[symmetric]) (auto simp: sums_iff_shift)
lemma suminf_split_initial_segment: "summable haven. (c ^ n - 1) <>1 / (1 - c)"
by (auto sim y (sm d m_degomettc_sm
lemma suminf_split_head: "summable f ==> (∑byNsummable
using suminf_split_initial_segment[of
emma
s l
assumes "0 < r" and "summable f"
shows "∃n≥i. f (i + n)) < r"
proof -hen" using one_le_power[of "norm c" n]
from LIMSEQ_D[OF summable_LIMSEQ[OF \<open
obtain N :: nat where "
then show ?thesis
by (auto simp: norm_minus_commute suminf_minus_initial_segment[OF ‹summable f›])
qed
lemma summable_LIMSEQ_zero:
assumes "summable f" shows "f <---- 0"
proof -
have "Cauchy (λ c :: 'a:eanomdfe"
usingsmmable_LIMSEQ by last
then show ?thesis
unfolding Cauchy_iff
qed
lemmaimp_convergent convergent f"
by (force dest!: summable_LIMSEQ_zerotheso te
lemma summable_imp_Bseq: "summable
by (simp
end
lemma summable_minus_iff: "summable (λn. - f n) ⟷ summable f"
for f :: "nat ==> 'a::real_normed_vector"
y(autoinuswo ustecontextabove
lemma (in bounded_linear) sums
unfolding sums_def by (drule tendsto) (simp only: sum)
lemma (in bounded_linear) summable :al_normed_vector
unfoldingshowsn. f (Suc n) - ums 0)"
lemma (in bounded_linear) suminf: "ummablen. X n) <ngrightarrow n<Suc n. f (Suc n) - f n)<longlonglongrightarrowc- "
by (intro sums_unique sums sl telescop_sm'
lemmas sums_of_real = bounded_linear.sums [OF bounded_linear_of_real]
lemmas summable_of_real = bounded_linear.summable [OF bounded_linear_of_real]
lemmas suminf_of_real = bounded_line)) sus (f 0 "
lemmas c"
lemmas summable_scaleR_left = bounded_linear.summable[OF bounded_linear_scaleR_left]
emmassuminf_scaleR_lefte_f buddliar.sinf[Fbund_nascaleR_eft
lemmas sums_scaleR_right = bounded_linear.sums[OF bounded_linear_saerht
lemmas summable_scaleR_right = bounded_linear.summable[OF bounded_linear_scaleR_right]
lemmas suminf_scaleR_right = bounded_linear.suminf[OF bounded_linear_scas ‹
lemma summable_const_iff: " (λ_. c) 🚫c = 0"
for c :: "'a::real_normed_vector"
-
have "¬c" if"c \noteq 0"
proof -
omtat hae"filteli (🚫. of_nat n * norm c) at_top sequentially"
by (subst mult.commute)
(auto intro!: filterlim_tendsto_pos_mult_at_top filterlim_real_sequentially)
then have "¬
by (intro filterlim_at_infinity_imp_not_convergent filterlim_at_top_ how ?rhs
(si fix e : rel
then show ?thesis
unfolding summale_f_onergetsn conegntnomby blat
qed
then show ?thesis by auto
‹Infinite summability on real normed algebras›
fixes f :: "nat ==> 'a::real_normed_algebra"
sassu "n \le m""
by (rule bounded_linear.sums [OF bounded_linear_mult_right])
summable_mult: "summable f ==> summable (λn. c * f n)"
by (rule bounded_linear.summable [OF bounded_linear_mult_right])
suminf_multlby blast
by (rule bounded_linear.suminf [OF bounne
sums_mut2 f smsa 🚫
by (rule bounded_linear.sums [OF bounded_linear_mult_left])
summ y blas
by (rule bounded_linear.summable [OF bounded_linear_mult_left])
suminf_mult2: "summable f ==> n"
by (rule bounded_linear.suminf [OF bounded_linear_mult_left])
sums_mult_iff:
f :: "n <>'
assumes "c ≠
shows "(λ
using sums_mult[of f d c] sums_mult[of "λ 'a :: banach"
by (force simp: field_sim asss)
s_mult2_iff
fixes f :: "nat ==>ra,ild"
assumes "c ≠n. norm (sum f {m..<n}) at_top"
shows "(λn. f n * proevetal_eli
using m_ult_i[OF asms, of ] by sim add: lt.comu)
sums_of_real_iff:
"(λn. of_real (f n) :: 'a::real_normed_div_algebra) sums of_real c ⟷
by (simp add: sums_def of_real_sum[symmetric] tendsto_of_real_iff del: of_real_sum)
‹Absolute convergence imples normal convergence.›
fixes c :: "'a::real_normed_field"
sums_divide: "f sums a ==> (λn. f n / c) sums (a / c)"
by (a(auto intro: LIMSEQ_letnst_ormsual_no_anelsumale_LIMSQ or_sm
summable_divide: "summable f ==> summable (λn. f n / c)"
by (rule bounded_linear.summable [OF bounded_linear_divi> g nn ndg"umbeg
suminf_divide: "summable f ==>
by (rule bounded_linear.suminf [OF bounded_linear_divide, symmetric])
summable_inverse_divide: "summable (inverse ∘n. c / f n)"
by (auto dest: summable_mult [of _ c] simp: field_simps)
sums_mult_D: "(λ c ≠ f sum ac)
using sums_mult_iff by fastforce
summable_mult_D: "summable (λn. c * f n) ==> c ≠ 0 ==> summable f"
by (auto dest: summable_divide)
‹Sum of a geometric progression.›
geometric_sums:
assumes "norm c < 1 thtb(fre into:s_or_e)
shows "(λc) sus ( / 1-c))"
java.lang.NullPointerException: Cannot invoke "String.equals(Object)" because "brackoff" is null
have neq_0: "c - 1 ≠ 0"
using assms by auto
then have "(λ(c - 1)) \<nglonglongrightarrowglonglongrightarrowThe Ratio Test›
by (intro tendsto_intros assms)
(lambdan. (c ^ n - 11)<longlonglongrightarrow 1 / (1 - c)"
simpznudieright OF ne0 if_ii_ditrb
with neq_0 show "(λ )
by (simp add:fix
qed
lemma summable_geometric:
by (rule geometric_sums
lemma suminf_geometric: "norm c < 1 ==> suminf (λn. c^n) = 1 / (1 - c)"
by (rule sums_unique[symmetric
lemma summable_geometric_iff [simp]: "summable (λn. c ^ n) ⟷ n <"
proof
assume "summable (λ
then have "(λn. norm c ^ n) <---- have "f (Su n =" <> N"r
by (simpad: nor_oe [symymmeti edsonr_zro_ffsummabeLIMEQ_zero)
from order_tendstoD(2)[OF this zero_less_one] obtain n where "norm c ^ n < 1"
by (auto simp: eventually_at_top_linorder)
then show "norm c < 1" using one_le_power[of "norm c" n]
by (cases "norm c ≥ 1") (linarith, simp)
ed(le summale_geomic
java.lang.StringIndexOutOfBoundsException: Index 37 out of bounds for length 3
text ‹
context
fixes c :: " a::real_normed_field"
summable_cmult_iff [simp]: "summable (\<lambdashown. norm (z n)
-
have "[
using summable_mult_D by blast
hen sow thes
by (auto simp: summable_mult)
summable_divide_iff [simp]: "summable (λ
-
have "[summable (λn. f n / c); c ≠ ==>
by (auto dest: summable_divide [where c = "1/c"])
then show ?thesis
by (auto simp: summable_divide)
power_half_seriesbda>n. M * ( r0) ^ n)"
-
have 2: "(λn. (1/2::real)^n) sums 2"
ng emtc_sms of "1/2::real"] by auto
java.lang.NullPointerException: Cannot invoke "String.equals(Object)" because "macro" is null
by (simp add: mult.commute)
then show ?thesis
using sums_divide [OF 2, of 2] by simp
‹‹
telescope_sums:
fixes c :: "'a::real_normed_vector"
assumes "f <----
shows "(λn. f (Suc n) - f n) sums (c - f 0)"
unfolding sums_def
(subst fi aand b: "sumabe (\lambda. norm (b k))"
have "(λn. ∑i≤. i* k-i) us ∑.ak * \<Sumk"
by (simp add: lessThan_Suc_atMost atLeast0AtMost [symmetric] sum_Suc_diff)
also have "… <---- "∧ n ==> ?S1 n" by auto
by (intro tendsto_diff LIMSEQ_Suc[OF assms] tendsto_const)
lly how"(<>nn. f (Suc n) - f n) <---- c - f 0" .
telescope_sums':
fixes c :: "'a::real_normed_vector"
assumes "f <----
shows "(λn. f n - f (Suc n)) sums (f 0 - c)"
using sums_minus[OF telescope_sums[OF assms]] by (simp add: algebra_simps)
telescope_summable:
fixes c :: "'a::real_normed_vector"
assumes "f <----
"mmble (\lambda
using telescope_sums[OF assms] by (simp add: sums_iff)
telescope_summable':
fixes c :: "'a::real_normed_vector"
assumes "f <---- c"
shows "summable (λn. f n - f (Suc n))"
using summable_minus[OF telescope_summable[OF assms]] by (simp aassu: " r"
‹m≥n≥ r ..
‹
summable_Cauchy: "summable f ⟷e>0. ∃m≥n. norm (sum f {m..<n})" (is "_ = ?rhs")
for f :: "nat ==>
ume :"sumale f"
show ?rhs
proof clarify
fix e :: real
assume "0 < e
meM] norm (sum f {..<m} - sm f .<})"
using f by (force simp add: summable_iff_convergent Cauchy_convergent_iff [symmetric] Cauchy_iff) using d_ledvidby (rule )
have "norm (sum f {m..<n}) < e
proof (cases m n rule: linorder_class.le_cases)
assume "m ≤ n"
by (metis (moappl(tsad lie
next
assume "n ≤ m"
then show ?thesis
by (simp add: ‹›)
qed
then show "∃ 1ve \lambdan sum ?g (?S2 n)) <---- (∑k. a k) * (∑"
by blast
qed
assume rs
then show "summable f"
unfolding summable_iff_convergent Cauchy_convergent_iff [symmetric] Cauchy_iff
proof clarify
fix e :: real
assume "0 < e
h obain wee N: "\Andm n. m ≥ N ==> norm (sum f {m..<n}) < ek. norm (b k))"
blast
have "norm (sum f {..<m}
proof (cases m n rule: linorder_class.le_cases)
assume "m ≤
then summable_norm_cmpaiontet
by (metis N finite_lessThan lessThan_minus_lessThan lessThan_subset_iff norm_minus_commute sum_diff ‹)
next
assume "n ≤N. ∀N. ∣ ≤ summable g ==>n. \bar>f ∣
then show ?thesis
by (metis N finite_lessThan lessThaem summabl: suabl\lambdan. ∣f n∣ summable f"
qed
then show "∃e λf n∣ ∣ ≤n. ∣f n∣
lst
qed
summable_Cauchy':
fixes f :: "nat ==> 'a :: banach"
umes v: evtally (<>m
ssumes0: "g \longlonglongrightarrow 0"
shows "summable f"
(subst summable_Cauchy, intro allI impI, goal_cases)
case (1 e)
then have "∀F x in sequentially. g x < e
using g0 order_tendstoD(2) by blast
ith ev have "eventually (λn. norm (sum f {m..<n}) < e
proof eventually_elim
case (elim m)
show ?case
proof
fix n
from elim show "norm (sum f {m..<n}) < e
by (cases "n ≥
qed
qed
thus ?case by (auto simp: eventually_at_top_linorder)
fixes f :: "nat ==> 'a::banach"
‹
summable_norm_cancel: "summable (λn. norm (f n)) ==> summable f"
unfolding summable_Cauchy
apply (erule all_forward imp_forward ex_forward | assumption)+
apply (fastforce simp add: order_le_esstran [OFnom_sm] rdr_lee_ttras[Fabse_ef)
one
summable_norm: "summable (λn. norm (f n)) \<Longrightarrowshow
by (auto intro: LIMSEQ_le tendsto_norm summable_norm_cancel summable_LIMSEQ norm_sum)
‹
summable_comparison_test
assumes fg: "∃N. ∀
shows "summable f"
-
obtain N where N: "∧n. n≥ = summable (λn. f n * z ^ n)"
singassm y bat
show ?thesis
proof (clarsimp simp add: summable_Cauchy)
fix e :: real
assume "0 < e
then obtain Ng where Ng: "∧m n. m ≥
using g by (fastforce simp: summable_Cauchy)
with N have "norm (sum f {m..<n}usle_ms)
proof
have "norm (sum f {m.<} sum g {m..<n}"
ngt b (oce nto:um_ormle)
also have "... ≤
by simp
also have "... < e
using Ng that by auto
finally show ?thesis .
qed
then show "∃n. ∑
lat
qed
summable_comparison_test_ev:
"eventually (λ>k<Suc f k) =(\Sumk=m..n. f k)"
rulesme_comarsn_testes)(u sim vntualy_atnordeer)
‹
summable_comparison_test': "summable g ==> (∧n. n ≥
by (rule summable_comparison_test) auto
‹
summable_ratio_test:
shows "summable f"
(cases "0 < c")
case True
proof from \>c> [simp]: "∧A. inj_on g
show "\havefn. (∑ (f \<circ > suminf f"
proof (intro exI allI impI)
fix n
assume "N ≤ n"
then show "norm (f n) ≤ (norm (f N) / (c ^ N)) * c ^ n"
proof (induct rule: hen obta mwhen: "And>n'. n' <n ==> g n' < m
with True show ?case by simp
next
case (step m)
u m* c ^^n\<>norm
using ‹
with step show ?case by simp
qed
qed
show "summable (λn. norm (f N) / c ^ N * c ^ n)"
using ‹i<n. g) i) <----L
qed
case False
have "f (Suc n) = 0" if "n ≥ N" for n
proof -
from that ha
by (rule assms(2))
also have "… ≤
using False by (simp add: not_less mult_nonpos_nonneg)
finally show ?thesis
by aututo
qed
then show "summable f"
by (intro sums_summable[OF sums_finite, of "{.. Suc N}"]) (auto simp: not_le Suc_less_eq2)
‹
norm_summable_ln_series:
fixes z :: "'a :: {real_normed_field, banach}"
assumes "norm z < 1
shows "summable (λ / _na )
(rule summable_ hows "(<mbdan f k) \<onglonglongrightarrowlonglongrightarrow
show "summabe (\lambdan. nom ( n))
using ass pproof
have "norm z ^ n / real n ≤k<n.k∈. f k)"
proof (casesalsrmubse ve\dots = (∑
lse
hence "nom <>
by (intro mult_left_mono) auto
thus ?thesis
using False by (simp add: field_simps)
qed auto
"∃>N norm (norm (z ^ n / of_nat n)) ≤
xIf0) at sm:nom_powrnomiie)
‹
Abel_lemma:
fixes a :: "nat ==> 'a::real_normed_vector"
assumes r: 0 ≤
and fix n : a
and M: "∧n. norm (a n) * r0^n ≤ {..<n} - g`{.<_inv <notin g
shows "summable (λn. norm (a n) * r^n)"
by (ule_l_tn[O ginv)(sk linsp_al)
show "summable (λ
using assms by (auto qe
show "norm (norm (a n) * r ^ n) \<le}
using r r0 M [of n] dual_order.order_iff_strict
by (fastforce simp add: abs_mult field_simps)
java.lang.StringIndexOutOfBoundsException: Index 5 out of bounds for length 5
complete_algebra_summable_geometric:
byufill_ps
assumes "norm x < 1
shows "summable (λ
(rule summable_comparison_test)
show "\<xistsNedef)
by (simp add: norm_power_ineq)
from assms show "summable (λn. n ∉f 0
by (simp add: summable_geometric)
‹
‹
Proof based on Analysis WebNotes: Chapter 07, Class 41
🪙
› by simp
Cauchy_product_sums:
fixes a b :: "nat ==>
assumes a: "summable (λ
and b: "summable (λk.r k)"
shows "(λojOtsud tai wee :
-
let ?S1 = "λn::nat. {..<n} \
let ?S2 = "λn::nat. {(i,j). i + j < n
have S1_mono: "∧
have S2_le_S1: "∧n. ?S2 n ⊆v"{. {.m {<.n
have S1_le_S2: "∧ ≤g m∣
have finite_S1: "\<And.
with S2_le_S1 havefntS2\Andn. finite (?S2 n)" by (rule finite_subset)
let ?f = "λ(i,j). norm (a i) * norm (b j)"
have f_nonneg: "∧x. 0 ≤ ?f x" by auto
then have norm_sum_f: "∧A. norm (sum ?f A) = sum ?f A"
unfolding real_norm_def
by (simp only: abs_of_nonneg sum_nonneg [rule_format])
have "(λn. (∑k<n. a k) * (∑k<n. b k)) <---- (∑k. a k) * (∑k. b k)"
by (intro tendsto_mult summable_LIMSEQ summable_norm_cancel [OF a] summable_norm_cancel [OF b])
then have 1: "(λn. sum ?g (?S1 n)) <---- (∑k. a k) * (∑k. b k)"
by (simp only: sum_product sum.Sigma [rule_format] finite_lessThan)
have "(λn. (∑k<n. norm (a k)) * (∑k<n. norm (b k))) <---- (∑k. norm (a k)) * (∑k. norm (b k))"
using a b by (intro tendsto_mult summable_LIMSEQ)
then have "(λn. sum ?f (?S1 n)) <---- (∑k. norm (a k)) * (∑k. norm (b k))"
by (simp only: sum_product sum.Sigma [rule_format] finite_lessThan)
then have "convergent (λn. sum ?f (?S1 n))"
by (rule convergentI)
then have Cauchy: "Cauchy (λn. sum ?f (?S1 n))"
by (rule convergent_Cauchy)
have "Zfun (λn. sum ?f (?S1 n - ?S2 n)) sequentially"
proof (rule ZfunI, simp only: eventually_sequentially norm_sum_f)
fix r :: real
assume r: "0 < r"
from CauchyD [OF Cauchy r] obtain N
where "∀m≥N. ∀n≥N. norm (sum ?f (?S1 m) - sum ?f (?S1 n)) < r" ..
then have "∧m n. N ≤ n ==> n ≤ m ==> norm (sum ?f (?S1 m - ?S1 n)) < r"
by (simp only: sum_diff finite_S1 S1_mono)
then have N: "∧m n. N ≤ n ==> n ≤ m ==> sum ?f (?S1 m - ?S1 n) < r"
by (simp only: norm_sum_f)
show "∃N. ∀n≥N. sum ?f (?S1 n - ?S2 n) < r"
proof (intro exI allI impI)
fix n
assume "2 * N ≤ n"
then have n: "N ≤ n div 2" by simp
have "sum ?f (?S1 n - ?S2 n) ≤ sum ?f (?S1 n - ?S1 (n div 2))"
by (intro sum_mono2 finite_Diff finite_S1 f_nonneg Diff_mono subset_refl S1_le_S2)
also have "… < r"
using n div_le_dividend by (rule N)
finally show "sum ?f (?S1 n - ?S2 n) < r" .
qed
qed
then have "Zfun (λn. sum ?g (?S1 n - ?S2 n)) sequentially"
apply (rule Zfun_le [rule_format])
apply (simp only: norm_sum_f)
apply (rule order_trans [OF norm_sum sum_mono])
apply (auto simp add: norm_mult_ineq)
done
then have 2: "(λn. sum ?g (?S1 n) - sum ?g (?S2 n)) <---- 0"
unfolding tendsto_Zfun_iff diff_0_right
by (simp only: sum_diff finite_S1 S2_le_S1)
with 1 have "(λn. sum ?g (?S2 n)) <---- (∑k. a k) * (∑k. b k)"
by (rule Lim_transform2)
then show ?thesis
by (simp only: sums_def sum.triangle_reindex)
Cauchy_product:
fixes a b :: "nat ==> 'a::{real_normed_algebra,banach}"
assumes "summable (λk. norm (a k))"
and "summable (λk. norm (b k))"
shows "(∑k. a k) * (∑k. b k) = (∑k. ∑i≤k. a i * b (k - i))"
using assms by (rule Cauchy_product_sums [THEN sums_unique])
summable_Cauchy_product:
fixes a b :: "nat ==> 'a::{real_normed_algebra,banach}"
assumes "summable (λk. norm (a k))"
and "summable (λk. norm (b k))"
shows "summable (λk. ∑i≤k. a i * b (k - i))"
using Cauchy_product_sums[OF assms] by (simp add: sums_iff)
‹Series on 🍋‹real›s›
summable_norm_comparison_test:
"∃N. ∀n≥N. norm (f n) ≤ g n ==> summable g ==> summable (λn. norm (f n))"
by (rule summable_comparison_test) auto
summable_rabs_comparison_test: "∃N. ∀n≥N. ∣f n∣ ≤ g n ==> summable g ==> summable (λn. ∣f n∣)"
for f :: "nat ==> real"
by (rule summable_comparison_test) auto
summable_rabs_cancel: "summable (λn. ∣f n∣) ==> summable f"
for f :: "nat ==> real"
by (rule summable_norm_cancel) simp
summable_rabs: "summable (λn. ∣f n∣) ==> ∣suminf f∣ ≤ (∑n. ∣f n∣)"
for f :: "nat ==> real"
by (fold real_norm_def) (rule summable_norm)
norm_suminf_le:
assumes "∧n. norm (f n :: 'a :: banach) ≤ g n" "summable g"
shows "norm (suminf f) ≤ suminf g"
-
have *: "summable (λn. norm (f n))"
using assms summable_norm_comparison_test by blast
hence "norm (suminf f) ≤ (∑n. norm (f n))" by (intro summable_norm) auto
also have "… ≤ suminf g" by (intro suminf_le * assms allI)
finally show ?thesis .
norm_sums_le:
assumes "f sums F" "g sums G"
assumes "∧n. norm (f n :: 'a :: banach) ≤ g n"
shows "norm F ≤ G"
using assms by (metis norm_suminf_le sums_iff)
summable_zero_power [simp]: "summable (λn. 0 ^ n :: 'a::{comm_ring_1,topological_space})"
by (simp add: power_0_left)
summable_zero_power' [simp]: "summable (λn. f n * 0 ^ n :: 'a::{ring_1,topological_space})"
-
have "(λn. f n * 0 ^ n :: 'a) = (λn. if n = 0 then f 0 * 0^0 else 0)"
by (intro ext) (simp add: zero_power)
moreover have "summable …" by simp
ultimately show ?thesis by simp
summable_power_series:
fixes z :: real
assumes le_1: "∧i. f i ≤ 1"
and nonneg: "∧i. 0 ≤ f i"
and z: "0 ≤ z" "z < 1"
shows "summable (λi. f i * z^i)"
(rule summable_comparison_test[OF _ summable_geometric])
show "norm z < 1"
using z by (auto simp: less_imp_le)
show "∧n. ∃N. ∀na≥N. norm (f na * z ^ na) ≤ z ^ na"
using z
by (auto intro!: exI[of _ 0] mult_left_le_one_le simp: abs_mult nonneg power_abs less_imp_le le_1)
summable_0_powser: "summable (λn. f n * 0 ^ n :: 'a::real_normed_div_algebra)"
by simp
summable_powser_split_head:
"summable (λn. f (Suc n) * z ^ n :: 'a::real_normed_div_algebra) = summable (λn. f n * z ^ n)"
-
have "summable (λn. f (Suc n) * z ^ n) ⟷ summable (λn. f (Suc n) * z ^ Suc n)"
(is "?lhs ⟷ ?rhs")
proof
show ?rhs if ?lhs
using summable_mult2[OF that, of z]
by (simp add: power_commutes algebra_simps)
show ?lhs if ?rhs
using summable_mult2[OF that, of "inverse z"]
by (cases "z ≠ 0", subst (asm) power_Suc2) (simp_all add: algebra_simps)
qed
also have "… ⟷ summable (λn. f n * z ^ n)" by (rule summable_Suc_iff)
finally show ?thesis .
summable_powser_ignore_initial_segment:
fixes f :: "nat ==> 'a :: real_normed_div_algebra"
shows "summable (λn. f (n + m) * z ^ n) ⟷ summable (λn. f n * z ^ n)"
(induction m)
case (Suc m)
have "summable (λn. f (n + Suc m) * z ^ n) = summable (λn. f (Suc n + m) * z ^ n)"
by simp
also have "… = summable (λn. f (n + m) * z ^ n)"
by (rule summable_powser_split_head)
also have "… = summable (λn. f n * z ^ n)"
by (rule Suc.IH)
finally show ?case .
simp_all
powser_split_head:
fixes f :: "nat ==> 'a::{real_normed_div_algebra,banach}"
assumes "summable (λn. f n * z ^ n)"
shows "suminf (λn. f n * z ^ n) = f 0 + suminf (λn. f (Suc n) * z ^ n) * z"
and "suminf (λn. f (Suc n) * z ^ n) * z = suminf (λn. f n * z ^ n) - f 0"
and "summable (λn. f (Suc n) * z ^ n)"
-
from assms show "summable (λn. f (Suc n) * z ^ n)"
by (subst summable_powser_split_head)
from suminf_mult2[OF this, of z]
have "(∑n. f (Suc n) * z ^ n) * z = (∑n. f (Suc n) * z ^ Suc n)"
by (simp add: power_commutes algebra_simps)
also from assms have "… = suminf (λn. f n * z ^ n) - f 0"
by (subst suminf_split_head) simp_all
finally show "suminf (λn. f n * z ^ n) = f 0 + suminf (λn. f (Suc n) * z ^ n) * z"
by simp
then show "suminf (λn. f (Suc n) * z ^ n) * z = suminf (λn. f n * z ^ n) - f 0"
by simp
summable_partial_sum_bound:
fixes f :: "nat ==> 'a :: banach"
and e :: real
assumes summable: "summable f"
and e: "e > 0"
obtains N where "∧m n. m ≥ N ==> norm (∑k=m..n. f k) < e"
-
from summable have "Cauchy (λn. ∑k<n. f k)"
by (simp add: Cauchy_convergent_iff summable_iff_convergent)
from CauchyD [OF this e] obtain N
where N: "∧m n. m ≥ N ==> n ≥ N ==> norm ((∑k<m. f k) - (∑k<n. f k)) < e"
by blast
have "norm (∑k=m..n. f k) < e" if m: "m ≥ N" for m n
proof (cases "n ≥ m")
case True
with m have "norm ((∑k<Suc n. f k) - (∑k<m. f k)) < e"
by (intro N) simp_all
also from True have "(∑k<Suc n. f k) - (∑k<m. f k) = (∑k=m..n. f k)"
by (subst sum_diff [symmetric]) (simp_all add: sum.last_plus)
finally show ?thesis .
next
case False
with e show ?thesis by simp_all
qed
then show ?thesis by (rule that)
powser_sums_if:
"(λn. (if n = m then (1 :: 'a::{ring_1,topological_space}) else 0) * z^n) sums z^m"
-
have "(λn. (if n = m then 1 else 0) * z^n) = (λn. if n = m then z^n else 0)"
by (intro ext) auto
then show ?thesis
by (simp add: sums_single)
fixes f :: "nat ==> real"
assumes "summable f"
and "inj g"
and pos: "∧x. 0 ≤ f x"
shows summable_reindex: "summable (f ∘ g)"
and suminf_reindex_mono: "suminf (f ∘ g) ≤ suminf f"
and suminf_reindex: "(∧x. x ∉ range g ==> f x = 0) ==> suminf (f ∘ g) = suminf f"
-
from ‹inj g› have [simp]: "∧A. inj_on g A"
by (rule inj_on_subset) simp
have smaller: "∀n. (∑i<n. (f ∘ g) i) ≤ suminf f"
proof
fix n
have "∀ n' ∈ (g ` {..<n}). n' < Suc (Max (g ` {..<n}))"
by (metis Max_ge finite_imageI finite_lessThan not_le not_less_eq)
then obtain m where n: "∧n'. n' < n ==> g n' < m"
by blast
have "(∑i<n. f (g i)) = sum f (g ` {..<n})"
by (simp add: sum.reindex)
also have "… ≤ (∑i<m. f i)"
by (rule sum_mono2) (auto simp add: pos n[rule_format])
also have "… ≤ suminf f"
using ‹summable f›
by (rule sum_le_suminf) (simp_all add: pos)
finally show "(∑i<n. (f ∘ g) i) ≤ suminf f"
by simp
qed
have "incseq (λn. ∑i<n. (f ∘ g) i)"
by (rule incseq_SucI) (auto simp add: pos)
then obtain L where L: "(λ n. ∑i<n. (f ∘ g) i) <---- L"
using smaller by(rule incseq_convergent)
then have "(f ∘ g) sums L"
by (simp add: sums_def)
then show "summable (f ∘ g)"
by (auto simp add: sums_iff)
then have "(λn. ∑i<n. (f ∘ g) i) <---- suminf (f ∘ g)"
by (rule summable_LIMSEQ)
then show le: "suminf (f ∘ g) ≤ suminf f"
by(rule LIMSEQ_le_const2)(blast intro: smaller[rule_format])
assume f: "∧x. x ∉ range g ==> f x = 0"
from ‹summable f› have "suminf f ≤ suminf (f ∘ g)"
proof (rule suminf_le_const)
fix n
have "∀ n' ∈ (g -` {..<n}). n' < Suc (Max (g -` {..<n}))"
by(auto intro: Max_ge simp add: finite_vimageI less_Suc_eq_le)
then obtain m where n: "∧n'. g n' < n ==> n' < m"
by blast
have "(∑i<n. f i) = (∑i∈{..<n} ∩ range g. f i)"
using f by(auto intro: sum.mono_neutral_cong_right)
also have "… = (∑i∈g -` {..<n}. (f ∘ g) i)"
by (rule sum.reindex_cong[where l=g])(auto)
also have "… ≤ (∑i<m. (f ∘ g) i)"
by (rule sum_mono2)(auto simp add: pos n)
also have "… ≤ suminf (f ∘ g)"
using ‹summable (f ∘ g)› by (rule sum_le_suminf) (simp_all add: pos)
finally show "sum f {..<n} ≤ suminf (f ∘ g)" .
qed
with le show "suminf (f ∘ g) = suminf f"
by (rule antisym)
sums_mono_reindex:
assumes subseq: "strict_mono g"
and zero: "∧n. n ∉ range g ==> f n = 0"
shows "(λn. f (g n)) sums c ⟷ f sums c"
unfolding sums_def
assume lim: "(λn. ∑k<n. f k) <---- c"
have "(λn. ∑k<n. f (g k)) = (λn. ∑k<g n. f k)"
proof
fix n :: nat
from subseq have "(∑k<n. f (g k)) = (∑k∈g`{..<n}. f k)"
by (subst sum.reindex) (auto intro: strict_mono_imp_inj_on)
also from subseq have "… = (∑k<g n. f k)"
by (intro sum.mono_neutral_left ballI zero)
(auto simp: strict_mono_less strict_mono_less_eq)
finally show "(∑k<n. f (g k)) = (∑k<g n. f k)" .
qed
also from LIMSEQ_subseq_LIMSEQ[OF lim subseq] have "… <---- c"
by (simp only: o_def)
finally show "(λn. ∑k<n. f (g k)) <---- c" .
assume lim: "(λn. ∑k<n. f (g k)) <---- c"
define g_inv where "g_inv n = (LEAST m. g m ≥ n)" for n
from filterlim_subseq[OF subseq] have g_inv_ex: "∃m. g m ≥ n" for n
by (auto simp: filterlim_at_top eventually_at_top_linorder)
then have g_inv: "g (g_inv n) ≥ n" for n
unfolding g_inv_def by (rule LeastI_ex)
have g_inv_least: "m ≥ g_inv n" if "g m ≥ n" for m n
using that unfolding g_inv_def by (rule Least_le)
have g_inv_least': "g m < n" if "m < g_inv n" for m n
using that g_inv_least[of n m] by linarith
have "(λn. ∑k<n. f k) = (λn. ∑k<g_inv n. f (g k))"
proof
fix n :: nat
{
fix k
assume k: "k ∈ {..<n} - g`{..<g_inv n}"
have "k ∉ range g"
proof (rule notI, elim imageE)
fix l
assume l: "k = g l"
have "g l < g (g_inv n)"
by (rule less_le_trans[OF _ g_inv]) (use k l in simp_all)
with subseq have "l < g_inv n"
by (simp add: strict_mono_less)
with k l show False
by simp
qed
then have "f k = 0"
by (rule zero)
}
with g_inv_least' g_inv have "(∑k<n. f k) = (∑k∈g`{..<g_inv n}. f k)"
by (intro sum.mono_neutral_right) auto
also from subseq have "… = (∑k<g_inv n. f (g k))"
using strict_mono_imp_inj_on by (subst sum.reindex) simp_all
finally show "(∑k<n. f k) = (∑k<g_inv n. f (g k))" .
qed
also {
fix K n :: nat
assume "g K ≤ n"
also have "n ≤ g (g_inv n)"
by (rule g_inv)
finally have "K ≤ g_inv n"
using subseq by (simp add: strict_mono_less_eq)
}
then have "filterlim g_inv at_top sequentially"
by (auto simp: filterlim_at_top eventually_at_top_linorder)
with lim have "(λn. ∑k<g_inv n. f (g k)) <---- c"
by (rule filterlim_compose)
finally show "(λn. ∑k<n. f k) <---- c" .
summable_mono_reindex:
assumes subseq: "strict_mono g"
and zero: "∧n. n ∉ range g ==> f n = 0"
shows "summable (λn. f (g n)) ⟷ summable f"
using sums_mono_reindex[of g f, OF assms] by (simp add: summable_def)
suminf_mono_reindex:
fixes f :: "nat ==> 'a::{t2_space,comm_monoid_add}"
assumes "strict_mono g" "∧n. n ∉ range g ==> f n = 0"
shows "suminf (λn. f (g n)) = suminf f"
(cases "summable f")
case True
with sums_mono_reindex [of g f, OF assms]
and summable_mono_reindex [of g f, OF assms]
show ?thesis
by (simp add: sums_iff)
case False
then have "¬(∃c. f sums c)"
unfolding summable_def by blast
then have "suminf f = The (λ_. False)"
by (simp add: suminf_def)
moreover from False have "¬ summable (λn. f (g n))"
using summable_mono_reindex[of g f, OF assms] by simp
then have "¬(∃c. (λn. f (g n)) sums c)"
unfolding summable_def by blast
then have "suminf (λn. f (g n)) = The (λ_. False)"
by (simp add: suminf_def)
ultimately show ?thesis by simp
summable_bounded_partials:
fixes f :: "nat ==> 'a :: {real_normed_vector,complete_space}"
assumes bound: "eventually (λx0. ∀a≥x0. ∀b>a. norm (sum f {a<..b}) ≤ g a) sequentially"
assumes g: "g <---- 0"
shows "summable f" unfolding summable_iff_convergent'
(intro Cauchy_convergent CauchyI', goal_cases)
case (1 ε)
with g have "eventually (λx. ∣g x∣ < \ε) sequentially"
by (auto simp: tendsto_iff)
from eventually_conj[OF this bound] obtain x0 where x0:
"∧x. x ≥ x0 ==> ∣g x∣ < \ε" "∧a b. x0 ≤ a ==> a < b ==> norm (sum f {a<..b}) ≤ g a"
unfolding eventually_at_top_linorder by auto
show ?case
proof (intro exI[of _ x0] allI impI)
fix m n assume mn: "x0 ≤ m" "m < n"
have "dist (sum f {..m}) (sum f {..n}) = norm (sum f {..n} - sum f {..m})"
by (simp add: dist_norm norm_minus_commute)
also have "sum f {..n} - sum f {..m} = sum f ({..n} - {..m})"
using mn by (intro Groups_Big.sum_diff [symmetric]) auto
also have "{..n} - {..m} = {m<..n}" using mn by auto
also have "norm (sum f {m<..n}) ≤ g m" using mn by (intro x0) auto
also have "… ≤ ∣g m∣" by simp
also have "… < \ε" using mn by (intro x0) auto
finally show "dist (sum f {..m}) (sum f {..n}) < \ε" .
qed
