src/HOL/Analysis/Product_Vector.thy

tuned signature;

(*  Title:      HOL/Analysis/Product_Vector.thy
    Author:     Brian Huffman
                Dominique Unruh, University of Tartu
*)

section \<open>Cartesian Products as Vector Spaces\<close>

theory Product_Vector
  imports
    Complex_Main
    "HOL-Library.Product_Plus"
begin

lemma Times_eq_image_sum:
  fixes S :: "'a :: comm_monoid_add set" and T :: "'b :: comm_monoid_add set"
  shows "S \<times> T = {u + v |u v. u \<in> (\<lambda>x. (x, 0)) ` S \<and> v \<in> Pair 0 ` T}"
  by force


subsection \<open>Product is a Module\<close>

locale module_prod = module_pair begin

definition scale :: "'a \<Rightarrow> 'b \<times> 'c \<Rightarrow> 'b \<times> 'c"
  where "scale a v = (s1 a (fst v), s2 a (snd v))"

lemma\<^marker>\<open>tag important\<close> scale_prod: "scale x (a, b) = (s1 x a, s2 x b)"
  by (auto simp: scale_def)

sublocale\<^marker>\<open>tag important\<close> p: module scale
proof qed (simp_all add: scale_def
  m1.scale_left_distrib m1.scale_right_distrib m2.scale_left_distrib m2.scale_right_distrib)

lemma subspace_Times: "m1.subspace A \<Longrightarrow> m2.subspace B \<Longrightarrow> p.subspace (A \<times> B)"
  unfolding m1.subspace_def m2.subspace_def p.subspace_def
  by (auto simp: zero_prod_def scale_def)

lemma module_hom_fst: "module_hom scale s1 fst"
  by unfold_locales (auto simp: scale_def)

lemma module_hom_snd: "module_hom scale s2 snd"
  by unfold_locales (auto simp: scale_def)

end

locale vector_space_prod = vector_space_pair begin

sublocale module_prod s1 s2
  rewrites "module_hom = Vector_Spaces.linear"
  by unfold_locales (fact module_hom_eq_linear)

sublocale p: vector_space scale by unfold_locales (auto simp: algebra_simps)

lemmas linear_fst = module_hom_fst
  and linear_snd = module_hom_snd

end


subsection \<open>Product is a Real Vector Space\<close>

instantiation prod :: (real_vector, real_vector) real_vector
begin

definition scaleR_prod_def:
  "scaleR r A = (scaleR r (fst A), scaleR r (snd A))"

lemma fst_scaleR [simp]: "fst (scaleR r A) = scaleR r (fst A)"
  unfolding scaleR_prod_def by simp

lemma snd_scaleR [simp]: "snd (scaleR r A) = scaleR r (snd A)"
  unfolding scaleR_prod_def by simp

proposition scaleR_Pair [simp]: "scaleR r (a, b) = (scaleR r a, scaleR r b)"
  unfolding scaleR_prod_def by simp

instance
proof
  fix a b :: real and x y :: "'a \<times> 'b"
  show "scaleR a (x + y) = scaleR a x + scaleR a y"
    by (simp add: prod_eq_iff scaleR_right_distrib)
  show "scaleR (a + b) x = scaleR a x + scaleR b x"
    by (simp add: prod_eq_iff scaleR_left_distrib)
  show "scaleR a (scaleR b x) = scaleR (a * b) x"
    by (simp add: prod_eq_iff)
  show "scaleR 1 x = x"
    by (simp add: prod_eq_iff)
qed

end

lemma module_prod_scale_eq_scaleR: "module_prod.scale (*\<^sub>R) (*\<^sub>R) = scaleR"
  apply (rule ext) apply (rule ext)
  apply (subst module_prod.scale_def)
  subgoal by unfold_locales
  by (simp add: scaleR_prod_def)

interpretation real_vector?: vector_space_prod "scaleR::_\<Rightarrow>_\<Rightarrow>'a::real_vector" "scaleR::_\<Rightarrow>_\<Rightarrow>'b::real_vector"
  rewrites "scale = ((*\<^sub>R)::_\<Rightarrow>_\<Rightarrow>('a \<times> 'b))"
    and "module.dependent (*\<^sub>R) = dependent"
    and "module.representation (*\<^sub>R) = representation"
    and "module.subspace (*\<^sub>R) = subspace"
    and "module.span (*\<^sub>R) = span"
    and "vector_space.extend_basis (*\<^sub>R) = extend_basis"
    and "vector_space.dim (*\<^sub>R) = dim"
    and "Vector_Spaces.linear (*\<^sub>R) (*\<^sub>R) = linear"
  subgoal by unfold_locales
  subgoal by (fact module_prod_scale_eq_scaleR)
  unfolding dependent_raw_def representation_raw_def subspace_raw_def span_raw_def
    extend_basis_raw_def dim_raw_def linear_def
  by (rule refl)+

subsection \<open>Product is a Metric Space\<close>

(* TODO: Product of uniform spaces and compatibility with metric_spaces! *)

instantiation\<^marker>\<open>tag unimportant\<close> prod :: (metric_space, metric_space) dist
begin

definition dist_prod_def[code del]:
  "dist x y = sqrt ((dist (fst x) (fst y))\<^sup>2 + (dist (snd x) (snd y))\<^sup>2)"

instance ..
end

instantiation\<^marker>\<open>tag unimportant\<close> prod :: (uniformity, uniformity) uniformity begin

definition [code del]: \<open>(uniformity :: (('a \<times> 'b) \<times> ('a \<times> 'b)) filter) = 
        filtermap (\<lambda>((x1,x2),(y1,y2)). ((x1,y1),(x2,y2))) (uniformity \<times>\<^sub>F uniformity)\<close>

instance..
end

subsubsection \<open>Uniform spaces\<close>

instantiation\<^marker>\<open>tag unimportant\<close> prod :: (uniform_space, uniform_space) uniform_space 
begin
instance 
proof standard
  fix U :: \<open>('a \<times> 'b) set\<close>
  show \<open>open U \<longleftrightarrow> (\<forall>x\<in>U. \<forall>\<^sub>F (x', y) in uniformity. x' = x \<longrightarrow> y \<in> U)\<close>
  proof (intro iffI ballI)
    fix x assume \<open>open U\<close> and \<open>x \<in> U\<close>
    then obtain A B where \<open>open A\<close> \<open>open B\<close> \<open>x \<in> A\<times>B\<close> \<open>A\<times>B \<subseteq> U\<close>
      by (metis open_prod_elim)
    define UA where \<open>UA = (\<lambda>(x'::'a,y). x' = fst x \<longrightarrow> y \<in> A)\<close>
    from \<open>open A\<close> \<open>x \<in> A\<times>B\<close>
    have \<open>eventually UA uniformity\<close>
      unfolding open_uniformity UA_def by auto
    define UB where \<open>UB = (\<lambda>(x'::'b,y). x' = snd x \<longrightarrow> y \<in> B)\<close>
    from \<open>open A\<close> \<open>open B\<close> \<open>x \<in> A\<times>B\<close>
    have \<open>eventually UA uniformity\<close> \<open>eventually UB uniformity\<close>
      unfolding open_uniformity UA_def UB_def by auto
    then have \<open>\<forall>\<^sub>F ((x'1, y1), (x'2, y2)) in uniformity \<times>\<^sub>F uniformity. (x'1,x'2) = x \<longrightarrow> (y1,y2) \<in> U\<close>
      apply (auto intro!: exI[of _ UA] exI[of _ UB] simp add: eventually_prod_filter)
      using \<open>A\<times>B \<subseteq> U\<close> by (auto simp: UA_def UB_def)
    then show \<open>\<forall>\<^sub>F (x', y) in uniformity. x' = x \<longrightarrow> y \<in> U\<close>
      by (simp add: uniformity_prod_def eventually_filtermap case_prod_unfold)
  next
    assume asm: \<open>\<forall>x\<in>U. \<forall>\<^sub>F (x', y) in uniformity. x' = x \<longrightarrow> y \<in> U\<close>
    show \<open>open U\<close>
    proof (unfold open_prod_def, intro ballI)
      fix x assume \<open>x \<in> U\<close>
      with asm have \<open>\<forall>\<^sub>F (x', y) in uniformity. x' = x \<longrightarrow> y \<in> U\<close>
        by auto
      then have \<open>\<forall>\<^sub>F ((x'1, y1), (x'2, y2)) in uniformity \<times>\<^sub>F uniformity. (x'1,x'2) = x \<longrightarrow> (y1,y2) \<in> U\<close>
        by (simp add: uniformity_prod_def eventually_filtermap case_prod_unfold)
      then obtain UA UB where \<open>eventually UA uniformity\<close> and \<open>eventually UB uniformity\<close>
               and UA_UB_U: \<open>UA (a1, a2) \<Longrightarrow> UB (b1, b2) \<Longrightarrow> (a1, b1) = x \<Longrightarrow> (a2, b2) \<in> U\<close> for a1 a2 b1 b2
        apply atomize_elim by (simp add: case_prod_beta eventually_prod_filter)
      have \<open>eventually (\<lambda>a. UA (fst x, a)) (nhds (fst x))\<close>
        using \<open>eventually UA uniformity\<close> eventually_mono eventually_nhds_uniformity by fastforce
      then obtain A where \<open>open A\<close> and A_UA: \<open>A \<subseteq> {a. UA (fst x, a)}\<close> and \<open>fst x \<in> A\<close>
        by (metis (mono_tags, lifting) eventually_nhds mem_Collect_eq subsetI)
      have \<open>eventually (\<lambda>b. UB (snd x, b)) (nhds (snd x))\<close>
        using \<open>eventually UB uniformity\<close> eventually_mono eventually_nhds_uniformity by fastforce
      then obtain B where \<open>open B\<close> and B_UB: \<open>B \<subseteq> {b. UB (snd x, b)}\<close> and \<open>snd x \<in> B\<close>
        by (metis (mono_tags, lifting) eventually_nhds mem_Collect_eq subsetI)
      have \<open>x \<in> A \<times> B\<close>
        by (simp add: \<open>fst x \<in> A\<close> \<open>snd x \<in> B\<close> mem_Times_iff)
      have \<open>A \<times> B \<subseteq> U\<close>
        using A_UA B_UB UA_UB_U by fastforce
      show \<open>\<exists>A B. open A \<and> open B \<and> x \<in> A \<times> B \<and> A \<times> B \<subseteq> U\<close>
        using \<open>A \<times> B \<subseteq> U\<close> \<open>open A\<close> \<open>open B\<close> \<open>x \<in> A \<times> B\<close> by auto
    qed
  qed
next
  show \<open>eventually E uniformity \<Longrightarrow> E (x, x)\<close> for E and x :: \<open>'a \<times> 'b\<close> 
    apply (simp add: uniformity_prod_def eventually_filtermap case_prod_unfold eventually_prod_filter)
    by (metis surj_pair uniformity_refl)
next
  show \<open>eventually E uniformity \<Longrightarrow> \<forall>\<^sub>F (x::'a\<times>'b, y) in uniformity. E (y, x)\<close> for E
    apply (simp only: uniformity_prod_def eventually_filtermap case_prod_unfold eventually_prod_filter)
    apply (erule exE, erule exE, rename_tac Pf Pg)
    apply (rule_tac x=\<open>\<lambda>(x,y). Pf (y,x)\<close> in exI)
    apply (rule_tac x=\<open>\<lambda>(x,y). Pg (y,x)\<close> in exI)
    by (auto simp add: uniformity_sym)
next
  show \<open>\<exists>D. eventually D uniformity \<and> (\<forall>x y z. D (x::'a\<times>'b, y) \<longrightarrow> D (y, z) \<longrightarrow> E (x, z))\<close> 
    if \<open>eventually E uniformity\<close> for E
  proof -
    from that
    obtain EA EB where \<open>eventually EA uniformity\<close> and \<open>eventually EB uniformity\<close>
               and EA_EB_E: \<open>EA (a1, a2) \<Longrightarrow> EB (b1, b2) \<Longrightarrow> E ((a1, b1), (a2, b2))\<close> for a1 a2 b1 b2
      by (auto simp add: uniformity_prod_def eventually_filtermap case_prod_unfold eventually_prod_filter)
    obtain DA where \<open>eventually DA uniformity\<close> and DA_EA: \<open>DA (x,y) \<Longrightarrow> DA (y,z) \<Longrightarrow> EA (x,z)\<close> for x y z
      using \<open>eventually EA uniformity\<close> uniformity_transE by blast
    obtain DB where \<open>eventually DB uniformity\<close> and DB_EB: \<open>DB (x,y) \<Longrightarrow> DB (y,z) \<Longrightarrow> EB (x,z)\<close> for x y z
      using \<open>eventually EB uniformity\<close> uniformity_transE by blast
    define D where \<open>D = (\<lambda>((a1,b1),(a2,b2)). DA (a1,a2) \<and> DB (b1,b2))\<close>
    have \<open>eventually D uniformity\<close>
      using \<open>eventually DA uniformity\<close> \<open>eventually DB uniformity\<close>
      by (auto simp add: uniformity_prod_def eventually_filtermap case_prod_unfold eventually_prod_filter D_def)
    moreover have \<open>D ((a1, b1), (a2, b2)) \<Longrightarrow> D ((a2, b2), (a3, b3)) \<Longrightarrow> E ((a1, b1), (a3, b3))\<close> for a1 b1 a2 b2 a3 b3
      using DA_EA DB_EB D_def EA_EB_E by blast
    ultimately show ?thesis
      by auto
  qed
qed
end


lemma (in uniform_space) nhds_eq_comap_uniformity: "nhds x = filtercomap (\<lambda>y. (x, y)) uniformity"
proof -
  have *: "eventually P (filtercomap (\<lambda>y. (x, y)) F) \<longleftrightarrow>
           eventually (\<lambda>z. fst z = x \<longrightarrow> P (snd z)) F" for P :: "'a \<Rightarrow> bool" and F
    unfolding eventually_filtercomap  
    by (smt (verit) eventually_elim2 fst_conv prod.collapse snd_conv)
  thus ?thesis
    unfolding filter_eq_iff
    by (subst *) (auto simp: eventually_nhds_uniformity case_prod_unfold)
qed

lemma uniformity_of_uniform_continuous_invariant:
  fixes f :: "'a :: uniform_space \<Rightarrow> 'a \<Rightarrow> 'a"
  assumes "filterlim (\<lambda>((a,b),(c,d)). (f a c, f b d)) uniformity (uniformity \<times>\<^sub>F uniformity)"
  assumes "eventually P uniformity"
  obtains Q where "eventually Q uniformity" "\<And>a b c. Q (a, b) \<Longrightarrow> P (f a c, f b c)"
  using eventually_compose_filterlim[OF assms(2,1)] uniformity_refl
    by (fastforce simp: case_prod_unfold eventually_filtercomap eventually_prod_same)

class uniform_topological_monoid_add = topological_monoid_add + uniform_space +
  assumes uniformly_continuous_add':
    "filterlim (\<lambda>((a,b), (c,d)). (a + c, b + d)) uniformity (uniformity \<times>\<^sub>F uniformity)"

lemma uniformly_continuous_add:
  "uniformly_continuous_on UNIV (\<lambda>(x :: 'a :: uniform_topological_monoid_add,y). x + y)"
  using uniformly_continuous_add'[where ?'a = 'a]
  by (simp add: uniformly_continuous_on_uniformity case_prod_unfold uniformity_prod_def filterlim_filtermap)

lemma filterlim_fst: "filterlim fst F (F \<times>\<^sub>F G)"
  by (simp add: filterlim_def filtermap_fst_prod_filter)

lemma filterlim_snd: "filterlim snd G (F \<times>\<^sub>F G)"
  by (simp add: filterlim_def filtermap_snd_prod_filter)

class uniform_topological_group_add = topological_group_add + uniform_topological_monoid_add +
  assumes uniformly_continuous_uminus': "filterlim (\<lambda>(a, b). (-a, -b)) uniformity uniformity"
begin

lemma uniformly_continuous_minus':
  "filterlim (\<lambda>((a,b), (c,d)). (a - c, b - d)) uniformity (uniformity \<times>\<^sub>F uniformity)"
proof -
  have "filterlim ((\<lambda>((a,b), (c,d)). (a + c, b + d)) \<circ> (\<lambda>((a,b), (c,d)). ((a, b), (-c, -d))))
          uniformity (uniformity \<times>\<^sub>F uniformity)"
    unfolding o_def using uniformly_continuous_uminus'
    by (intro filterlim_compose[OF uniformly_continuous_add'])
       (auto simp: case_prod_unfold intro!: filterlim_Pair
          filterlim_fst filterlim_compose[OF _ filterlim_snd])
  thus ?thesis
    by (simp add: o_def case_prod_unfold)
qed

end

lemma uniformly_continuous_uminus:
  "uniformly_continuous_on UNIV (\<lambda>x :: 'a :: uniform_topological_group_add. -x)"
  using uniformly_continuous_uminus'[where ?'a = 'a]
  by (simp add: uniformly_continuous_on_uniformity)

lemma uniformly_continuous_minus:
  "uniformly_continuous_on UNIV (\<lambda>(x :: 'a :: uniform_topological_group_add,y). x - y)"
  using uniformly_continuous_minus'[where ?'a = 'a]
  by (simp add: uniformly_continuous_on_uniformity case_prod_unfold uniformity_prod_def filterlim_filtermap)



lemma real_normed_vector_is_uniform_topological_group_add [Pure.intro]:
  "OFCLASS('a :: real_normed_vector, uniform_topological_group_add_class)"
proof
  show "filterlim (\<lambda>((a::'a,b), (c,d)). (a + c, b + d)) uniformity (uniformity \<times>\<^sub>F uniformity)"
    unfolding filterlim_def le_filter_def eventually_filtermap case_prod_unfold
  proof safe
    fix P :: "'a \<times> 'a \<Rightarrow> bool"
    assume "eventually P uniformity"
    then obtain \<epsilon> where \<epsilon>: "\<epsilon> > 0" "\<And>x y. dist x y < \<epsilon> \<Longrightarrow> P (x, y)"
      by (auto simp: eventually_uniformity_metric)
    define Q where "Q = (\<lambda>(x::'a,y). dist x y < \<epsilon> / 2)"
    have Q: "eventually Q uniformity"
      unfolding eventually_uniformity_metric Q_def using \<open>\<epsilon> > 0\<close>
      by (meson case_prodI divide_pos_pos zero_less_numeral)
    have "P (a + c, b + d)" if "Q (a, b)" "Q (c, d)" for a b c d
    proof -
      have "dist (a + c) (b + d) \<le> dist a b + dist c d"
        by (simp add: dist_norm norm_diff_triangle_ineq)
      also have "\<dots> < \<epsilon>"
        using that by (auto simp: Q_def)
      finally show ?thesis
        by (intro \<epsilon>)
    qed
    thus "\<forall>\<^sub>F x in uniformity \<times>\<^sub>F uniformity. P (fst (fst x) + fst (snd x), snd (fst x) + snd (snd x))"
      unfolding eventually_prod_filter by (intro exI[of _ Q] conjI Q) auto
  qed
next
  show "filterlim (\<lambda>((a::'a), b). (-a, -b)) uniformity uniformity"
    unfolding filterlim_def le_filter_def eventually_filtermap
  proof safe
    fix P :: "'a \<times> 'a \<Rightarrow> bool"
    assume "eventually P uniformity"
    then obtain \<epsilon> where \<epsilon>: "\<epsilon> > 0" "\<And>x y. dist x y < \<epsilon> \<Longrightarrow> P (x, y)"
      by (auto simp: eventually_uniformity_metric)
    show "\<forall>\<^sub>F x in uniformity. P (case x of (a, b) \<Rightarrow> (- a, - b))"
      unfolding eventually_uniformity_metric
      by (intro exI[of _ \<epsilon>]) (auto intro!: \<epsilon> simp: dist_norm norm_minus_commute)
  qed
qed

instance real :: uniform_topological_group_add ..
instance complex :: uniform_topological_group_add ..

lemma cauchy_seq_finset_iff_vanishing:
  "uniformity = filtercomap (\<lambda>(x,y). y - x :: 'a :: uniform_topological_group_add) (nhds 0)"
proof -
  have "filtercomap (\<lambda>x. (0, case x of (x, y) \<Rightarrow> y - (x :: 'a))) uniformity \<le> uniformity"
    apply (simp add: le_filter_def eventually_filtercomap)
    using uniformity_of_uniform_continuous_invariant[OF uniformly_continuous_add']
    by (metis diff_self eq_diff_eq)
  moreover
  have "uniformity \<le> filtercomap (\<lambda>x. (0, case x of (x, y) \<Rightarrow> y - (x :: 'a))) uniformity"
    apply (simp add: le_filter_def eventually_filtercomap)
    using uniformity_of_uniform_continuous_invariant[OF uniformly_continuous_minus']
    by (metis (mono_tags) diff_self eventually_mono surjective_pairing)
  ultimately show ?thesis
    by (simp add: nhds_eq_comap_uniformity filtercomap_filtercomap)
qed

subsubsection \<open>Metric spaces\<close>

instantiation\<^marker>\<open>tag unimportant\<close> prod :: (metric_space, metric_space) uniformity_dist begin
instance
proof
  show \<open>uniformity = (INF e\<in>{0 <..}. principal {(x::'a\<times>'b, y). dist x y < e})\<close>
  proof (subst filter_eq_iff, intro allI iffI)
    fix P :: \<open>('a \<times> 'b) \<times> ('a \<times> 'b) \<Rightarrow> bool\<close>

    have 1: \<open>\<exists>e\<in>{0<..}.
              {(x,y). dist x y < e} \<subseteq> {(x,y). dist x y < a} \<and>
              {(x,y). dist x y < e} \<subseteq> {(x,y). dist x y < b}\<close> if \<open>a>0\<close> \<open>b>0\<close> for a b
      apply (rule bexI[of _ \<open>min a b\<close>])
      using that by auto
    have 2: \<open>mono (\<lambda>P. eventually (\<lambda>x. P (Q x)) F)\<close> for F :: \<open>'z filter\<close> and Q :: \<open>'z \<Rightarrow> 'y\<close>
      unfolding mono_def using eventually_mono le_funD by fastforce
    have \<open>\<forall>\<^sub>F ((x1::'a,y1),(x2::'b,y2)) in uniformity \<times>\<^sub>F uniformity. dist x1 y1 < e/2 \<and> dist x2 y2 < e/2\<close> if \<open>e>0\<close> for e
      by (auto intro!: eventually_prodI exI[of _ \<open>e/2\<close>] simp: case_prod_unfold eventually_uniformity_metric that)
    then have 3: \<open>\<forall>\<^sub>F ((x1::'a,y1),(x2::'b,y2)) in uniformity \<times>\<^sub>F uniformity. dist (x1,x2) (y1,y2) < e\<close> if \<open>e>0\<close> for e
      apply (rule eventually_rev_mp)
      by (auto intro!: that eventuallyI simp: case_prod_unfold dist_prod_def sqrt_sum_squares_half_less)
    show \<open>eventually P (INF e\<in>{0<..}. principal {(x, y). dist x y < e}) \<Longrightarrow> eventually P uniformity\<close>
      apply (subst (asm) eventually_INF_base)
      using 1 3 apply (auto simp: uniformity_prod_def case_prod_unfold eventually_filtermap 2 eventually_principal)
      by (smt (verit, best) eventually_mono)
  next
    fix P :: \<open>('a \<times> 'b) \<times> ('a \<times> 'b) \<Rightarrow> bool\<close>
    assume \<open>eventually P uniformity\<close>
    then obtain P1 P2 where \<open>eventually P1 uniformity\<close> \<open>eventually P2 uniformity\<close>
      and P1P2P: \<open>P1 (x1, y1) \<Longrightarrow> P2 (x2, y2) \<Longrightarrow> P ((x1, x2), (y1, y2))\<close> for x1 y1 x2 y2
      by (auto simp: eventually_filtermap case_prod_beta eventually_prod_filter uniformity_prod_def)
    from \<open>eventually P1 uniformity\<close> obtain e1 where \<open>e1>0\<close> and e1P1: \<open>dist x y < e1 \<Longrightarrow> P1 (x,y)\<close> for x y
      using eventually_uniformity_metric by blast
    from \<open>eventually P2 uniformity\<close> obtain e2 where \<open>e2>0\<close> and e2P2: \<open>dist x y < e2 \<Longrightarrow> P2 (x,y)\<close> for x y
      using eventually_uniformity_metric by blast
    define e where \<open>e = min e1 e2\<close>
    have \<open>e > 0\<close>
      using \<open>0 < e1\<close> \<open>0 < e2\<close> e_def by auto
    have \<open>dist (x1,x2) (y1,y2) < e \<Longrightarrow> dist x1 y1 < e1\<close> for x1 y1 :: 'a and x2 y2 :: 'b
      unfolding dist_prod_def e_def apply auto
      by (smt (verit, best) real_sqrt_sum_squares_ge1)
    moreover have \<open>dist (x1,x2) (y1,y2) < e \<Longrightarrow> dist x2 y2 < e2\<close> for x1 y1 :: 'a and x2 y2 :: 'b
      unfolding dist_prod_def e_def apply auto
      by (smt (verit, best) real_sqrt_sum_squares_ge1)
    ultimately have *: \<open>dist (x1,x2) (y1,y2) < e \<Longrightarrow> P ((x1, x2), (y1, y2))\<close> for x1 y1 x2 y2
      using e1P1 e2P2 P1P2P by auto

    show \<open>eventually P (INF e\<in>{0<..}. principal {(x, y). dist x y < e})\<close>
       apply (rule eventually_INF1[where i=e])
      using \<open>e > 0\<close> * by (auto simp: eventually_principal)
  qed
qed
end

declare uniformity_Abort[where 'a="'a :: metric_space \<times> 'b :: metric_space", code]

instantiation prod :: (metric_space, metric_space) metric_space
begin

proposition dist_Pair_Pair: "dist (a, b) (c, d) = sqrt ((dist a c)\<^sup>2 + (dist b d)\<^sup>2)"
  unfolding dist_prod_def by simp

lemma dist_fst_le: "dist (fst x) (fst y) \<le> dist x y"
  unfolding dist_prod_def by (rule real_sqrt_sum_squares_ge1)

lemma dist_snd_le: "dist (snd x) (snd y) \<le> dist x y"
  unfolding dist_prod_def by (rule real_sqrt_sum_squares_ge2)

instance
proof
  fix x y :: "'a \<times> 'b"
  show "dist x y = 0 \<longleftrightarrow> x = y"
    unfolding dist_prod_def prod_eq_iff by simp
next
  fix x y z :: "'a \<times> 'b"
  show "dist x y \<le> dist x z + dist y z"
    unfolding dist_prod_def
    by (intro order_trans [OF _ real_sqrt_sum_squares_triangle_ineq]
        real_sqrt_le_mono add_mono power_mono dist_triangle2 zero_le_dist)
next
  fix S :: "('a \<times> 'b) set"
  have *: "open S \<longleftrightarrow> (\<forall>x\<in>S. \<exists>e>0. \<forall>y. dist y x < e \<longrightarrow> y \<in> S)"
  proof
    assume "open S" show "\<forall>x\<in>S. \<exists>e>0. \<forall>y. dist y x < e \<longrightarrow> y \<in> S"
    proof
      fix x assume "x \<in> S"
      obtain A B where "open A" "open B" "x \<in> A \<times> B" "A \<times> B \<subseteq> S"
        using \<open>open S\<close> and \<open>x \<in> S\<close> by (rule open_prod_elim)
      obtain r where r: "0 < r" "\<forall>y. dist y (fst x) < r \<longrightarrow> y \<in> A"
        using \<open>open A\<close> and \<open>x \<in> A \<times> B\<close> unfolding open_dist by auto
      obtain s where s: "0 < s" "\<forall>y. dist y (snd x) < s \<longrightarrow> y \<in> B"
        using \<open>open B\<close> and \<open>x \<in> A \<times> B\<close> unfolding open_dist by auto
      let ?e = "min r s"
      have "0 < ?e \<and> (\<forall>y. dist y x < ?e \<longrightarrow> y \<in> S)"
      proof (intro allI impI conjI)
        show "0 < min r s" by (simp add: r(1) s(1))
      next
        fix y assume "dist y x < min r s"
        hence "dist y x < r" and "dist y x < s"
          by simp_all
        hence "dist (fst y) (fst x) < r" and "dist (snd y) (snd x) < s"
          by (auto intro: le_less_trans dist_fst_le dist_snd_le)
        hence "fst y \<in> A" and "snd y \<in> B"
          by (simp_all add: r(2) s(2))
        hence "y \<in> A \<times> B" by (induct y, simp)
        with \<open>A \<times> B \<subseteq> S\<close> show "y \<in> S" ..
      qed
      thus "\<exists>e>0. \<forall>y. dist y x < e \<longrightarrow> y \<in> S" ..
    qed
  next
    assume *: "\<forall>x\<in>S. \<exists>e>0. \<forall>y. dist y x < e \<longrightarrow> y \<in> S" show "open S"
    proof (rule open_prod_intro)
      fix x assume "x \<in> S"
      then obtain e where "0 < e" and S: "\<forall>y. dist y x < e \<longrightarrow> y \<in> S"
        using * by fast
      define r where "r = e / sqrt 2"
      define s where "s = e / sqrt 2"
      from \<open>0 < e\<close> have "0 < r" and "0 < s"
        unfolding r_def s_def by simp_all
      from \<open>0 < e\<close> have "e = sqrt (r\<^sup>2 + s\<^sup>2)"
        unfolding r_def s_def by (simp add: power_divide)
      define A where "A = {y. dist (fst x) y < r}"
      define B where "B = {y. dist (snd x) y < s}"
      have "open A" and "open B"
        unfolding A_def B_def by (simp_all add: open_ball)
      moreover have "x \<in> A \<times> B"
        unfolding A_def B_def mem_Times_iff
        using \<open>0 < r\<close> and \<open>0 < s\<close> by simp
      moreover have "A \<times> B \<subseteq> S"
      proof (clarify)
        fix a b assume "a \<in> A" and "b \<in> B"
        hence "dist a (fst x) < r" and "dist b (snd x) < s"
          unfolding A_def B_def by (simp_all add: dist_commute)
        hence "dist (a, b) x < e"
          unfolding dist_prod_def \<open>e = sqrt (r\<^sup>2 + s\<^sup>2)\<close>
          by (simp add: add_strict_mono power_strict_mono)
        thus "(a, b) \<in> S"
          by (simp add: S)
      qed
      ultimately show "\<exists>A B. open A \<and> open B \<and> x \<in> A \<times> B \<and> A \<times> B \<subseteq> S" by fast
    qed
  qed
qed

end

declare [[code abort: "dist::('a::metric_space*'b::metric_space)\<Rightarrow>('a*'b) \<Rightarrow> real"]]

lemma Cauchy_fst: "Cauchy X \<Longrightarrow> Cauchy (\<lambda>n. fst (X n :: 'a::metric_space \<times> 'b::metric_space))"
  unfolding Cauchy_def by (fast elim: le_less_trans [OF dist_fst_le])

lemma Cauchy_snd: "Cauchy X \<Longrightarrow> Cauchy (\<lambda>n. snd (X n :: 'a::metric_space \<times> 'b::metric_space))"
  unfolding Cauchy_def by (fast elim: le_less_trans [OF dist_snd_le])

lemma Cauchy_Pair:
  assumes "Cauchy X" and "Cauchy Y"
  shows "Cauchy (\<lambda>n. (X n :: 'a::metric_space, Y n :: 'a::metric_space))"
proof (rule metric_CauchyI)
  fix r :: real assume "0 < r"
  hence "0 < r / sqrt 2" (is "0 < ?s") by simp
  obtain M where M: "\<forall>m\<ge>M. \<forall>n\<ge>M. dist (X m) (X n) < ?s"
    using metric_CauchyD [OF \<open>Cauchy X\<close> \<open>0 < ?s\<close>] ..
  obtain N where N: "\<forall>m\<ge>N. \<forall>n\<ge>N. dist (Y m) (Y n) < ?s"
    using metric_CauchyD [OF \<open>Cauchy Y\<close> \<open>0 < ?s\<close>] ..
  have "\<forall>m\<ge>max M N. \<forall>n\<ge>max M N. dist (X m, Y m) (X n, Y n) < r"
    using M N by (simp add: real_sqrt_sum_squares_less dist_Pair_Pair)
  then show "\<exists>n0. \<forall>m\<ge>n0. \<forall>n\<ge>n0. dist (X m, Y m) (X n, Y n) < r" ..
qed

text \<open>Analogue to @{thm [source] uniformly_continuous_on_def} for two-argument functions.\<close>
lemma uniformly_continuous_on_prod_metric:
  fixes f :: \<open>('a::metric_space \<times> 'b::metric_space) \<Rightarrow> 'c::metric_space\<close>
  shows \<open>uniformly_continuous_on (S\<times>T) f \<longleftrightarrow> (\<forall>e>0. \<exists>d>0. \<forall>x\<in>S. \<forall>y\<in>S. \<forall>x'\<in>T. \<forall>y'\<in>T. dist x y < d \<longrightarrow> dist x' y' < d \<longrightarrow> dist (f (x, x')) (f (y, y')) < e)\<close>
proof (unfold uniformly_continuous_on_def, intro iffI impI allI)
  fix e :: real 
  assume \<open>e > 0\<close> and \<open>\<forall>e>0. \<exists>d>0. \<forall>x\<in>S. \<forall>y\<in>S. \<forall>x'\<in>T. \<forall>y'\<in>T. dist x y < d \<longrightarrow> dist x' y' < d \<longrightarrow> dist (f (x, x')) (f (y, y')) < e\<close>
  then obtain d where \<open>d > 0\<close>
    and d: \<open>\<forall>x\<in>S. \<forall>y\<in>S. \<forall>x'\<in>T. \<forall>y'\<in>T. dist x y < d \<longrightarrow> dist x' y' < d \<longrightarrow> dist (f (x, x')) (f (y, y')) < e\<close>
    by auto
  show \<open>\<exists>d>0. \<forall>x\<in>S\<times>T. \<forall>y\<in>S\<times>T. dist y x < d \<longrightarrow> dist (f y) (f x) < e\<close>
    apply (rule exI[of _ d])
    using \<open>d>0\<close> d[rule_format] apply auto
    by (smt (verit, del_insts) dist_fst_le dist_snd_le fst_conv snd_conv)
next
  fix e :: real 
  assume \<open>e > 0\<close> and \<open>\<forall>e>0. \<exists>d>0. \<forall>x\<in>S\<times>T. \<forall>x'\<in>S\<times>T. dist x' x < d \<longrightarrow> dist (f x') (f x) < e\<close>
  then obtain d where \<open>d > 0\<close> and d: \<open>\<forall>x\<in>S\<times>T. \<forall>x'\<in>S\<times>T. dist x' x < d \<longrightarrow> dist (f x') (f x) < e\<close>
    by auto
  show \<open>\<exists>d>0. \<forall>x\<in>S. \<forall>y\<in>S. \<forall>x'\<in>T. \<forall>y'\<in>T. dist x y < d \<longrightarrow> dist x' y' < d \<longrightarrow> dist (f (x, x')) (f (y, y')) < e\<close>
  proof (intro exI conjI impI ballI)
    from \<open>d > 0\<close> show \<open>d / 2 > 0\<close> by auto
    fix x y x' y'
    assume [simp]: \<open>x \<in> S\<close> \<open>y \<in> S\<close> \<open>x' \<in> T\<close> \<open>y' \<in> T\<close>
    assume \<open>dist x y < d / 2\<close> and \<open>dist x' y' < d / 2\<close>
    then have \<open>dist (x, x') (y, y') < d\<close>
      by (simp add: dist_Pair_Pair sqrt_sum_squares_half_less)
    with d show \<open>dist (f (x, x')) (f (y, y')) < e\<close>
      by auto
  qed
qed

text \<open>Analogue to @{thm [source] isUCont_def} for two-argument functions.\<close>
lemma isUCont_prod_metric:
  fixes f :: \<open>('a::metric_space \<times> 'b::metric_space) \<Rightarrow> 'c::metric_space\<close>
  shows \<open>isUCont f \<longleftrightarrow> (\<forall>e>0. \<exists>d>0. \<forall>x. \<forall>y. \<forall>x'. \<forall>y'. dist x y < d \<longrightarrow> dist x' y' < d \<longrightarrow> dist (f (x, x')) (f (y, y')) < e)\<close>
  using uniformly_continuous_on_prod_metric[of UNIV UNIV]
  by auto

text \<open>This logically belong with the real vector spaces but we only have the necessary lemmas now.\<close>
lemma isUCont_plus[simp]:
  shows \<open>isUCont (\<lambda>(x::'a::real_normed_vector,y). x+y)\<close>
proof (rule isUCont_prod_metric[THEN iffD2], intro allI impI, simp)
  fix e :: real assume \<open>0 < e\<close>
  show \<open>\<exists>d>0. \<forall>x y :: 'a. dist x y < d \<longrightarrow> (\<forall>x' y'. dist x' y' < d \<longrightarrow> dist (x + x') (y + y') < e)\<close>
    apply (rule exI[of _ \<open>e/2\<close>])
    using \<open>0 < e\<close> apply auto
    by (smt (verit, ccfv_SIG) dist_add_cancel dist_add_cancel2 dist_commute dist_triangle_lt)
qed

subsection \<open>Product is a Complete Metric Space\<close>

instance\<^marker>\<open>tag important\<close> prod :: (complete_space, complete_space) complete_space
proof
  fix X :: "nat \<Rightarrow> 'a \<times> 'b" assume "Cauchy X"
  have 1: "(\<lambda>n. fst (X n)) \<longlonglongrightarrow> lim (\<lambda>n. fst (X n))"
    using Cauchy_fst [OF \<open>Cauchy X\<close>]
    by (simp add: Cauchy_convergent_iff convergent_LIMSEQ_iff)
  have 2: "(\<lambda>n. snd (X n)) \<longlonglongrightarrow> lim (\<lambda>n. snd (X n))"
    using Cauchy_snd [OF \<open>Cauchy X\<close>]
    by (simp add: Cauchy_convergent_iff convergent_LIMSEQ_iff)
  have "X \<longlonglongrightarrow> (lim (\<lambda>n. fst (X n)), lim (\<lambda>n. snd (X n)))"
    using tendsto_Pair [OF 1 2] by simp
  then show "convergent X"
    by (rule convergentI)
qed

subsection \<open>Product is a Normed Vector Space\<close>

instantiation prod :: (real_normed_vector, real_normed_vector) real_normed_vector
begin

definition norm_prod_def[code del]:
  "norm x = sqrt ((norm (fst x))\<^sup>2 + (norm (snd x))\<^sup>2)"

definition sgn_prod_def:
  "sgn (x::'a \<times> 'b) = scaleR (inverse (norm x)) x"

proposition norm_Pair: "norm (a, b) = sqrt ((norm a)\<^sup>2 + (norm b)\<^sup>2)"
  unfolding norm_prod_def by simp

instance
proof
  fix r :: real and x y :: "'a \<times> 'b"
  show "norm x = 0 \<longleftrightarrow> x = 0"
    unfolding norm_prod_def
    by (simp add: prod_eq_iff)
  show "norm (x + y) \<le> norm x + norm y"
    unfolding norm_prod_def
    apply (rule order_trans [OF _ real_sqrt_sum_squares_triangle_ineq])
    apply (simp add: add_mono power_mono norm_triangle_ineq)
    done
  show "norm (scaleR r x) = \<bar>r\<bar> * norm x"
    unfolding norm_prod_def
    apply (simp add: power_mult_distrib)
    apply (simp add: distrib_left [symmetric])
    apply (simp add: real_sqrt_mult)
    done
  show "sgn x = scaleR (inverse (norm x)) x"
    by (rule sgn_prod_def)
  show "dist x y = norm (x - y)"
    unfolding dist_prod_def norm_prod_def
    by (simp add: dist_norm)
qed

end

declare [[code abort: "norm::('a::real_normed_vector*'b::real_normed_vector) \<Rightarrow> real"]]

instance\<^marker>\<open>tag important\<close> prod :: (banach, banach) banach ..

subsubsection\<^marker>\<open>tag unimportant\<close> \<open>Pair operations are linear\<close>

lemma bounded_linear_fst: "bounded_linear fst"
  using fst_add fst_scaleR
  by (rule bounded_linear_intro [where K=1], simp add: norm_prod_def)

lemma bounded_linear_snd: "bounded_linear snd"
  using snd_add snd_scaleR
  by (rule bounded_linear_intro [where K=1], simp add: norm_prod_def)

lemmas bounded_linear_fst_comp = bounded_linear_fst[THEN bounded_linear_compose]

lemmas bounded_linear_snd_comp = bounded_linear_snd[THEN bounded_linear_compose]

lemma bounded_linear_Pair:
  assumes f: "bounded_linear f"
  assumes g: "bounded_linear g"
  shows "bounded_linear (\<lambda>x. (f x, g x))"
proof
  interpret f: bounded_linear f by fact
  interpret g: bounded_linear g by fact
  fix x y and r :: real
  show "(f (x + y), g (x + y)) = (f x, g x) + (f y, g y)"
    by (simp add: f.add g.add)
  show "(f (r *\<^sub>R x), g (r *\<^sub>R x)) = r *\<^sub>R (f x, g x)"
    by (simp add: f.scale g.scale)
  obtain Kf where "0 < Kf" and norm_f: "\<And>x. norm (f x) \<le> norm x * Kf"
    using f.pos_bounded by fast
  obtain Kg where "0 < Kg" and norm_g: "\<And>x. norm (g x) \<le> norm x * Kg"
    using g.pos_bounded by fast
  have "\<forall>x. norm (f x, g x) \<le> norm x * (Kf + Kg)"
    apply (rule allI)
    apply (simp add: norm_Pair)
    apply (rule order_trans [OF sqrt_add_le_add_sqrt], simp, simp)
    apply (simp add: distrib_left)
    apply (rule add_mono [OF norm_f norm_g])
    done
  then show "\<exists>K. \<forall>x. norm (f x, g x) \<le> norm x * K" ..
qed

subsubsection\<^marker>\<open>tag unimportant\<close> \<open>Frechet derivatives involving pairs\<close>

text\<^marker>\<open>tag important\<close> \<open>%whitespace\<close>
proposition has_derivative_Pair [derivative_intros]:
  assumes f: "(f has_derivative f') (at x within s)"
    and g: "(g has_derivative g') (at x within s)"
  shows "((\<lambda>x. (f x, g x)) has_derivative (\<lambda>h. (f' h, g' h))) (at x within s)"
proof (rule has_derivativeI_sandwich[of 1])
  show "bounded_linear (\<lambda>h. (f' h, g' h))"
    using f g by (intro bounded_linear_Pair has_derivative_bounded_linear)
  let ?Rf = "\<lambda>y. f y - f x - f' (y - x)"
  let ?Rg = "\<lambda>y. g y - g x - g' (y - x)"
  let ?R = "\<lambda>y. ((f y, g y) - (f x, g x) - (f' (y - x), g' (y - x)))"

  show "((\<lambda>y. norm (?Rf y) / norm (y - x) + norm (?Rg y) / norm (y - x)) \<longlongrightarrow> 0) (at x within s)"
    using f g by (intro tendsto_add_zero) (auto simp: has_derivative_iff_norm)

  fix y :: 'a assume "y \<noteq> x"
  show "norm (?R y) / norm (y - x) \<le> norm (?Rf y) / norm (y - x) + norm (?Rg y) / norm (y - x)"
    unfolding add_divide_distrib [symmetric]
    by (simp add: norm_Pair divide_right_mono order_trans [OF sqrt_add_le_add_sqrt])
qed simp

lemma differentiable_Pair [simp, derivative_intros]:
  "f differentiable at x within s \<Longrightarrow> g differentiable at x within s \<Longrightarrow>
    (\<lambda>x. (f x, g x)) differentiable at x within s"
  unfolding differentiable_def by (blast intro: has_derivative_Pair)

lemmas has_derivative_fst [derivative_intros] = bounded_linear.has_derivative [OF bounded_linear_fst]
lemmas has_derivative_snd [derivative_intros] = bounded_linear.has_derivative [OF bounded_linear_snd]

lemma has_derivative_split [derivative_intros]:
  "((\<lambda>p. f (fst p) (snd p)) has_derivative f') F \<Longrightarrow> ((\<lambda>(a, b). f a b) has_derivative f') F"
  unfolding split_beta' .


subsubsection\<^marker>\<open>tag unimportant\<close> \<open>Vector derivatives involving pairs\<close>

lemma has_vector_derivative_Pair[derivative_intros]:
  assumes "(f has_vector_derivative f') (at x within s)"
    "(g has_vector_derivative g') (at x within s)"
  shows "((\<lambda>x. (f x, g x)) has_vector_derivative (f', g')) (at x within s)"
  using assms
  by (auto simp: has_vector_derivative_def intro!: derivative_eq_intros)

lemma
  fixes x :: "'a::real_normed_vector"
  shows norm_Pair1 [simp]: "norm (0,x) = norm x"
    and norm_Pair2 [simp]: "norm (x,0) = norm x"
by (auto simp: norm_Pair)

lemma norm_commute: "norm (x,y) = norm (y,x)"
  by (simp add: norm_Pair)

lemma norm_fst_le: "norm x \<le> norm (x,y)"
  by (metis dist_fst_le fst_conv fst_zero norm_conv_dist)

lemma norm_snd_le: "norm y \<le> norm (x,y)"
  by (metis dist_snd_le snd_conv snd_zero norm_conv_dist)

lemma norm_Pair_le:
  shows "norm (x, y) \<le> norm x + norm y"
  unfolding norm_Pair
  by (metis norm_ge_zero sqrt_sum_squares_le_sum)

lemma (in vector_space_prod) span_Times_sing1: "p.span ({0} \<times> B) = {0} \<times> vs2.span B"
  apply (rule p.span_unique)
  subgoal by (auto intro!: vs1.span_base vs2.span_base)
  subgoal using vs1.subspace_single_0 vs2.subspace_span by (rule subspace_Times)
  subgoal for T
  proof safe
    fix b
    assume subset_T: "{0} \<times> B \<subseteq> T" and subspace: "p.subspace T" and b_span: "b \<in> vs2.span B"
    then obtain t r where b: "b = (\<Sum>a\<in>t. r a *b a)" and t: "finite t" "t \<subseteq> B"
      by (auto simp: vs2.span_explicit)
    have "(0, b) = (\<Sum>b\<in>t. scale (r b) (0, b))"
      unfolding b scale_prod sum_prod
      by simp
    also have "\<dots> \<in> T"
      using \<open>t \<subseteq> B\<close> subset_T
      by (auto intro!: p.subspace_sum p.subspace_scale subspace)
    finally show "(0, b) \<in> T" .
  qed
  done

lemma (in vector_space_prod) span_Times_sing2: "p.span (A \<times> {0}) = vs1.span A \<times> {0}"
  apply (rule p.span_unique)
  subgoal by (auto intro!: vs1.span_base vs2.span_base)
  subgoal using vs1.subspace_span vs2.subspace_single_0 by (rule subspace_Times)
  subgoal for T
  proof safe
    fix a
    assume subset_T: "A \<times> {0} \<subseteq> T" and subspace: "p.subspace T" and a_span: "a \<in> vs1.span A"
    then obtain t r where a: "a = (\<Sum>a\<in>t. r a *a a)" and t: "finite t" "t \<subseteq> A"
      by (auto simp: vs1.span_explicit)
    have "(a, 0) = (\<Sum>a\<in>t. scale (r a) (a, 0))"
      unfolding a scale_prod sum_prod
      by simp
    also have "\<dots> \<in> T"
      using \<open>t \<subseteq> A\<close> subset_T
      by (auto intro!: p.subspace_sum p.subspace_scale subspace)
    finally show "(a, 0) \<in> T" .
  qed
  done

subsection \<open>Product is Finite Dimensional\<close>

lemma (in finite_dimensional_vector_space) zero_not_in_Basis[simp]: "0 \<notin> Basis"
  using dependent_zero local.independent_Basis by blast

locale finite_dimensional_vector_space_prod = vector_space_prod + finite_dimensional_vector_space_pair begin

definition "Basis_pair = B1 \<times> {0} \<union> {0} \<times> B2"

sublocale p: finite_dimensional_vector_space scale Basis_pair
proof unfold_locales
  show "finite Basis_pair"
    by (auto intro!: finite_cartesian_product vs1.finite_Basis vs2.finite_Basis simp: Basis_pair_def)
  show "p.independent Basis_pair"
    unfolding p.dependent_def Basis_pair_def
  proof safe
    fix a
    assume a: "a \<in> B1"
    assume "(a, 0) \<in> p.span (B1 \<times> {0} \<union> {0} \<times> B2 - {(a, 0)})"
    also have "B1 \<times> {0} \<union> {0} \<times> B2 - {(a, 0)} = (B1 - {a}) \<times> {0} \<union> {0} \<times> B2"
      by auto
    finally show False
      using a vs1.dependent_def vs1.independent_Basis
      by (auto simp: p.span_Un span_Times_sing1 span_Times_sing2)
  next
    fix b
    assume b: "b \<in> B2"
    assume "(0, b) \<in> p.span (B1 \<times> {0} \<union> {0} \<times> B2 - {(0, b)})"
    also have "(B1 \<times> {0} \<union> {0} \<times> B2 - {(0, b)}) = B1 \<times> {0} \<union> {0} \<times> (B2 - {b})"
      by auto
    finally show False
      using b vs2.dependent_def vs2.independent_Basis
      by (auto simp: p.span_Un span_Times_sing1 span_Times_sing2)
  qed
  show "p.span Basis_pair = UNIV"
    by (auto simp: p.span_Un span_Times_sing2 span_Times_sing1 vs1.span_Basis vs2.span_Basis
        Basis_pair_def)
qed

proposition dim_Times:
  assumes "vs1.subspace S" "vs2.subspace T"
  shows "p.dim(S \<times> T) = vs1.dim S + vs2.dim T"
proof -
  interpret p1: Vector_Spaces.linear s1 scale "(\<lambda>x. (x, 0))"
    by unfold_locales (auto simp: scale_def)
  interpret pair1: finite_dimensional_vector_space_pair "(*a)" B1 scale Basis_pair
    by unfold_locales
  interpret p2: Vector_Spaces.linear s2 scale "(\<lambda>x. (0, x))"
    by unfold_locales (auto simp: scale_def)
  interpret pair2: finite_dimensional_vector_space_pair "(*b)" B2 scale Basis_pair
    by unfold_locales
  have ss: "p.subspace ((\<lambda>x. (x, 0)) ` S)" "p.subspace (Pair 0 ` T)"
    by (rule p1.subspace_image p2.subspace_image assms)+
  have "p.dim(S \<times> T) = p.dim({u + v |u v. u \<in> (\<lambda>x. (x, 0)) ` S \<and> v \<in> Pair 0 ` T})"
    by (simp add: Times_eq_image_sum)
  moreover have "p.dim ((\<lambda>x. (x, 0::'c)) ` S) = vs1.dim S" "p.dim (Pair (0::'b) ` T) = vs2.dim T"
     by (simp_all add: inj_on_def p1.linear_axioms pair1.dim_image_eq p2.linear_axioms pair2.dim_image_eq)
  moreover have "p.dim ((\<lambda>x. (x, 0)) ` S \<inter> Pair 0 ` T) = 0"
    by (subst p.dim_eq_0) auto
  ultimately show ?thesis
    using p.dim_sums_Int [OF ss] by linarith
qed

lemma dimension_pair: "p.dimension = vs1.dimension + vs2.dimension"
  using dim_Times[OF vs1.subspace_UNIV vs2.subspace_UNIV]
  by (auto simp: p.dimension_def vs1.dimension_def vs2.dimension_def)

end

end