moved 'fundef_cong' attribute (and other basic 'fun' stuff) up the dependency chain
(* Title: HOL/Set_Interval.thy
Author: Tobias Nipkow
Author: Clemens Ballarin
Author: Jeremy Avigad
lessThan, greaterThan, atLeast, atMost and two-sided intervals
Modern convention: Ixy stands for an interval where x and y
describe the lower and upper bound and x,y : {c,o,i}
where c = closed, o = open, i = infinite.
Examples: Ico = {_ ..< _} and Ici = {_ ..}
*)
header {* Set intervals *}
theory Set_Interval
imports Nat_Transfer
begin
context ord
begin
definition
lessThan :: "'a => 'a set" ("(1{..<_})") where
"{..<u} == {x. x < u}"
definition
atMost :: "'a => 'a set" ("(1{.._})") where
"{..u} == {x. x \<le> u}"
definition
greaterThan :: "'a => 'a set" ("(1{_<..})") where
"{l<..} == {x. l<x}"
definition
atLeast :: "'a => 'a set" ("(1{_..})") where
"{l..} == {x. l\<le>x}"
definition
greaterThanLessThan :: "'a => 'a => 'a set" ("(1{_<..<_})") where
"{l<..<u} == {l<..} Int {..<u}"
definition
atLeastLessThan :: "'a => 'a => 'a set" ("(1{_..<_})") where
"{l..<u} == {l..} Int {..<u}"
definition
greaterThanAtMost :: "'a => 'a => 'a set" ("(1{_<.._})") where
"{l<..u} == {l<..} Int {..u}"
definition
atLeastAtMost :: "'a => 'a => 'a set" ("(1{_.._})") where
"{l..u} == {l..} Int {..u}"
end
text{* A note of warning when using @{term"{..<n}"} on type @{typ
nat}: it is equivalent to @{term"{0::nat..<n}"} but some lemmas involving
@{term"{m..<n}"} may not exist in @{term"{..<n}"}-form as well. *}
syntax
"_UNION_le" :: "'a => 'a => 'b set => 'b set" ("(3UN _<=_./ _)" [0, 0, 10] 10)
"_UNION_less" :: "'a => 'a => 'b set => 'b set" ("(3UN _<_./ _)" [0, 0, 10] 10)
"_INTER_le" :: "'a => 'a => 'b set => 'b set" ("(3INT _<=_./ _)" [0, 0, 10] 10)
"_INTER_less" :: "'a => 'a => 'b set => 'b set" ("(3INT _<_./ _)" [0, 0, 10] 10)
syntax (xsymbols)
"_UNION_le" :: "'a => 'a => 'b set => 'b set" ("(3\<Union> _\<le>_./ _)" [0, 0, 10] 10)
"_UNION_less" :: "'a => 'a => 'b set => 'b set" ("(3\<Union> _<_./ _)" [0, 0, 10] 10)
"_INTER_le" :: "'a => 'a => 'b set => 'b set" ("(3\<Inter> _\<le>_./ _)" [0, 0, 10] 10)
"_INTER_less" :: "'a => 'a => 'b set => 'b set" ("(3\<Inter> _<_./ _)" [0, 0, 10] 10)
syntax (latex output)
"_UNION_le" :: "'a \<Rightarrow> 'a => 'b set => 'b set" ("(3\<Union>(00_ \<le> _)/ _)" [0, 0, 10] 10)
"_UNION_less" :: "'a \<Rightarrow> 'a => 'b set => 'b set" ("(3\<Union>(00_ < _)/ _)" [0, 0, 10] 10)
"_INTER_le" :: "'a \<Rightarrow> 'a => 'b set => 'b set" ("(3\<Inter>(00_ \<le> _)/ _)" [0, 0, 10] 10)
"_INTER_less" :: "'a \<Rightarrow> 'a => 'b set => 'b set" ("(3\<Inter>(00_ < _)/ _)" [0, 0, 10] 10)
translations
"UN i<=n. A" == "UN i:{..n}. A"
"UN i<n. A" == "UN i:{..<n}. A"
"INT i<=n. A" == "INT i:{..n}. A"
"INT i<n. A" == "INT i:{..<n}. A"
subsection {* Various equivalences *}
lemma (in ord) lessThan_iff [iff]: "(i: lessThan k) = (i<k)"
by (simp add: lessThan_def)
lemma Compl_lessThan [simp]:
"!!k:: 'a::linorder. -lessThan k = atLeast k"
apply (auto simp add: lessThan_def atLeast_def)
done
lemma single_Diff_lessThan [simp]: "!!k:: 'a::order. {k} - lessThan k = {k}"
by auto
lemma (in ord) greaterThan_iff [iff]: "(i: greaterThan k) = (k<i)"
by (simp add: greaterThan_def)
lemma Compl_greaterThan [simp]:
"!!k:: 'a::linorder. -greaterThan k = atMost k"
by (auto simp add: greaterThan_def atMost_def)
lemma Compl_atMost [simp]: "!!k:: 'a::linorder. -atMost k = greaterThan k"
apply (subst Compl_greaterThan [symmetric])
apply (rule double_complement)
done
lemma (in ord) atLeast_iff [iff]: "(i: atLeast k) = (k<=i)"
by (simp add: atLeast_def)
lemma Compl_atLeast [simp]:
"!!k:: 'a::linorder. -atLeast k = lessThan k"
by (auto simp add: lessThan_def atLeast_def)
lemma (in ord) atMost_iff [iff]: "(i: atMost k) = (i<=k)"
by (simp add: atMost_def)
lemma atMost_Int_atLeast: "!!n:: 'a::order. atMost n Int atLeast n = {n}"
by (blast intro: order_antisym)
lemma (in linorder) lessThan_Int_lessThan: "{ a <..} \<inter> { b <..} = { max a b <..}"
by auto
lemma (in linorder) greaterThan_Int_greaterThan: "{..< a} \<inter> {..< b} = {..< min a b}"
by auto
subsection {* Logical Equivalences for Set Inclusion and Equality *}
lemma atLeast_subset_iff [iff]:
"(atLeast x \<subseteq> atLeast y) = (y \<le> (x::'a::order))"
by (blast intro: order_trans)
lemma atLeast_eq_iff [iff]:
"(atLeast x = atLeast y) = (x = (y::'a::linorder))"
by (blast intro: order_antisym order_trans)
lemma greaterThan_subset_iff [iff]:
"(greaterThan x \<subseteq> greaterThan y) = (y \<le> (x::'a::linorder))"
apply (auto simp add: greaterThan_def)
apply (subst linorder_not_less [symmetric], blast)
done
lemma greaterThan_eq_iff [iff]:
"(greaterThan x = greaterThan y) = (x = (y::'a::linorder))"
apply (rule iffI)
apply (erule equalityE)
apply simp_all
done
lemma atMost_subset_iff [iff]: "(atMost x \<subseteq> atMost y) = (x \<le> (y::'a::order))"
by (blast intro: order_trans)
lemma atMost_eq_iff [iff]: "(atMost x = atMost y) = (x = (y::'a::linorder))"
by (blast intro: order_antisym order_trans)
lemma lessThan_subset_iff [iff]:
"(lessThan x \<subseteq> lessThan y) = (x \<le> (y::'a::linorder))"
apply (auto simp add: lessThan_def)
apply (subst linorder_not_less [symmetric], blast)
done
lemma lessThan_eq_iff [iff]:
"(lessThan x = lessThan y) = (x = (y::'a::linorder))"
apply (rule iffI)
apply (erule equalityE)
apply simp_all
done
lemma lessThan_strict_subset_iff:
fixes m n :: "'a::linorder"
shows "{..<m} < {..<n} \<longleftrightarrow> m < n"
by (metis leD lessThan_subset_iff linorder_linear not_less_iff_gr_or_eq psubset_eq)
subsection {*Two-sided intervals*}
context ord
begin
lemma greaterThanLessThan_iff [simp]:
"(i : {l<..<u}) = (l < i & i < u)"
by (simp add: greaterThanLessThan_def)
lemma atLeastLessThan_iff [simp]:
"(i : {l..<u}) = (l <= i & i < u)"
by (simp add: atLeastLessThan_def)
lemma greaterThanAtMost_iff [simp]:
"(i : {l<..u}) = (l < i & i <= u)"
by (simp add: greaterThanAtMost_def)
lemma atLeastAtMost_iff [simp]:
"(i : {l..u}) = (l <= i & i <= u)"
by (simp add: atLeastAtMost_def)
text {* The above four lemmas could be declared as iffs. Unfortunately this
breaks many proofs. Since it only helps blast, it is better to leave them
alone. *}
lemma greaterThanLessThan_eq: "{ a <..< b} = { a <..} \<inter> {..< b }"
by auto
end
subsubsection{* Emptyness, singletons, subset *}
context order
begin
lemma atLeastatMost_empty[simp]:
"b < a \<Longrightarrow> {a..b} = {}"
by(auto simp: atLeastAtMost_def atLeast_def atMost_def)
lemma atLeastatMost_empty_iff[simp]:
"{a..b} = {} \<longleftrightarrow> (~ a <= b)"
by auto (blast intro: order_trans)
lemma atLeastatMost_empty_iff2[simp]:
"{} = {a..b} \<longleftrightarrow> (~ a <= b)"
by auto (blast intro: order_trans)
lemma atLeastLessThan_empty[simp]:
"b <= a \<Longrightarrow> {a..<b} = {}"
by(auto simp: atLeastLessThan_def)
lemma atLeastLessThan_empty_iff[simp]:
"{a..<b} = {} \<longleftrightarrow> (~ a < b)"
by auto (blast intro: le_less_trans)
lemma atLeastLessThan_empty_iff2[simp]:
"{} = {a..<b} \<longleftrightarrow> (~ a < b)"
by auto (blast intro: le_less_trans)
lemma greaterThanAtMost_empty[simp]: "l \<le> k ==> {k<..l} = {}"
by(auto simp:greaterThanAtMost_def greaterThan_def atMost_def)
lemma greaterThanAtMost_empty_iff[simp]: "{k<..l} = {} \<longleftrightarrow> ~ k < l"
by auto (blast intro: less_le_trans)
lemma greaterThanAtMost_empty_iff2[simp]: "{} = {k<..l} \<longleftrightarrow> ~ k < l"
by auto (blast intro: less_le_trans)
lemma greaterThanLessThan_empty[simp]:"l \<le> k ==> {k<..<l} = {}"
by(auto simp:greaterThanLessThan_def greaterThan_def lessThan_def)
lemma atLeastAtMost_singleton [simp]: "{a..a} = {a}"
by (auto simp add: atLeastAtMost_def atMost_def atLeast_def)
lemma atLeastAtMost_singleton': "a = b \<Longrightarrow> {a .. b} = {a}" by simp
lemma atLeastatMost_subset_iff[simp]:
"{a..b} <= {c..d} \<longleftrightarrow> (~ a <= b) | c <= a & b <= d"
unfolding atLeastAtMost_def atLeast_def atMost_def
by (blast intro: order_trans)
lemma atLeastatMost_psubset_iff:
"{a..b} < {c..d} \<longleftrightarrow>
((~ a <= b) | c <= a & b <= d & (c < a | b < d)) & c <= d"
by(simp add: psubset_eq set_eq_iff less_le_not_le)(blast intro: order_trans)
lemma Icc_eq_Icc[simp]:
"{l..h} = {l'..h'} = (l=l' \<and> h=h' \<or> \<not> l\<le>h \<and> \<not> l'\<le>h')"
by(simp add: order_class.eq_iff)(auto intro: order_trans)
lemma atLeastAtMost_singleton_iff[simp]:
"{a .. b} = {c} \<longleftrightarrow> a = b \<and> b = c"
proof
assume "{a..b} = {c}"
hence *: "\<not> (\<not> a \<le> b)" unfolding atLeastatMost_empty_iff[symmetric] by simp
with `{a..b} = {c}` have "c \<le> a \<and> b \<le> c" by auto
with * show "a = b \<and> b = c" by auto
qed simp
lemma Icc_subset_Ici_iff[simp]:
"{l..h} \<subseteq> {l'..} = (~ l\<le>h \<or> l\<ge>l')"
by(auto simp: subset_eq intro: order_trans)
lemma Icc_subset_Iic_iff[simp]:
"{l..h} \<subseteq> {..h'} = (~ l\<le>h \<or> h\<le>h')"
by(auto simp: subset_eq intro: order_trans)
lemma not_Ici_eq_empty[simp]: "{l..} \<noteq> {}"
by(auto simp: set_eq_iff)
lemma not_Iic_eq_empty[simp]: "{..h} \<noteq> {}"
by(auto simp: set_eq_iff)
lemmas not_empty_eq_Ici_eq_empty[simp] = not_Ici_eq_empty[symmetric]
lemmas not_empty_eq_Iic_eq_empty[simp] = not_Iic_eq_empty[symmetric]
end
context no_top
begin
(* also holds for no_bot but no_top should suffice *)
lemma not_UNIV_le_Icc[simp]: "\<not> UNIV \<subseteq> {l..h}"
using gt_ex[of h] by(auto simp: subset_eq less_le_not_le)
lemma not_UNIV_le_Iic[simp]: "\<not> UNIV \<subseteq> {..h}"
using gt_ex[of h] by(auto simp: subset_eq less_le_not_le)
lemma not_Ici_le_Icc[simp]: "\<not> {l..} \<subseteq> {l'..h'}"
using gt_ex[of h']
by(auto simp: subset_eq less_le)(blast dest:antisym_conv intro: order_trans)
lemma not_Ici_le_Iic[simp]: "\<not> {l..} \<subseteq> {..h'}"
using gt_ex[of h']
by(auto simp: subset_eq less_le)(blast dest:antisym_conv intro: order_trans)
end
context no_bot
begin
lemma not_UNIV_le_Ici[simp]: "\<not> UNIV \<subseteq> {l..}"
using lt_ex[of l] by(auto simp: subset_eq less_le_not_le)
lemma not_Iic_le_Icc[simp]: "\<not> {..h} \<subseteq> {l'..h'}"
using lt_ex[of l']
by(auto simp: subset_eq less_le)(blast dest:antisym_conv intro: order_trans)
lemma not_Iic_le_Ici[simp]: "\<not> {..h} \<subseteq> {l'..}"
using lt_ex[of l']
by(auto simp: subset_eq less_le)(blast dest:antisym_conv intro: order_trans)
end
context no_top
begin
(* also holds for no_bot but no_top should suffice *)
lemma not_UNIV_eq_Icc[simp]: "\<not> UNIV = {l'..h'}"
using gt_ex[of h'] by(auto simp: set_eq_iff less_le_not_le)
lemmas not_Icc_eq_UNIV[simp] = not_UNIV_eq_Icc[symmetric]
lemma not_UNIV_eq_Iic[simp]: "\<not> UNIV = {..h'}"
using gt_ex[of h'] by(auto simp: set_eq_iff less_le_not_le)
lemmas not_Iic_eq_UNIV[simp] = not_UNIV_eq_Iic[symmetric]
lemma not_Icc_eq_Ici[simp]: "\<not> {l..h} = {l'..}"
unfolding atLeastAtMost_def using not_Ici_le_Iic[of l'] by blast
lemmas not_Ici_eq_Icc[simp] = not_Icc_eq_Ici[symmetric]
(* also holds for no_bot but no_top should suffice *)
lemma not_Iic_eq_Ici[simp]: "\<not> {..h} = {l'..}"
using not_Ici_le_Iic[of l' h] by blast
lemmas not_Ici_eq_Iic[simp] = not_Iic_eq_Ici[symmetric]
end
context no_bot
begin
lemma not_UNIV_eq_Ici[simp]: "\<not> UNIV = {l'..}"
using lt_ex[of l'] by(auto simp: set_eq_iff less_le_not_le)
lemmas not_Ici_eq_UNIV[simp] = not_UNIV_eq_Ici[symmetric]
lemma not_Icc_eq_Iic[simp]: "\<not> {l..h} = {..h'}"
unfolding atLeastAtMost_def using not_Iic_le_Ici[of h'] by blast
lemmas not_Iic_eq_Icc[simp] = not_Icc_eq_Iic[symmetric]
end
context dense_linorder
begin
lemma greaterThanLessThan_empty_iff[simp]:
"{ a <..< b } = {} \<longleftrightarrow> b \<le> a"
using dense[of a b] by (cases "a < b") auto
lemma greaterThanLessThan_empty_iff2[simp]:
"{} = { a <..< b } \<longleftrightarrow> b \<le> a"
using dense[of a b] by (cases "a < b") auto
lemma atLeastLessThan_subseteq_atLeastAtMost_iff:
"{a ..< b} \<subseteq> { c .. d } \<longleftrightarrow> (a < b \<longrightarrow> c \<le> a \<and> b \<le> d)"
using dense[of "max a d" "b"]
by (force simp: subset_eq Ball_def not_less[symmetric])
lemma greaterThanAtMost_subseteq_atLeastAtMost_iff:
"{a <.. b} \<subseteq> { c .. d } \<longleftrightarrow> (a < b \<longrightarrow> c \<le> a \<and> b \<le> d)"
using dense[of "a" "min c b"]
by (force simp: subset_eq Ball_def not_less[symmetric])
lemma greaterThanLessThan_subseteq_atLeastAtMost_iff:
"{a <..< b} \<subseteq> { c .. d } \<longleftrightarrow> (a < b \<longrightarrow> c \<le> a \<and> b \<le> d)"
using dense[of "a" "min c b"] dense[of "max a d" "b"]
by (force simp: subset_eq Ball_def not_less[symmetric])
lemma atLeastAtMost_subseteq_atLeastLessThan_iff:
"{a .. b} \<subseteq> { c ..< d } \<longleftrightarrow> (a \<le> b \<longrightarrow> c \<le> a \<and> b < d)"
using dense[of "max a d" "b"]
by (force simp: subset_eq Ball_def not_less[symmetric])
lemma greaterThanAtMost_subseteq_atLeastLessThan_iff:
"{a <.. b} \<subseteq> { c ..< d } \<longleftrightarrow> (a < b \<longrightarrow> c \<le> a \<and> b < d)"
using dense[of "a" "min c b"]
by (force simp: subset_eq Ball_def not_less[symmetric])
lemma greaterThanLessThan_subseteq_atLeastLessThan_iff:
"{a <..< b} \<subseteq> { c ..< d } \<longleftrightarrow> (a < b \<longrightarrow> c \<le> a \<and> b \<le> d)"
using dense[of "a" "min c b"] dense[of "max a d" "b"]
by (force simp: subset_eq Ball_def not_less[symmetric])
end
context no_top
begin
lemma greaterThan_non_empty[simp]: "{x <..} \<noteq> {}"
using gt_ex[of x] by auto
end
context no_bot
begin
lemma lessThan_non_empty[simp]: "{..< x} \<noteq> {}"
using lt_ex[of x] by auto
end
lemma (in linorder) atLeastLessThan_subset_iff:
"{a..<b} <= {c..<d} \<Longrightarrow> b <= a | c<=a & b<=d"
apply (auto simp:subset_eq Ball_def)
apply(frule_tac x=a in spec)
apply(erule_tac x=d in allE)
apply (simp add: less_imp_le)
done
lemma atLeastLessThan_inj:
fixes a b c d :: "'a::linorder"
assumes eq: "{a ..< b} = {c ..< d}" and "a < b" "c < d"
shows "a = c" "b = d"
using assms by (metis atLeastLessThan_subset_iff eq less_le_not_le linorder_antisym_conv2 subset_refl)+
lemma atLeastLessThan_eq_iff:
fixes a b c d :: "'a::linorder"
assumes "a < b" "c < d"
shows "{a ..< b} = {c ..< d} \<longleftrightarrow> a = c \<and> b = d"
using atLeastLessThan_inj assms by auto
lemma (in order_bot) atLeast_eq_UNIV_iff: "{x..} = UNIV \<longleftrightarrow> x = bot"
by (auto simp: set_eq_iff intro: le_bot)
lemma (in order_top) atMost_eq_UNIV_iff: "{..x} = UNIV \<longleftrightarrow> x = top"
by (auto simp: set_eq_iff intro: top_le)
lemma (in bounded_lattice) atLeastAtMost_eq_UNIV_iff:
"{x..y} = UNIV \<longleftrightarrow> (x = bot \<and> y = top)"
by (auto simp: set_eq_iff intro: top_le le_bot)
subsubsection {* Intersection *}
context linorder
begin
lemma Int_atLeastAtMost[simp]: "{a..b} Int {c..d} = {max a c .. min b d}"
by auto
lemma Int_atLeastAtMostR1[simp]: "{..b} Int {c..d} = {c .. min b d}"
by auto
lemma Int_atLeastAtMostR2[simp]: "{a..} Int {c..d} = {max a c .. d}"
by auto
lemma Int_atLeastAtMostL1[simp]: "{a..b} Int {..d} = {a .. min b d}"
by auto
lemma Int_atLeastAtMostL2[simp]: "{a..b} Int {c..} = {max a c .. b}"
by auto
lemma Int_atLeastLessThan[simp]: "{a..<b} Int {c..<d} = {max a c ..< min b d}"
by auto
lemma Int_greaterThanAtMost[simp]: "{a<..b} Int {c<..d} = {max a c <.. min b d}"
by auto
lemma Int_greaterThanLessThan[simp]: "{a<..<b} Int {c<..<d} = {max a c <..< min b d}"
by auto
lemma Int_atMost[simp]: "{..a} \<inter> {..b} = {.. min a b}"
by (auto simp: min_def)
end
context complete_lattice
begin
lemma
shows Sup_atLeast[simp]: "Sup {x ..} = top"
and Sup_greaterThanAtLeast[simp]: "x < top \<Longrightarrow> Sup {x <..} = top"
and Sup_atMost[simp]: "Sup {.. y} = y"
and Sup_atLeastAtMost[simp]: "x \<le> y \<Longrightarrow> Sup { x .. y} = y"
and Sup_greaterThanAtMost[simp]: "x < y \<Longrightarrow> Sup { x <.. y} = y"
by (auto intro!: Sup_eqI)
lemma
shows Inf_atMost[simp]: "Inf {.. x} = bot"
and Inf_atMostLessThan[simp]: "top < x \<Longrightarrow> Inf {..< x} = bot"
and Inf_atLeast[simp]: "Inf {x ..} = x"
and Inf_atLeastAtMost[simp]: "x \<le> y \<Longrightarrow> Inf { x .. y} = x"
and Inf_atLeastLessThan[simp]: "x < y \<Longrightarrow> Inf { x ..< y} = x"
by (auto intro!: Inf_eqI)
end
lemma
fixes x y :: "'a :: {complete_lattice, dense_linorder}"
shows Sup_lessThan[simp]: "Sup {..< y} = y"
and Sup_atLeastLessThan[simp]: "x < y \<Longrightarrow> Sup { x ..< y} = y"
and Sup_greaterThanLessThan[simp]: "x < y \<Longrightarrow> Sup { x <..< y} = y"
and Inf_greaterThan[simp]: "Inf {x <..} = x"
and Inf_greaterThanAtMost[simp]: "x < y \<Longrightarrow> Inf { x <.. y} = x"
and Inf_greaterThanLessThan[simp]: "x < y \<Longrightarrow> Inf { x <..< y} = x"
by (auto intro!: Inf_eqI Sup_eqI intro: dense_le dense_le_bounded dense_ge dense_ge_bounded)
subsection {* Intervals of natural numbers *}
subsubsection {* The Constant @{term lessThan} *}
lemma lessThan_0 [simp]: "lessThan (0::nat) = {}"
by (simp add: lessThan_def)
lemma lessThan_Suc: "lessThan (Suc k) = insert k (lessThan k)"
by (simp add: lessThan_def less_Suc_eq, blast)
text {* The following proof is convenient in induction proofs where
new elements get indices at the beginning. So it is used to transform
@{term "{..<Suc n}"} to @{term "0::nat"} and @{term "{..< n}"}. *}
lemma lessThan_Suc_eq_insert_0: "{..<Suc n} = insert 0 (Suc ` {..<n})"
proof safe
fix x assume "x < Suc n" "x \<notin> Suc ` {..<n}"
then have "x \<noteq> Suc (x - 1)" by auto
with `x < Suc n` show "x = 0" by auto
qed
lemma lessThan_Suc_atMost: "lessThan (Suc k) = atMost k"
by (simp add: lessThan_def atMost_def less_Suc_eq_le)
lemma UN_lessThan_UNIV: "(UN m::nat. lessThan m) = UNIV"
by blast
subsubsection {* The Constant @{term greaterThan} *}
lemma greaterThan_0 [simp]: "greaterThan 0 = range Suc"
apply (simp add: greaterThan_def)
apply (blast dest: gr0_conv_Suc [THEN iffD1])
done
lemma greaterThan_Suc: "greaterThan (Suc k) = greaterThan k - {Suc k}"
apply (simp add: greaterThan_def)
apply (auto elim: linorder_neqE)
done
lemma INT_greaterThan_UNIV: "(INT m::nat. greaterThan m) = {}"
by blast
subsubsection {* The Constant @{term atLeast} *}
lemma atLeast_0 [simp]: "atLeast (0::nat) = UNIV"
by (unfold atLeast_def UNIV_def, simp)
lemma atLeast_Suc: "atLeast (Suc k) = atLeast k - {k}"
apply (simp add: atLeast_def)
apply (simp add: Suc_le_eq)
apply (simp add: order_le_less, blast)
done
lemma atLeast_Suc_greaterThan: "atLeast (Suc k) = greaterThan k"
by (auto simp add: greaterThan_def atLeast_def less_Suc_eq_le)
lemma UN_atLeast_UNIV: "(UN m::nat. atLeast m) = UNIV"
by blast
subsubsection {* The Constant @{term atMost} *}
lemma atMost_0 [simp]: "atMost (0::nat) = {0}"
by (simp add: atMost_def)
lemma atMost_Suc: "atMost (Suc k) = insert (Suc k) (atMost k)"
apply (simp add: atMost_def)
apply (simp add: less_Suc_eq order_le_less, blast)
done
lemma UN_atMost_UNIV: "(UN m::nat. atMost m) = UNIV"
by blast
subsubsection {* The Constant @{term atLeastLessThan} *}
text{*The orientation of the following 2 rules is tricky. The lhs is
defined in terms of the rhs. Hence the chosen orientation makes sense
in this theory --- the reverse orientation complicates proofs (eg
nontermination). But outside, when the definition of the lhs is rarely
used, the opposite orientation seems preferable because it reduces a
specific concept to a more general one. *}
lemma atLeast0LessThan: "{0::nat..<n} = {..<n}"
by(simp add:lessThan_def atLeastLessThan_def)
lemma atLeast0AtMost: "{0..n::nat} = {..n}"
by(simp add:atMost_def atLeastAtMost_def)
declare atLeast0LessThan[symmetric, code_unfold]
atLeast0AtMost[symmetric, code_unfold]
lemma atLeastLessThan0: "{m..<0::nat} = {}"
by (simp add: atLeastLessThan_def)
subsubsection {* Intervals of nats with @{term Suc} *}
text{*Not a simprule because the RHS is too messy.*}
lemma atLeastLessThanSuc:
"{m..<Suc n} = (if m \<le> n then insert n {m..<n} else {})"
by (auto simp add: atLeastLessThan_def)
lemma atLeastLessThan_singleton [simp]: "{m..<Suc m} = {m}"
by (auto simp add: atLeastLessThan_def)
(*
lemma atLeast_sum_LessThan [simp]: "{m + k..<k::nat} = {}"
by (induct k, simp_all add: atLeastLessThanSuc)
lemma atLeastSucLessThan [simp]: "{Suc n..<n} = {}"
by (auto simp add: atLeastLessThan_def)
*)
lemma atLeastLessThanSuc_atLeastAtMost: "{l..<Suc u} = {l..u}"
by (simp add: lessThan_Suc_atMost atLeastAtMost_def atLeastLessThan_def)
lemma atLeastSucAtMost_greaterThanAtMost: "{Suc l..u} = {l<..u}"
by (simp add: atLeast_Suc_greaterThan atLeastAtMost_def
greaterThanAtMost_def)
lemma atLeastSucLessThan_greaterThanLessThan: "{Suc l..<u} = {l<..<u}"
by (simp add: atLeast_Suc_greaterThan atLeastLessThan_def
greaterThanLessThan_def)
lemma atLeastAtMostSuc_conv: "m \<le> Suc n \<Longrightarrow> {m..Suc n} = insert (Suc n) {m..n}"
by (auto simp add: atLeastAtMost_def)
lemma atLeastAtMost_insertL: "m \<le> n \<Longrightarrow> insert m {Suc m..n} = {m ..n}"
by auto
text {* The analogous result is useful on @{typ int}: *}
(* here, because we don't have an own int section *)
lemma atLeastAtMostPlus1_int_conv:
"m <= 1+n \<Longrightarrow> {m..1+n} = insert (1+n) {m..n::int}"
by (auto intro: set_eqI)
lemma atLeastLessThan_add_Un: "i \<le> j \<Longrightarrow> {i..<j+k} = {i..<j} \<union> {j..<j+k::nat}"
apply (induct k)
apply (simp_all add: atLeastLessThanSuc)
done
subsubsection {* Image *}
lemma image_add_atLeastAtMost:
"(%n::nat. n+k) ` {i..j} = {i+k..j+k}" (is "?A = ?B")
proof
show "?A \<subseteq> ?B" by auto
next
show "?B \<subseteq> ?A"
proof
fix n assume a: "n : ?B"
hence "n - k : {i..j}" by auto
moreover have "n = (n - k) + k" using a by auto
ultimately show "n : ?A" by blast
qed
qed
lemma image_add_atLeastLessThan:
"(%n::nat. n+k) ` {i..<j} = {i+k..<j+k}" (is "?A = ?B")
proof
show "?A \<subseteq> ?B" by auto
next
show "?B \<subseteq> ?A"
proof
fix n assume a: "n : ?B"
hence "n - k : {i..<j}" by auto
moreover have "n = (n - k) + k" using a by auto
ultimately show "n : ?A" by blast
qed
qed
corollary image_Suc_atLeastAtMost[simp]:
"Suc ` {i..j} = {Suc i..Suc j}"
using image_add_atLeastAtMost[where k="Suc 0"] by simp
corollary image_Suc_atLeastLessThan[simp]:
"Suc ` {i..<j} = {Suc i..<Suc j}"
using image_add_atLeastLessThan[where k="Suc 0"] by simp
lemma image_add_int_atLeastLessThan:
"(%x. x + (l::int)) ` {0..<u-l} = {l..<u}"
apply (auto simp add: image_def)
apply (rule_tac x = "x - l" in bexI)
apply auto
done
lemma image_minus_const_atLeastLessThan_nat:
fixes c :: nat
shows "(\<lambda>i. i - c) ` {x ..< y} =
(if c < y then {x - c ..< y - c} else if x < y then {0} else {})"
(is "_ = ?right")
proof safe
fix a assume a: "a \<in> ?right"
show "a \<in> (\<lambda>i. i - c) ` {x ..< y}"
proof cases
assume "c < y" with a show ?thesis
by (auto intro!: image_eqI[of _ _ "a + c"])
next
assume "\<not> c < y" with a show ?thesis
by (auto intro!: image_eqI[of _ _ x] split: split_if_asm)
qed
qed auto
lemma image_int_atLeastLessThan: "int ` {a..<b} = {int a..<int b}"
by(auto intro!: image_eqI[where x="nat x", standard])
context ordered_ab_group_add
begin
lemma
fixes x :: 'a
shows image_uminus_greaterThan[simp]: "uminus ` {x<..} = {..<-x}"
and image_uminus_atLeast[simp]: "uminus ` {x..} = {..-x}"
proof safe
fix y assume "y < -x"
hence *: "x < -y" using neg_less_iff_less[of "-y" x] by simp
have "- (-y) \<in> uminus ` {x<..}"
by (rule imageI) (simp add: *)
thus "y \<in> uminus ` {x<..}" by simp
next
fix y assume "y \<le> -x"
have "- (-y) \<in> uminus ` {x..}"
by (rule imageI) (insert `y \<le> -x`[THEN le_imp_neg_le], simp)
thus "y \<in> uminus ` {x..}" by simp
qed simp_all
lemma
fixes x :: 'a
shows image_uminus_lessThan[simp]: "uminus ` {..<x} = {-x<..}"
and image_uminus_atMost[simp]: "uminus ` {..x} = {-x..}"
proof -
have "uminus ` {..<x} = uminus ` uminus ` {-x<..}"
and "uminus ` {..x} = uminus ` uminus ` {-x..}" by simp_all
thus "uminus ` {..<x} = {-x<..}" and "uminus ` {..x} = {-x..}"
by (simp_all add: image_image
del: image_uminus_greaterThan image_uminus_atLeast)
qed
lemma
fixes x :: 'a
shows image_uminus_atLeastAtMost[simp]: "uminus ` {x..y} = {-y..-x}"
and image_uminus_greaterThanAtMost[simp]: "uminus ` {x<..y} = {-y..<-x}"
and image_uminus_atLeastLessThan[simp]: "uminus ` {x..<y} = {-y<..-x}"
and image_uminus_greaterThanLessThan[simp]: "uminus ` {x<..<y} = {-y<..<-x}"
by (simp_all add: atLeastAtMost_def greaterThanAtMost_def atLeastLessThan_def
greaterThanLessThan_def image_Int[OF inj_uminus] Int_commute)
end
subsubsection {* Finiteness *}
lemma finite_lessThan [iff]: fixes k :: nat shows "finite {..<k}"
by (induct k) (simp_all add: lessThan_Suc)
lemma finite_atMost [iff]: fixes k :: nat shows "finite {..k}"
by (induct k) (simp_all add: atMost_Suc)
lemma finite_greaterThanLessThan [iff]:
fixes l :: nat shows "finite {l<..<u}"
by (simp add: greaterThanLessThan_def)
lemma finite_atLeastLessThan [iff]:
fixes l :: nat shows "finite {l..<u}"
by (simp add: atLeastLessThan_def)
lemma finite_greaterThanAtMost [iff]:
fixes l :: nat shows "finite {l<..u}"
by (simp add: greaterThanAtMost_def)
lemma finite_atLeastAtMost [iff]:
fixes l :: nat shows "finite {l..u}"
by (simp add: atLeastAtMost_def)
text {* A bounded set of natural numbers is finite. *}
lemma bounded_nat_set_is_finite:
"(ALL i:N. i < (n::nat)) ==> finite N"
apply (rule finite_subset)
apply (rule_tac [2] finite_lessThan, auto)
done
text {* A set of natural numbers is finite iff it is bounded. *}
lemma finite_nat_set_iff_bounded:
"finite(N::nat set) = (EX m. ALL n:N. n<m)" (is "?F = ?B")
proof
assume f:?F show ?B
using Max_ge[OF `?F`, simplified less_Suc_eq_le[symmetric]] by blast
next
assume ?B show ?F using `?B` by(blast intro:bounded_nat_set_is_finite)
qed
lemma finite_nat_set_iff_bounded_le:
"finite(N::nat set) = (EX m. ALL n:N. n<=m)"
apply(simp add:finite_nat_set_iff_bounded)
apply(blast dest:less_imp_le_nat le_imp_less_Suc)
done
lemma finite_less_ub:
"!!f::nat=>nat. (!!n. n \<le> f n) ==> finite {n. f n \<le> u}"
by (rule_tac B="{..u}" in finite_subset, auto intro: order_trans)
text{* Any subset of an interval of natural numbers the size of the
subset is exactly that interval. *}
lemma subset_card_intvl_is_intvl:
assumes "A \<subseteq> {k..<k + card A}"
shows "A = {k..<k + card A}"
proof (cases "finite A")
case True
from this and assms show ?thesis
proof (induct A rule: finite_linorder_max_induct)
case empty thus ?case by auto
next
case (insert b A)
hence *: "b \<notin> A" by auto
with insert have "A <= {k..<k + card A}" and "b = k + card A"
by fastforce+
with insert * show ?case by auto
qed
next
case False
with assms show ?thesis by simp
qed
subsubsection {* Proving Inclusions and Equalities between Unions *}
lemma UN_le_eq_Un0:
"(\<Union>i\<le>n::nat. M i) = (\<Union>i\<in>{1..n}. M i) \<union> M 0" (is "?A = ?B")
proof
show "?A <= ?B"
proof
fix x assume "x : ?A"
then obtain i where i: "i\<le>n" "x : M i" by auto
show "x : ?B"
proof(cases i)
case 0 with i show ?thesis by simp
next
case (Suc j) with i show ?thesis by auto
qed
qed
next
show "?B <= ?A" by auto
qed
lemma UN_le_add_shift:
"(\<Union>i\<le>n::nat. M(i+k)) = (\<Union>i\<in>{k..n+k}. M i)" (is "?A = ?B")
proof
show "?A <= ?B" by fastforce
next
show "?B <= ?A"
proof
fix x assume "x : ?B"
then obtain i where i: "i : {k..n+k}" "x : M(i)" by auto
hence "i-k\<le>n & x : M((i-k)+k)" by auto
thus "x : ?A" by blast
qed
qed
lemma UN_UN_finite_eq: "(\<Union>n::nat. \<Union>i\<in>{0..<n}. A i) = (\<Union>n. A n)"
by (auto simp add: atLeast0LessThan)
lemma UN_finite_subset: "(!!n::nat. (\<Union>i\<in>{0..<n}. A i) \<subseteq> C) \<Longrightarrow> (\<Union>n. A n) \<subseteq> C"
by (subst UN_UN_finite_eq [symmetric]) blast
lemma UN_finite2_subset:
"(!!n::nat. (\<Union>i\<in>{0..<n}. A i) \<subseteq> (\<Union>i\<in>{0..<n+k}. B i)) \<Longrightarrow> (\<Union>n. A n) \<subseteq> (\<Union>n. B n)"
apply (rule UN_finite_subset)
apply (subst UN_UN_finite_eq [symmetric, of B])
apply blast
done
lemma UN_finite2_eq:
"(!!n::nat. (\<Union>i\<in>{0..<n}. A i) = (\<Union>i\<in>{0..<n+k}. B i)) \<Longrightarrow> (\<Union>n. A n) = (\<Union>n. B n)"
apply (rule subset_antisym)
apply (rule UN_finite2_subset, blast)
apply (rule UN_finite2_subset [where k=k])
apply (force simp add: atLeastLessThan_add_Un [of 0])
done
subsubsection {* Cardinality *}
lemma card_lessThan [simp]: "card {..<u} = u"
by (induct u, simp_all add: lessThan_Suc)
lemma card_atMost [simp]: "card {..u} = Suc u"
by (simp add: lessThan_Suc_atMost [THEN sym])
lemma card_atLeastLessThan [simp]: "card {l..<u} = u - l"
apply (subgoal_tac "card {l..<u} = card {..<u-l}")
apply (erule ssubst, rule card_lessThan)
apply (subgoal_tac "(%x. x + l) ` {..<u-l} = {l..<u}")
apply (erule subst)
apply (rule card_image)
apply (simp add: inj_on_def)
apply (auto simp add: image_def atLeastLessThan_def lessThan_def)
apply (rule_tac x = "x - l" in exI)
apply arith
done
lemma card_atLeastAtMost [simp]: "card {l..u} = Suc u - l"
by (subst atLeastLessThanSuc_atLeastAtMost [THEN sym], simp)
lemma card_greaterThanAtMost [simp]: "card {l<..u} = u - l"
by (subst atLeastSucAtMost_greaterThanAtMost [THEN sym], simp)
lemma card_greaterThanLessThan [simp]: "card {l<..<u} = u - Suc l"
by (subst atLeastSucLessThan_greaterThanLessThan [THEN sym], simp)
lemma ex_bij_betw_nat_finite:
"finite M \<Longrightarrow> \<exists>h. bij_betw h {0..<card M} M"
apply(drule finite_imp_nat_seg_image_inj_on)
apply(auto simp:atLeast0LessThan[symmetric] lessThan_def[symmetric] card_image bij_betw_def)
done
lemma ex_bij_betw_finite_nat:
"finite M \<Longrightarrow> \<exists>h. bij_betw h M {0..<card M}"
by (blast dest: ex_bij_betw_nat_finite bij_betw_inv)
lemma finite_same_card_bij:
"finite A \<Longrightarrow> finite B \<Longrightarrow> card A = card B \<Longrightarrow> EX h. bij_betw h A B"
apply(drule ex_bij_betw_finite_nat)
apply(drule ex_bij_betw_nat_finite)
apply(auto intro!:bij_betw_trans)
done
lemma ex_bij_betw_nat_finite_1:
"finite M \<Longrightarrow> \<exists>h. bij_betw h {1 .. card M} M"
by (rule finite_same_card_bij) auto
lemma bij_betw_iff_card:
assumes FIN: "finite A" and FIN': "finite B"
shows BIJ: "(\<exists>f. bij_betw f A B) \<longleftrightarrow> (card A = card B)"
using assms
proof(auto simp add: bij_betw_same_card)
assume *: "card A = card B"
obtain f where "bij_betw f A {0 ..< card A}"
using FIN ex_bij_betw_finite_nat by blast
moreover obtain g where "bij_betw g {0 ..< card B} B"
using FIN' ex_bij_betw_nat_finite by blast
ultimately have "bij_betw (g o f) A B"
using * by (auto simp add: bij_betw_trans)
thus "(\<exists>f. bij_betw f A B)" by blast
qed
lemma inj_on_iff_card_le:
assumes FIN: "finite A" and FIN': "finite B"
shows "(\<exists>f. inj_on f A \<and> f ` A \<le> B) = (card A \<le> card B)"
proof (safe intro!: card_inj_on_le)
assume *: "card A \<le> card B"
obtain f where 1: "inj_on f A" and 2: "f ` A = {0 ..< card A}"
using FIN ex_bij_betw_finite_nat unfolding bij_betw_def by force
moreover obtain g where "inj_on g {0 ..< card B}" and 3: "g ` {0 ..< card B} = B"
using FIN' ex_bij_betw_nat_finite unfolding bij_betw_def by force
ultimately have "inj_on g (f ` A)" using subset_inj_on[of g _ "f ` A"] * by force
hence "inj_on (g o f) A" using 1 comp_inj_on by blast
moreover
{have "{0 ..< card A} \<le> {0 ..< card B}" using * by force
with 2 have "f ` A \<le> {0 ..< card B}" by blast
hence "(g o f) ` A \<le> B" unfolding comp_def using 3 by force
}
ultimately show "(\<exists>f. inj_on f A \<and> f ` A \<le> B)" by blast
qed (insert assms, auto)
subsection {* Intervals of integers *}
lemma atLeastLessThanPlusOne_atLeastAtMost_int: "{l..<u+1} = {l..(u::int)}"
by (auto simp add: atLeastAtMost_def atLeastLessThan_def)
lemma atLeastPlusOneAtMost_greaterThanAtMost_int: "{l+1..u} = {l<..(u::int)}"
by (auto simp add: atLeastAtMost_def greaterThanAtMost_def)
lemma atLeastPlusOneLessThan_greaterThanLessThan_int:
"{l+1..<u} = {l<..<u::int}"
by (auto simp add: atLeastLessThan_def greaterThanLessThan_def)
subsubsection {* Finiteness *}
lemma image_atLeastZeroLessThan_int: "0 \<le> u ==>
{(0::int)..<u} = int ` {..<nat u}"
apply (unfold image_def lessThan_def)
apply auto
apply (rule_tac x = "nat x" in exI)
apply (auto simp add: zless_nat_eq_int_zless [THEN sym])
done
lemma finite_atLeastZeroLessThan_int: "finite {(0::int)..<u}"
apply (cases "0 \<le> u")
apply (subst image_atLeastZeroLessThan_int, assumption)
apply (rule finite_imageI)
apply auto
done
lemma finite_atLeastLessThan_int [iff]: "finite {l..<u::int}"
apply (subgoal_tac "(%x. x + l) ` {0..<u-l} = {l..<u}")
apply (erule subst)
apply (rule finite_imageI)
apply (rule finite_atLeastZeroLessThan_int)
apply (rule image_add_int_atLeastLessThan)
done
lemma finite_atLeastAtMost_int [iff]: "finite {l..(u::int)}"
by (subst atLeastLessThanPlusOne_atLeastAtMost_int [THEN sym], simp)
lemma finite_greaterThanAtMost_int [iff]: "finite {l<..(u::int)}"
by (subst atLeastPlusOneAtMost_greaterThanAtMost_int [THEN sym], simp)
lemma finite_greaterThanLessThan_int [iff]: "finite {l<..<u::int}"
by (subst atLeastPlusOneLessThan_greaterThanLessThan_int [THEN sym], simp)
subsubsection {* Cardinality *}
lemma card_atLeastZeroLessThan_int: "card {(0::int)..<u} = nat u"
apply (cases "0 \<le> u")
apply (subst image_atLeastZeroLessThan_int, assumption)
apply (subst card_image)
apply (auto simp add: inj_on_def)
done
lemma card_atLeastLessThan_int [simp]: "card {l..<u} = nat (u - l)"
apply (subgoal_tac "card {l..<u} = card {0..<u-l}")
apply (erule ssubst, rule card_atLeastZeroLessThan_int)
apply (subgoal_tac "(%x. x + l) ` {0..<u-l} = {l..<u}")
apply (erule subst)
apply (rule card_image)
apply (simp add: inj_on_def)
apply (rule image_add_int_atLeastLessThan)
done
lemma card_atLeastAtMost_int [simp]: "card {l..u} = nat (u - l + 1)"
apply (subst atLeastLessThanPlusOne_atLeastAtMost_int [THEN sym])
apply (auto simp add: algebra_simps)
done
lemma card_greaterThanAtMost_int [simp]: "card {l<..u} = nat (u - l)"
by (subst atLeastPlusOneAtMost_greaterThanAtMost_int [THEN sym], simp)
lemma card_greaterThanLessThan_int [simp]: "card {l<..<u} = nat (u - (l + 1))"
by (subst atLeastPlusOneLessThan_greaterThanLessThan_int [THEN sym], simp)
lemma finite_M_bounded_by_nat: "finite {k. P k \<and> k < (i::nat)}"
proof -
have "{k. P k \<and> k < i} \<subseteq> {..<i}" by auto
with finite_lessThan[of "i"] show ?thesis by (simp add: finite_subset)
qed
lemma card_less:
assumes zero_in_M: "0 \<in> M"
shows "card {k \<in> M. k < Suc i} \<noteq> 0"
proof -
from zero_in_M have "{k \<in> M. k < Suc i} \<noteq> {}" by auto
with finite_M_bounded_by_nat show ?thesis by (auto simp add: card_eq_0_iff)
qed
lemma card_less_Suc2: "0 \<notin> M \<Longrightarrow> card {k. Suc k \<in> M \<and> k < i} = card {k \<in> M. k < Suc i}"
apply (rule card_bij_eq [of Suc _ _ "\<lambda>x. x - Suc 0"])
apply simp
apply fastforce
apply auto
apply (rule inj_on_diff_nat)
apply auto
apply (case_tac x)
apply auto
apply (case_tac xa)
apply auto
apply (case_tac xa)
apply auto
done
lemma card_less_Suc:
assumes zero_in_M: "0 \<in> M"
shows "Suc (card {k. Suc k \<in> M \<and> k < i}) = card {k \<in> M. k < Suc i}"
proof -
from assms have a: "0 \<in> {k \<in> M. k < Suc i}" by simp
hence c: "{k \<in> M. k < Suc i} = insert 0 ({k \<in> M. k < Suc i} - {0})"
by (auto simp only: insert_Diff)
have b: "{k \<in> M. k < Suc i} - {0} = {k \<in> M - {0}. k < Suc i}" by auto
from finite_M_bounded_by_nat[of "\<lambda>x. x \<in> M" "Suc i"] have "Suc (card {k. Suc k \<in> M \<and> k < i}) = card (insert 0 ({k \<in> M. k < Suc i} - {0}))"
apply (subst card_insert)
apply simp_all
apply (subst b)
apply (subst card_less_Suc2[symmetric])
apply simp_all
done
with c show ?thesis by simp
qed
subsection {*Lemmas useful with the summation operator setsum*}
text {* For examples, see Algebra/poly/UnivPoly2.thy *}
subsubsection {* Disjoint Unions *}
text {* Singletons and open intervals *}
lemma ivl_disj_un_singleton:
"{l::'a::linorder} Un {l<..} = {l..}"
"{..<u} Un {u::'a::linorder} = {..u}"
"(l::'a::linorder) < u ==> {l} Un {l<..<u} = {l..<u}"
"(l::'a::linorder) < u ==> {l<..<u} Un {u} = {l<..u}"
"(l::'a::linorder) <= u ==> {l} Un {l<..u} = {l..u}"
"(l::'a::linorder) <= u ==> {l..<u} Un {u} = {l..u}"
by auto
text {* One- and two-sided intervals *}
lemma ivl_disj_un_one:
"(l::'a::linorder) < u ==> {..l} Un {l<..<u} = {..<u}"
"(l::'a::linorder) <= u ==> {..<l} Un {l..<u} = {..<u}"
"(l::'a::linorder) <= u ==> {..l} Un {l<..u} = {..u}"
"(l::'a::linorder) <= u ==> {..<l} Un {l..u} = {..u}"
"(l::'a::linorder) <= u ==> {l<..u} Un {u<..} = {l<..}"
"(l::'a::linorder) < u ==> {l<..<u} Un {u..} = {l<..}"
"(l::'a::linorder) <= u ==> {l..u} Un {u<..} = {l..}"
"(l::'a::linorder) <= u ==> {l..<u} Un {u..} = {l..}"
by auto
text {* Two- and two-sided intervals *}
lemma ivl_disj_un_two:
"[| (l::'a::linorder) < m; m <= u |] ==> {l<..<m} Un {m..<u} = {l<..<u}"
"[| (l::'a::linorder) <= m; m < u |] ==> {l<..m} Un {m<..<u} = {l<..<u}"
"[| (l::'a::linorder) <= m; m <= u |] ==> {l..<m} Un {m..<u} = {l..<u}"
"[| (l::'a::linorder) <= m; m < u |] ==> {l..m} Un {m<..<u} = {l..<u}"
"[| (l::'a::linorder) < m; m <= u |] ==> {l<..<m} Un {m..u} = {l<..u}"
"[| (l::'a::linorder) <= m; m <= u |] ==> {l<..m} Un {m<..u} = {l<..u}"
"[| (l::'a::linorder) <= m; m <= u |] ==> {l..<m} Un {m..u} = {l..u}"
"[| (l::'a::linorder) <= m; m <= u |] ==> {l..m} Un {m<..u} = {l..u}"
by auto
lemmas ivl_disj_un = ivl_disj_un_singleton ivl_disj_un_one ivl_disj_un_two
subsubsection {* Disjoint Intersections *}
text {* One- and two-sided intervals *}
lemma ivl_disj_int_one:
"{..l::'a::order} Int {l<..<u} = {}"
"{..<l} Int {l..<u} = {}"
"{..l} Int {l<..u} = {}"
"{..<l} Int {l..u} = {}"
"{l<..u} Int {u<..} = {}"
"{l<..<u} Int {u..} = {}"
"{l..u} Int {u<..} = {}"
"{l..<u} Int {u..} = {}"
by auto
text {* Two- and two-sided intervals *}
lemma ivl_disj_int_two:
"{l::'a::order<..<m} Int {m..<u} = {}"
"{l<..m} Int {m<..<u} = {}"
"{l..<m} Int {m..<u} = {}"
"{l..m} Int {m<..<u} = {}"
"{l<..<m} Int {m..u} = {}"
"{l<..m} Int {m<..u} = {}"
"{l..<m} Int {m..u} = {}"
"{l..m} Int {m<..u} = {}"
by auto
lemmas ivl_disj_int = ivl_disj_int_one ivl_disj_int_two
subsubsection {* Some Differences *}
lemma ivl_diff[simp]:
"i \<le> n \<Longrightarrow> {i..<m} - {i..<n} = {n..<(m::'a::linorder)}"
by(auto)
subsubsection {* Some Subset Conditions *}
lemma ivl_subset [simp]:
"({i..<j} \<subseteq> {m..<n}) = (j \<le> i | m \<le> i & j \<le> (n::'a::linorder))"
apply(auto simp:linorder_not_le)
apply(rule ccontr)
apply(insert linorder_le_less_linear[of i n])
apply(clarsimp simp:linorder_not_le)
apply(fastforce)
done
subsection {* Summation indexed over intervals *}
syntax
"_from_to_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(SUM _ = _.._./ _)" [0,0,0,10] 10)
"_from_upto_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(SUM _ = _..<_./ _)" [0,0,0,10] 10)
"_upt_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(SUM _<_./ _)" [0,0,10] 10)
"_upto_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(SUM _<=_./ _)" [0,0,10] 10)
syntax (xsymbols)
"_from_to_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Sum>_ = _.._./ _)" [0,0,0,10] 10)
"_from_upto_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Sum>_ = _..<_./ _)" [0,0,0,10] 10)
"_upt_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Sum>_<_./ _)" [0,0,10] 10)
"_upto_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Sum>_\<le>_./ _)" [0,0,10] 10)
syntax (HTML output)
"_from_to_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Sum>_ = _.._./ _)" [0,0,0,10] 10)
"_from_upto_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Sum>_ = _..<_./ _)" [0,0,0,10] 10)
"_upt_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Sum>_<_./ _)" [0,0,10] 10)
"_upto_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Sum>_\<le>_./ _)" [0,0,10] 10)
syntax (latex_sum output)
"_from_to_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b"
("(3\<^raw:$\sum_{>_ = _\<^raw:}^{>_\<^raw:}$> _)" [0,0,0,10] 10)
"_from_upto_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b"
("(3\<^raw:$\sum_{>_ = _\<^raw:}^{<>_\<^raw:}$> _)" [0,0,0,10] 10)
"_upt_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b"
("(3\<^raw:$\sum_{>_ < _\<^raw:}$> _)" [0,0,10] 10)
"_upto_setsum" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b"
("(3\<^raw:$\sum_{>_ \<le> _\<^raw:}$> _)" [0,0,10] 10)
translations
"\<Sum>x=a..b. t" == "CONST setsum (%x. t) {a..b}"
"\<Sum>x=a..<b. t" == "CONST setsum (%x. t) {a..<b}"
"\<Sum>i\<le>n. t" == "CONST setsum (\<lambda>i. t) {..n}"
"\<Sum>i<n. t" == "CONST setsum (\<lambda>i. t) {..<n}"
text{* The above introduces some pretty alternative syntaxes for
summation over intervals:
\begin{center}
\begin{tabular}{lll}
Old & New & \LaTeX\\
@{term[source]"\<Sum>x\<in>{a..b}. e"} & @{term"\<Sum>x=a..b. e"} & @{term[mode=latex_sum]"\<Sum>x=a..b. e"}\\
@{term[source]"\<Sum>x\<in>{a..<b}. e"} & @{term"\<Sum>x=a..<b. e"} & @{term[mode=latex_sum]"\<Sum>x=a..<b. e"}\\
@{term[source]"\<Sum>x\<in>{..b}. e"} & @{term"\<Sum>x\<le>b. e"} & @{term[mode=latex_sum]"\<Sum>x\<le>b. e"}\\
@{term[source]"\<Sum>x\<in>{..<b}. e"} & @{term"\<Sum>x<b. e"} & @{term[mode=latex_sum]"\<Sum>x<b. e"}
\end{tabular}
\end{center}
The left column shows the term before introduction of the new syntax,
the middle column shows the new (default) syntax, and the right column
shows a special syntax. The latter is only meaningful for latex output
and has to be activated explicitly by setting the print mode to
@{text latex_sum} (e.g.\ via @{text "mode = latex_sum"} in
antiquotations). It is not the default \LaTeX\ output because it only
works well with italic-style formulae, not tt-style.
Note that for uniformity on @{typ nat} it is better to use
@{term"\<Sum>x::nat=0..<n. e"} rather than @{text"\<Sum>x<n. e"}: @{text setsum} may
not provide all lemmas available for @{term"{m..<n}"} also in the
special form for @{term"{..<n}"}. *}
text{* This congruence rule should be used for sums over intervals as
the standard theorem @{text[source]setsum_cong} does not work well
with the simplifier who adds the unsimplified premise @{term"x:B"} to
the context. *}
lemma setsum_ivl_cong:
"\<lbrakk>a = c; b = d; !!x. \<lbrakk> c \<le> x; x < d \<rbrakk> \<Longrightarrow> f x = g x \<rbrakk> \<Longrightarrow>
setsum f {a..<b} = setsum g {c..<d}"
by(rule setsum_cong, simp_all)
(* FIXME why are the following simp rules but the corresponding eqns
on intervals are not? *)
lemma setsum_atMost_Suc[simp]: "(\<Sum>i \<le> Suc n. f i) = (\<Sum>i \<le> n. f i) + f(Suc n)"
by (simp add:atMost_Suc add_ac)
lemma setsum_lessThan_Suc[simp]: "(\<Sum>i < Suc n. f i) = (\<Sum>i < n. f i) + f n"
by (simp add:lessThan_Suc add_ac)
lemma setsum_cl_ivl_Suc[simp]:
"setsum f {m..Suc n} = (if Suc n < m then 0 else setsum f {m..n} + f(Suc n))"
by (auto simp:add_ac atLeastAtMostSuc_conv)
lemma setsum_op_ivl_Suc[simp]:
"setsum f {m..<Suc n} = (if n < m then 0 else setsum f {m..<n} + f(n))"
by (auto simp:add_ac atLeastLessThanSuc)
(*
lemma setsum_cl_ivl_add_one_nat: "(n::nat) <= m + 1 ==>
(\<Sum>i=n..m+1. f i) = (\<Sum>i=n..m. f i) + f(m + 1)"
by (auto simp:add_ac atLeastAtMostSuc_conv)
*)
lemma setsum_head:
fixes n :: nat
assumes mn: "m <= n"
shows "(\<Sum>x\<in>{m..n}. P x) = P m + (\<Sum>x\<in>{m<..n}. P x)" (is "?lhs = ?rhs")
proof -
from mn
have "{m..n} = {m} \<union> {m<..n}"
by (auto intro: ivl_disj_un_singleton)
hence "?lhs = (\<Sum>x\<in>{m} \<union> {m<..n}. P x)"
by (simp add: atLeast0LessThan)
also have "\<dots> = ?rhs" by simp
finally show ?thesis .
qed
lemma setsum_head_Suc:
"m \<le> n \<Longrightarrow> setsum f {m..n} = f m + setsum f {Suc m..n}"
by (simp add: setsum_head atLeastSucAtMost_greaterThanAtMost)
lemma setsum_head_upt_Suc:
"m < n \<Longrightarrow> setsum f {m..<n} = f m + setsum f {Suc m..<n}"
apply(insert setsum_head_Suc[of m "n - Suc 0" f])
apply (simp add: atLeastLessThanSuc_atLeastAtMost[symmetric] algebra_simps)
done
lemma setsum_ub_add_nat: assumes "(m::nat) \<le> n + 1"
shows "setsum f {m..n + p} = setsum f {m..n} + setsum f {n + 1..n + p}"
proof-
have "{m .. n+p} = {m..n} \<union> {n+1..n+p}" using `m \<le> n+1` by auto
thus ?thesis by (auto simp: ivl_disj_int setsum_Un_disjoint
atLeastSucAtMost_greaterThanAtMost)
qed
lemma setsum_add_nat_ivl: "\<lbrakk> m \<le> n; n \<le> p \<rbrakk> \<Longrightarrow>
setsum f {m..<n} + setsum f {n..<p} = setsum f {m..<p::nat}"
by (simp add:setsum_Un_disjoint[symmetric] ivl_disj_int ivl_disj_un)
lemma setsum_diff_nat_ivl:
fixes f :: "nat \<Rightarrow> 'a::ab_group_add"
shows "\<lbrakk> m \<le> n; n \<le> p \<rbrakk> \<Longrightarrow>
setsum f {m..<p} - setsum f {m..<n} = setsum f {n..<p}"
using setsum_add_nat_ivl [of m n p f,symmetric]
apply (simp add: add_ac)
done
lemma setsum_natinterval_difff:
fixes f:: "nat \<Rightarrow> ('a::ab_group_add)"
shows "setsum (\<lambda>k. f k - f(k + 1)) {(m::nat) .. n} =
(if m <= n then f m - f(n + 1) else 0)"
by (induct n, auto simp add: algebra_simps not_le le_Suc_eq)
lemma setsum_restrict_set':
"finite A \<Longrightarrow> setsum f {x \<in> A. x \<in> B} = (\<Sum>x\<in>A. if x \<in> B then f x else 0)"
by (simp add: setsum_restrict_set [symmetric] Int_def)
lemma setsum_restrict_set'':
"finite A \<Longrightarrow> setsum f {x \<in> A. P x} = (\<Sum>x\<in>A. if P x then f x else 0)"
by (simp add: setsum_restrict_set' [of A f "{x. P x}", simplified mem_Collect_eq])
lemma setsum_setsum_restrict:
"finite S \<Longrightarrow> finite T \<Longrightarrow>
setsum (\<lambda>x. setsum (\<lambda>y. f x y) {y. y \<in> T \<and> R x y}) S = setsum (\<lambda>y. setsum (\<lambda>x. f x y) {x. x \<in> S \<and> R x y}) T"
by (simp add: setsum_restrict_set'') (rule setsum_commute)
lemma setsum_image_gen: assumes fS: "finite S"
shows "setsum g S = setsum (\<lambda>y. setsum g {x. x \<in> S \<and> f x = y}) (f ` S)"
proof-
{ fix x assume "x \<in> S" then have "{y. y\<in> f`S \<and> f x = y} = {f x}" by auto }
hence "setsum g S = setsum (\<lambda>x. setsum (\<lambda>y. g x) {y. y\<in> f`S \<and> f x = y}) S"
by simp
also have "\<dots> = setsum (\<lambda>y. setsum g {x. x \<in> S \<and> f x = y}) (f ` S)"
by (rule setsum_setsum_restrict[OF fS finite_imageI[OF fS]])
finally show ?thesis .
qed
lemma setsum_le_included:
fixes f :: "'a \<Rightarrow> 'b::ordered_comm_monoid_add"
assumes "finite s" "finite t"
and "\<forall>y\<in>t. 0 \<le> g y" "(\<forall>x\<in>s. \<exists>y\<in>t. i y = x \<and> f x \<le> g y)"
shows "setsum f s \<le> setsum g t"
proof -
have "setsum f s \<le> setsum (\<lambda>y. setsum g {x. x\<in>t \<and> i x = y}) s"
proof (rule setsum_mono)
fix y assume "y \<in> s"
with assms obtain z where z: "z \<in> t" "y = i z" "f y \<le> g z" by auto
with assms show "f y \<le> setsum g {x \<in> t. i x = y}" (is "?A y \<le> ?B y")
using order_trans[of "?A (i z)" "setsum g {z}" "?B (i z)", intro]
by (auto intro!: setsum_mono2)
qed
also have "... \<le> setsum (\<lambda>y. setsum g {x. x\<in>t \<and> i x = y}) (i ` t)"
using assms(2-4) by (auto intro!: setsum_mono2 setsum_nonneg)
also have "... \<le> setsum g t"
using assms by (auto simp: setsum_image_gen[symmetric])
finally show ?thesis .
qed
lemma setsum_multicount_gen:
assumes "finite s" "finite t" "\<forall>j\<in>t. (card {i\<in>s. R i j} = k j)"
shows "setsum (\<lambda>i. (card {j\<in>t. R i j})) s = setsum k t" (is "?l = ?r")
proof-
have "?l = setsum (\<lambda>i. setsum (\<lambda>x.1) {j\<in>t. R i j}) s" by auto
also have "\<dots> = ?r" unfolding setsum_setsum_restrict[OF assms(1-2)]
using assms(3) by auto
finally show ?thesis .
qed
lemma setsum_multicount:
assumes "finite S" "finite T" "\<forall>j\<in>T. (card {i\<in>S. R i j} = k)"
shows "setsum (\<lambda>i. card {j\<in>T. R i j}) S = k * card T" (is "?l = ?r")
proof-
have "?l = setsum (\<lambda>i. k) T" by(rule setsum_multicount_gen)(auto simp:assms)
also have "\<dots> = ?r" by(simp add: mult_commute)
finally show ?thesis by auto
qed
subsection{* Shifting bounds *}
lemma setsum_shift_bounds_nat_ivl:
"setsum f {m+k..<n+k} = setsum (%i. f(i + k)){m..<n::nat}"
by (induct "n", auto simp:atLeastLessThanSuc)
lemma setsum_shift_bounds_cl_nat_ivl:
"setsum f {m+k..n+k} = setsum (%i. f(i + k)){m..n::nat}"
apply (insert setsum_reindex[OF inj_on_add_nat, where h=f and B = "{m..n}"])
apply (simp add:image_add_atLeastAtMost o_def)
done
corollary setsum_shift_bounds_cl_Suc_ivl:
"setsum f {Suc m..Suc n} = setsum (%i. f(Suc i)){m..n}"
by (simp add:setsum_shift_bounds_cl_nat_ivl[where k="Suc 0", simplified])
corollary setsum_shift_bounds_Suc_ivl:
"setsum f {Suc m..<Suc n} = setsum (%i. f(Suc i)){m..<n}"
by (simp add:setsum_shift_bounds_nat_ivl[where k="Suc 0", simplified])
lemma setsum_shift_lb_Suc0_0:
"f(0::nat) = (0::nat) \<Longrightarrow> setsum f {Suc 0..k} = setsum f {0..k}"
by(simp add:setsum_head_Suc)
lemma setsum_shift_lb_Suc0_0_upt:
"f(0::nat) = 0 \<Longrightarrow> setsum f {Suc 0..<k} = setsum f {0..<k}"
apply(cases k)apply simp
apply(simp add:setsum_head_upt_Suc)
done
lemma setsum_atMost_Suc_shift:
fixes f :: "nat \<Rightarrow> 'a::comm_monoid_add"
shows "(\<Sum>i\<le>Suc n. f i) = f 0 + (\<Sum>i\<le>n. f (Suc i))"
proof (induct n)
case 0 show ?case by simp
next
case (Suc n) note IH = this
have "(\<Sum>i\<le>Suc (Suc n). f i) = (\<Sum>i\<le>Suc n. f i) + f (Suc (Suc n))"
by (rule setsum_atMost_Suc)
also have "(\<Sum>i\<le>Suc n. f i) = f 0 + (\<Sum>i\<le>n. f (Suc i))"
by (rule IH)
also have "f 0 + (\<Sum>i\<le>n. f (Suc i)) + f (Suc (Suc n)) =
f 0 + ((\<Sum>i\<le>n. f (Suc i)) + f (Suc (Suc n)))"
by (rule add_assoc)
also have "(\<Sum>i\<le>n. f (Suc i)) + f (Suc (Suc n)) = (\<Sum>i\<le>Suc n. f (Suc i))"
by (rule setsum_atMost_Suc [symmetric])
finally show ?case .
qed
subsection {* The formula for geometric sums *}
lemma geometric_sum:
assumes "x \<noteq> 1"
shows "(\<Sum>i=0..<n. x ^ i) = (x ^ n - 1) / (x - 1::'a::field)"
proof -
from assms obtain y where "y = x - 1" and "y \<noteq> 0" by simp_all
moreover have "(\<Sum>i=0..<n. (y + 1) ^ i) = ((y + 1) ^ n - 1) / y"
proof (induct n)
case 0 then show ?case by simp
next
case (Suc n)
moreover from Suc `y \<noteq> 0` have "(1 + y) ^ n = (y * inverse y) * (1 + y) ^ n" by simp
ultimately show ?case by (simp add: field_simps divide_inverse)
qed
ultimately show ?thesis by simp
qed
subsection {* The formula for arithmetic sums *}
lemma gauss_sum:
"(2::'a::comm_semiring_1)*(\<Sum>i\<in>{1..n}. of_nat i) =
of_nat n*((of_nat n)+1)"
proof (induct n)
case 0
show ?case by simp
next
case (Suc n)
then show ?case
by (simp add: algebra_simps add: one_add_one [symmetric] del: one_add_one)
(* FIXME: make numeral cancellation simprocs work for semirings *)
qed
theorem arith_series_general:
"(2::'a::comm_semiring_1) * (\<Sum>i\<in>{..<n}. a + of_nat i * d) =
of_nat n * (a + (a + of_nat(n - 1)*d))"
proof cases
assume ngt1: "n > 1"
let ?I = "\<lambda>i. of_nat i" and ?n = "of_nat n"
have
"(\<Sum>i\<in>{..<n}. a+?I i*d) =
((\<Sum>i\<in>{..<n}. a) + (\<Sum>i\<in>{..<n}. ?I i*d))"
by (rule setsum_addf)
also from ngt1 have "\<dots> = ?n*a + (\<Sum>i\<in>{..<n}. ?I i*d)" by simp
also from ngt1 have "\<dots> = (?n*a + d*(\<Sum>i\<in>{1..<n}. ?I i))"
unfolding One_nat_def
by (simp add: setsum_right_distrib atLeast0LessThan[symmetric] setsum_shift_lb_Suc0_0_upt mult_ac)
also have "2*\<dots> = 2*?n*a + d*2*(\<Sum>i\<in>{1..<n}. ?I i)"
by (simp add: algebra_simps)
also from ngt1 have "{1..<n} = {1..n - 1}"
by (cases n) (auto simp: atLeastLessThanSuc_atLeastAtMost)
also from ngt1
have "2*?n*a + d*2*(\<Sum>i\<in>{1..n - 1}. ?I i) = (2*?n*a + d*?I (n - 1)*?I n)"
by (simp only: mult_ac gauss_sum [of "n - 1"], unfold One_nat_def)
(simp add: mult_ac trans [OF add_commute of_nat_Suc [symmetric]])
finally show ?thesis
unfolding mult_2 by (simp add: algebra_simps)
next
assume "\<not>(n > 1)"
hence "n = 1 \<or> n = 0" by auto
thus ?thesis by (auto simp: mult_2)
qed
lemma arith_series_nat:
"(2::nat) * (\<Sum>i\<in>{..<n}. a+i*d) = n * (a + (a+(n - 1)*d))"
proof -
have
"2 * (\<Sum>i\<in>{..<n::nat}. a + of_nat(i)*d) =
of_nat(n) * (a + (a + of_nat(n - 1)*d))"
by (rule arith_series_general)
thus ?thesis
unfolding One_nat_def by auto
qed
lemma arith_series_int:
"2 * (\<Sum>i\<in>{..<n}. a + int i * d) = int n * (a + (a + int(n - 1)*d))"
by (fact arith_series_general) (* FIXME: duplicate *)
lemma sum_diff_distrib:
fixes P::"nat\<Rightarrow>nat"
shows
"\<forall>x. Q x \<le> P x \<Longrightarrow>
(\<Sum>x<n. P x) - (\<Sum>x<n. Q x) = (\<Sum>x<n. P x - Q x)"
proof (induct n)
case 0 show ?case by simp
next
case (Suc n)
let ?lhs = "(\<Sum>x<n. P x) - (\<Sum>x<n. Q x)"
let ?rhs = "\<Sum>x<n. P x - Q x"
from Suc have "?lhs = ?rhs" by simp
moreover
from Suc have "?lhs + P n - Q n = ?rhs + (P n - Q n)" by simp
moreover
from Suc have
"(\<Sum>x<n. P x) + P n - ((\<Sum>x<n. Q x) + Q n) = ?rhs + (P n - Q n)"
by (subst diff_diff_left[symmetric],
subst diff_add_assoc2)
(auto simp: diff_add_assoc2 intro: setsum_mono)
ultimately
show ?case by simp
qed
subsection {* Products indexed over intervals *}
syntax
"_from_to_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(PROD _ = _.._./ _)" [0,0,0,10] 10)
"_from_upto_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(PROD _ = _..<_./ _)" [0,0,0,10] 10)
"_upt_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(PROD _<_./ _)" [0,0,10] 10)
"_upto_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(PROD _<=_./ _)" [0,0,10] 10)
syntax (xsymbols)
"_from_to_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Prod>_ = _.._./ _)" [0,0,0,10] 10)
"_from_upto_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Prod>_ = _..<_./ _)" [0,0,0,10] 10)
"_upt_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Prod>_<_./ _)" [0,0,10] 10)
"_upto_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Prod>_\<le>_./ _)" [0,0,10] 10)
syntax (HTML output)
"_from_to_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Prod>_ = _.._./ _)" [0,0,0,10] 10)
"_from_upto_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Prod>_ = _..<_./ _)" [0,0,0,10] 10)
"_upt_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Prod>_<_./ _)" [0,0,10] 10)
"_upto_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b" ("(3\<Prod>_\<le>_./ _)" [0,0,10] 10)
syntax (latex_prod output)
"_from_to_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b"
("(3\<^raw:$\prod_{>_ = _\<^raw:}^{>_\<^raw:}$> _)" [0,0,0,10] 10)
"_from_upto_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b"
("(3\<^raw:$\prod_{>_ = _\<^raw:}^{<>_\<^raw:}$> _)" [0,0,0,10] 10)
"_upt_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b"
("(3\<^raw:$\prod_{>_ < _\<^raw:}$> _)" [0,0,10] 10)
"_upto_setprod" :: "idt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> 'b"
("(3\<^raw:$\prod_{>_ \<le> _\<^raw:}$> _)" [0,0,10] 10)
translations
"\<Prod>x=a..b. t" == "CONST setprod (%x. t) {a..b}"
"\<Prod>x=a..<b. t" == "CONST setprod (%x. t) {a..<b}"
"\<Prod>i\<le>n. t" == "CONST setprod (\<lambda>i. t) {..n}"
"\<Prod>i<n. t" == "CONST setprod (\<lambda>i. t) {..<n}"
subsection {* Transfer setup *}
lemma transfer_nat_int_set_functions:
"{..n} = nat ` {0..int n}"
"{m..n} = nat ` {int m..int n}" (* need all variants of these! *)
apply (auto simp add: image_def)
apply (rule_tac x = "int x" in bexI)
apply auto
apply (rule_tac x = "int x" in bexI)
apply auto
done
lemma transfer_nat_int_set_function_closures:
"x >= 0 \<Longrightarrow> nat_set {x..y}"
by (simp add: nat_set_def)
declare transfer_morphism_nat_int[transfer add
return: transfer_nat_int_set_functions
transfer_nat_int_set_function_closures
]
lemma transfer_int_nat_set_functions:
"is_nat m \<Longrightarrow> is_nat n \<Longrightarrow> {m..n} = int ` {nat m..nat n}"
by (simp only: is_nat_def transfer_nat_int_set_functions
transfer_nat_int_set_function_closures
transfer_nat_int_set_return_embed nat_0_le
cong: transfer_nat_int_set_cong)
lemma transfer_int_nat_set_function_closures:
"is_nat x \<Longrightarrow> nat_set {x..y}"
by (simp only: transfer_nat_int_set_function_closures is_nat_def)
declare transfer_morphism_int_nat[transfer add
return: transfer_int_nat_set_functions
transfer_int_nat_set_function_closures
]
end