theory BTree_Height imports BTree begin section "Maximum and minimum height" text "Textbooks usually provide some proofs relating the maxmimum and minimum height of the BTree for a given number of nodes. We therefore introduce this counting and show the respective proofs." subsection "Definition of node/size" thm BTree.btree.size (* the automatically derived size is a bit weird for our purposes *) value "size (Node [(Leaf, (0::nat)), (Node [(Leaf, 1), (Leaf, 10)] Leaf, 12), (Leaf, 30), (Leaf, 100)] Leaf)" text "The default size function does not suit our needs as it regards the length of the list in each node. We would like to count the number of nodes in the tree only, not regarding the number of keys." (* we want a different counting method, namely only the number of nodes in a tree *) (* TODO what if we count Leafs as nodes? *) fun nodes::"'a btree \ nat" where "nodes Leaf = 0" | "nodes (Node ts t) = 1 + (\t\subtrees ts. nodes t) + (nodes t)" value "nodes (Node [(Leaf, (0::nat)), (Node [(Leaf, 1), (Leaf, 10)] Leaf, 12), (Leaf, 30), (Leaf, 100)] Leaf)" (* maximum number of nodes for given height *) subsection "Maximum number of nodes for a given height" lemma sum_list_replicate: "sum_list (replicate n c) = n*c" apply(induction n) apply(auto simp add: ring_class.ring_distribs(2)) done abbreviation "bound k h \ ((k+1)^h - 1)" lemma nodes_height_upper_bound: "\order k t; bal t\ \ nodes t * (2*k) \ bound (2*k) (height t)" proof(induction t rule: nodes.induct) case (2 ts t) let ?sub_height = "((2 * k + 1) ^ height t - 1)" have "sum_list (map nodes (subtrees ts)) * (2*k) = sum_list (map (\t. nodes t * (2 * k)) (subtrees ts))" using sum_list_mult_const by metis also have "\ \ sum_list (map (\x.?sub_height) (subtrees ts))" using 2 using sum_list_mono[of "subtrees ts" "\t. nodes t * (2 * k)" "\x. bound (2 * k) (height t)"] by (metis bal.simps(2) order.simps(2)) also have "\ = sum_list (replicate (length ts) ?sub_height)" using map_replicate_const[of ?sub_height "subtrees ts"] length_map by simp also have "\ = (length ts)*(?sub_height)" using sum_list_replicate by simp also have "\ \ (2*k)*(?sub_height)" using "2.prems"(1) by simp finally have "sum_list (map nodes (subtrees ts))*(2*k) \ ?sub_height*(2*k)" by simp moreover have "(nodes t)*(2*k) \ ?sub_height" using 2 by simp ultimately have "(nodes (Node ts t))*(2*k) \ 2*k + ?sub_height * (2*k) + ?sub_height" unfolding nodes.simps add_mult_distrib by linarith also have "\ = 2*k + (2*k)*((2 * k + 1) ^ height t) - 2*k + (2 * k + 1) ^ height t - 1" by (simp add: diff_mult_distrib2 mult.assoc mult.commute) also have "\ = (2*k)*((2 * k + 1) ^ height t) + (2 * k + 1) ^ height t - 1" by simp also have "\ = (2*k+1)^(Suc(height t)) - 1" by simp finally show ?case by (metis "2.prems"(2) height_bal_tree) qed simp text "To verify our lower bound is sharp, we compare it to the height of artificially constructed full trees." fun full_node::"nat \ 'a \ nat \ 'a btree" where "full_node k c 0 = Leaf"| "full_node k c (Suc n) = (Node (replicate (2*k) ((full_node k c n),c)) (full_node k c n))" value "let k = (2::nat) in map (\x. nodes x * 2*k) (map (full_node k (1::nat)) [0,1,2,3,4])" value "let k = (2::nat) in map (\x. ((2*k+(1::nat))^(x)-1)) [0,1,2,3,4]" lemma compow_comp_id: "c > 0 \ f \ f = f \ (f ^^ c) = f" apply(induction c) apply auto by fastforce (* required only for the fold definition of height *) lemma compow_id_point: "f x = x \ (f ^^ c) x = x" apply(induction c) apply auto done lemma height_full_node: "height (full_node k a h) = h" apply(induction k a h rule: full_node.induct) apply (auto simp add: set_replicate_conv_if) done lemma bal_full_node: "bal (full_node k a h)" apply(induction k a h rule: full_node.induct) apply auto done lemma order_full_node: "order k (full_node k a h)" apply(induction k a h rule: full_node.induct) apply auto done lemma full_btrees_sharp: "nodes (full_node k a h) * (2*k) = bound (2*k) h" apply(induction k a h rule: full_node.induct) apply (auto simp add: height_full_node algebra_simps sum_list_replicate) done lemma upper_bound_sharp_node: "t = full_node k a h \ height t = h \ order k t \ bal t \ bound (2*k) h = nodes t * (2*k)" by (simp add: bal_full_node height_full_node order_full_node full_btrees_sharp) (* maximum number of nodes *) subsection "Maximum height for a given number of nodes" lemma nodes_height_lower_bound: "\order k t; bal t\ \ bound k (height t) \ nodes t * k" proof(induction t rule: nodes.induct) case (2 ts t) let ?sub_height = "((k + 1) ^ height t - 1)" have "k*(?sub_height) \ (length ts)*(?sub_height)" using "2.prems"(1) by simp also have "\ = sum_list (replicate (length ts) ?sub_height)" using sum_list_replicate by simp also have "\ = sum_list (map (\x.?sub_height) (subtrees ts))" using map_replicate_const[of ?sub_height "subtrees ts"] length_map by simp also have "\ \ sum_list (map (\t. nodes t * k) (subtrees ts))" using 2 using sum_list_mono[of "subtrees ts" "\x. bound k (height t)" "\t. nodes t * k"] by (metis bal.simps(2) order.simps(2)) also have "\ = sum_list (map nodes (subtrees ts)) * k" using sum_list_mult_const[of nodes k "subtrees ts"] by auto finally have "sum_list (map nodes (subtrees ts))*k \ ?sub_height*k" by simp moreover have "(nodes t)*k \ ?sub_height" using 2 by simp ultimately have "(nodes (Node ts t))*k \ k + ?sub_height * k + ?sub_height" unfolding nodes.simps add_mult_distrib by linarith also have "k + ?sub_height * k + ?sub_height = k + k*((k + 1) ^ height t) - k + (k + 1) ^ height t - 1" by (simp add: diff_mult_distrib2 mult.assoc mult.commute) also have "\ = k*((k + 1) ^ height t) + (k + 1) ^ height t - 1" by simp also have "\ = (k+1)^(Suc(height t)) - 1" by simp finally show ?case by (metis "2.prems"(2) height_bal_tree) qed simp text "To verify our upper bound is sharp, we compare it to the height of artificially constructed minimally filled (=slim) trees." fun slim_node::"nat \ 'a \ nat \ 'a btree" where "slim_node k c 0 = Leaf"| "slim_node k c (Suc n) = (Node (replicate k ((slim_node k c n),c)) (slim_node k c n))" value "let k = (2::nat) in map (\x. nodes x * k) (map (slim_node k (1::nat)) [0,1,2,3,4])" value "let k = (2::nat) in map (\x. ((k+1::nat)^(x)-1)) [0,1,2,3,4]" lemma height_slim_node: "height (slim_node k a h) = h" apply(induction k a h rule: full_node.induct) apply (auto simp add: set_replicate_conv_if) done lemma bal_slim_node: "bal (slim_node k a h)" apply(induction k a h rule: full_node.induct) apply auto done lemma order_slim_node: "order k (slim_node k a h)" apply(induction k a h rule: full_node.induct) apply auto done lemma slim_nodes_sharp: "nodes (slim_node k a h) * k = bound k h" apply(induction k a h rule: slim_node.induct) apply (auto simp add: height_slim_node algebra_simps sum_list_replicate compow_id_point) done lemma lower_bound_sharp_node: "t = slim_node k a h \ height t = h \ order k t \ bal t \ bound k h = nodes t * k" by (simp add: bal_slim_node height_slim_node order_slim_node slim_nodes_sharp) (* TODO results for root_order/bal *) text "Since BTrees have special roots, we need to show the overall nodes seperately" lemma nodes_root_height_lower_bound: assumes "root_order k t" and "bal t" shows "2*((k+1)^(height t - 1) - 1) + (of_bool (t \ Leaf))*k \ nodes t * k" proof (cases t) case (Node ts t) let ?sub_height = "((k + 1) ^ height t - 1)" from Node have "?sub_height \ length ts * ?sub_height" using assms by (simp add: Suc_leI) also have "\ = sum_list (replicate (length ts) ?sub_height)" using sum_list_replicate by simp also have "\ = sum_list (map (\x. ?sub_height) (subtrees ts))" using map_replicate_const[of ?sub_height "subtrees ts"] length_map by simp also have "\ \ sum_list (map (\t. nodes t * k) (subtrees ts))" using Node sum_list_mono[of "subtrees ts" "\x. (k+1)^(height t) - 1" "\x. nodes x * k"] nodes_height_lower_bound assms by fastforce also have "\ = sum_list (map nodes (subtrees ts)) * k" using sum_list_mult_const[of nodes k "subtrees ts"] by simp finally have "sum_list (map nodes (subtrees ts))*k \ ?sub_height" by simp moreover have "(nodes t)*k \ ?sub_height" using Node assms nodes_height_lower_bound by auto ultimately have "(nodes (Node ts t))*k \ ?sub_height + ?sub_height + k" unfolding nodes.simps add_mult_distrib by linarith then show ?thesis using Node assms(2) height_bal_tree by fastforce qed simp lemma nodes_root_height_upper_bound: assumes "root_order k t" and "bal t" shows "nodes t * (2*k) \ (2*k+1)^(height t) - 1" proof(cases t) case (Node ts t) let ?sub_height = "((2 * k + 1) ^ height t - 1)" have "sum_list (map nodes (subtrees ts)) * (2*k) = sum_list (map (\t. nodes t * (2 * k)) (subtrees ts))" using sum_list_mult_const by metis also have "\ \ sum_list (map (\x.?sub_height) (subtrees ts))" using Node sum_list_mono[of "subtrees ts" "\x. nodes x * (2*k)" "\x. (2*k+1)^(height t) - 1"] nodes_height_upper_bound assms by fastforce also have "\ = sum_list (replicate (length ts) ?sub_height)" using map_replicate_const[of ?sub_height "subtrees ts"] length_map by simp also have "\ = (length ts)*(?sub_height)" using sum_list_replicate by simp also have "\ \ (2*k)*?sub_height" using assms Node by simp finally have "sum_list (map nodes (subtrees ts))*(2*k) \ ?sub_height*(2*k)" by simp moreover have "(nodes t)*(2*k) \ ?sub_height" using Node assms nodes_height_upper_bound by auto ultimately have "(nodes (Node ts t))*(2*k) \ 2*k + ?sub_height * (2*k) + ?sub_height" unfolding nodes.simps add_mult_distrib by linarith also have "\ = 2*k + (2*k)*((2 * k + 1) ^ height t) - 2*k + (2 * k + 1) ^ height t - 1" by (simp add: diff_mult_distrib2 mult.assoc mult.commute) also have "\ = (2*k)*((2 * k + 1) ^ height t) + (2 * k + 1) ^ height t - 1" by simp also have "\ = (2*k+1)^(Suc(height t)) - 1" by simp finally show ?thesis by (metis Node assms(2) height_bal_tree) qed simp lemma root_order_imp_divmuleq: "root_order k t \ (nodes t * k) div k = nodes t" using root_order.elims(2) by fastforce lemma nodes_root_height_lower_bound_simp: assumes "root_order k t" and "bal t" and "k > 0" shows "(2*((k+1)^(height t - 1) - 1)) div k + (of_bool (t \ Leaf)) \ nodes t" proof (cases t) case Node have "(2*((k+1)^(height t - 1) - 1)) div k + (of_bool (t \ Leaf)) = (2*((k+1)^(height t - 1) - 1) + (of_bool (t \ Leaf))*k) div k" using Node assms using div_plus_div_distrib_dvd_left[of k k "(2 * Suc k ^ (height t - Suc 0) - Suc (Suc 0))"] by (auto simp add: algebra_simps simp del: height_btree.simps) also have "\ \ (nodes t * k) div k" using nodes_root_height_lower_bound[OF assms(1,2)] div_le_mono by blast also have "\ = nodes t" using root_order_imp_divmuleq[OF assms(1)] by simp finally show ?thesis . qed simp lemma nodes_root_height_upper_bound_simp: assumes "root_order k t" and "bal t" shows "nodes t \ ((2*k+1)^(height t) - 1) div (2*k)" proof - have "nodes t = (nodes t * (2*k)) div (2*k)" using root_order_imp_divmuleq[OF assms(1)] by simp also have "\ \ ((2*k+1)^(height t) - 1) div (2*k)" using div_le_mono nodes_root_height_upper_bound[OF assms] by blast finally show ?thesis . qed definition "full_tree = full_node" fun slim_tree where "slim_tree k c 0 = Leaf" | "slim_tree k c (Suc h) = Node [(slim_node k c h, c)] (slim_node k c h)" lemma lower_bound_sharp: "k > 0 \ t = slim_tree k a h \ height t = h \ root_order k t \ bal t \ nodes t * k = 2*((k+1)^(height t - 1) - 1) + (of_bool (t \ Leaf))*k" apply (cases h) using slim_nodes_sharp[of k a] apply (auto simp add: algebra_simps bal_slim_node height_slim_node order_slim_node) done lemma upper_bound_sharp: "k > 0 \ t = full_tree k a h \ height t = h \ root_order k t \ bal t \ ((2*k+1)^(height t) - 1) = nodes t * (2*k)" unfolding full_tree_def using order_impl_root_order[of k t] by (simp add: bal_full_node height_full_node order_full_node full_btrees_sharp) end