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rtree.el

rtree.el 8.2 KB
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  1. ;;; rtree.el --- functions for manipulating range trees
    2. 

  2. 

  3. ;; Copyright (C) 2010-2012 Free Software Foundation, Inc.
    4. 

  4. 

  5. ;; Author: Lars Magne Ingebrigtsen <larsi@gnus.org>
    6. 

  6. 

  7. ;; This file is part of GNU Emacs.
    8. 

  8. 

  9. ;; GNU Emacs is free software: you can redistribute it and/or modify
    10. 

  10. ;; it under the terms of the GNU General Public License as published by
    11. 

  11. ;; the Free Software Foundation, either version 3 of the License, or
    12. 

  12. ;; (at your option) any later version.
    13. 

  13. 

  14. ;; GNU Emacs is distributed in the hope that it will be useful,
    15. 

  15. ;; but WITHOUT ANY WARRANTY; without even the implied warranty of
    16. 

  16. ;; MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
    17. 

  17. ;; GNU General Public License for more details.
    18. 

  18. 

  19. ;; You should have received a copy of the GNU General Public License
    20. 

  20. ;; along with GNU Emacs.  If not, see <http://www.gnu.org/licenses/>.
    21. 

  21. 

  22. ;;; Commentary:
    23. 

  23. 

  24. ;; A "range tree" is a binary tree that stores ranges.  They are
    25. 

  25. ;; similar to interval trees, but do not allow overlapping intervals.
    26. 

  26. 

  27. ;; A range is an ordered list of number intervals, like this:
    28. 

  28. 

  29. ;; ((10 . 25) 56 78 (98 . 201))
    30. 

  30. 

  31. ;; Common operations, like lookup, deletion and insertion are O(n) in
    32. 

  32. ;; a range, but an rtree is O(log n) in all these operations.
    33. 

  33. ;; Transformation between a range and an rtree is O(n).
    34. 

  34. 

  35. ;; The rtrees are quite simple.  The structure of each node is
    36. 

  36. 

  37. ;; (cons (cons low high) (cons left right))
    38. 

  38. 

  39. ;; That is, they are three cons cells, where the car of the top cell
    40. 

  40. ;; is the actual range, and the cdr has the left and right child.  The
    41. 

  41. ;; rtrees aren't automatically balanced, but are balanced when
    42. 

  42. ;; created, and can be rebalanced when deemed necessary.
    43. 

  43. 

  44. ;;; Code:
    45. 

  45. 

  46. (eval-when-compile
    47. 

  47.   (require 'cl))
    48. 

  48. 

  49. (defmacro rtree-make-node ()
    50. 

  50.   `(list (list nil) nil))
    51. 

  51. 

  52. (defmacro rtree-set-left (node left)
    53. 

  53.   `(setcar (cdr ,node) ,left))
    54. 

  54. 

  55. (defmacro rtree-set-right (node right)
    56. 

  56.   `(setcdr (cdr ,node) ,right))
    57. 

  57. 

  58. (defmacro rtree-set-range (node range)
    59. 

  59.   `(setcar ,node ,range))
    60. 

  60. 

  61. (defmacro rtree-low (node)
    62. 

  62.   `(caar ,node))
    63. 

  63. 

  64. (defmacro rtree-high (node)
    65. 

  65.   `(cdar ,node))
    66. 

  66. 

  67. (defmacro rtree-set-low (node number)
    68. 

  68.   `(setcar (car ,node) ,number))
    69. 

  69. 

  70. (defmacro rtree-set-high (node number)
    71. 

  71.   `(setcdr (car ,node) ,number))
    72. 

  72. 

  73. (defmacro rtree-left (node)
    74. 

  74.   `(cadr ,node))
    75. 

  75. 

  76. (defmacro rtree-right (node)
    77. 

  77.   `(cddr ,node))
    78. 

  78. 

  79. (defmacro rtree-range (node)
    80. 

  80.   `(car ,node))
    81. 

  81. 

  82. (defsubst rtree-normalise-range (range)
    83. 

  83.   (when (numberp range)
    84. 

  84.     (setq range (cons range range)))
    85. 

  85.   range)
    86. 

  86. 

  87. (defun rtree-make (range)
    88. 

  88.   "Make an rtree from RANGE."
    89. 

  89.   ;; Normalize the range.
    90. 

  90.   (unless (listp (cdr-safe range))
    91. 

  91.     (setq range (list range)))
    92. 

  92.   (rtree-make-1 (cons nil range) (length range)))
    93. 

  93. 

  94. (defun rtree-make-1 (range length)
    95. 

  95.   (let ((mid (/ length 2))
    96. 

  96. 	(node (rtree-make-node)))
    97. 

  97.     (when (> mid 0)
    98. 

  98.       (rtree-set-left node (rtree-make-1 range mid)))
    99. 

  99.     (rtree-set-range node (rtree-normalise-range (cadr range)))
    100. 

  100.     (setcdr range (cddr range))
    101. 

  101.     (when (> (- length mid 1) 0)
    102. 

  102.       (rtree-set-right node (rtree-make-1 range (- length mid 1))))
    103. 

  103.     node))
    104. 

  104. 

  105. (defun rtree-memq (tree number)
    106. 

  106.   "Return non-nil if NUMBER is present in TREE."
    107. 

  107.   (while (and tree
    108. 

  108. 	      (not (and (>= number (rtree-low tree))
    109. 

  109. 			(<= number (rtree-high tree)))))
    110. 

  110.     (setq tree
    111. 

  111. 	  (if (< number (rtree-low tree))
    112. 

  112. 	      (rtree-left tree)
    113. 

  113. 	    (rtree-right tree))))
    114. 

  114.   tree)
    115. 

  115. 

  116. (defun rtree-add (tree number)
    117. 

  117.   "Add NUMBER to TREE."
    118. 

  118.   (while tree
    119. 

  119.     (cond
    120. 

  120.      ;; It's already present, so we don't have to do anything.
    121. 

  121.      ((and (>= number (rtree-low tree))
    122. 

  122. 	   (<= number (rtree-high tree)))
    123. 

  123.       (setq tree nil))
    124. 

  124.      ((< number (rtree-low tree))
    125. 

  125.       (cond
    126. 

  126.        ;; Extend the low range.
    127. 

  127.        ((= number (1- (rtree-low tree)))
    128. 

  128. 	(rtree-set-low tree number)
    129. 

  129. 	;; Check whether we need to merge this node with the child.
    130. 

  130. 	(when (and (rtree-left tree)
    131. 

  131. 		   (= (rtree-high (rtree-left tree)) (1- number)))
    132. 

  132. 	  ;; Extend the range to the low from the child.
    133. 

  133. 	  (rtree-set-low tree (rtree-low (rtree-left tree)))
    134. 

  134. 	  ;; The child can't have a right child, so just transplant the
    135. 

  135. 	  ;; child's left tree to our left tree.
    136. 

  136. 	  (rtree-set-left tree (rtree-left (rtree-left tree))))
    137. 

  137. 	(setq tree nil))
    138. 

  138.        ;; Descend further to the left.
    139. 

  139.        ((rtree-left tree)
    140. 

  140. 	(setq tree (rtree-left tree)))
    141. 

  141.        ;; Add a new node.
    142. 

  142.        (t
    143. 

  143. 	(let ((new-node (rtree-make-node)))
    144. 

  144. 	  (rtree-set-low new-node number)
    145. 

  145. 	  (rtree-set-high new-node number)
    146. 

  146. 	  (rtree-set-left tree new-node)
    147. 

  147. 	  (setq tree nil)))))
    148. 

  148.      (t
    149. 

  149.       (cond
    150. 

  150.        ;; Extend the high range.
    151. 

  151.        ((= number (1+ (rtree-high tree)))
    152. 

  152. 	(rtree-set-high tree number)
    153. 

  153. 	;; Check whether we need to merge this node with the child.
    154. 

  154. 	(when (and (rtree-right tree)
    155. 

  155. 		   (= (rtree-low (rtree-right tree)) (1+ number)))
    156. 

  156. 	  ;; Extend the range to the high from the child.
    157. 

  157. 	  (rtree-set-high tree (rtree-high (rtree-right tree)))
    158. 

  158. 	  ;; The child can't have a left child, so just transplant the
    159. 

  159. 	  ;; child's left right to our right tree.
    160. 

  160. 	  (rtree-set-right tree (rtree-right (rtree-right tree))))
    161. 

  161. 	(setq tree nil))
    162. 

  162.        ;; Descend further to the right.
    163. 

  163.        ((rtree-right tree)
    164. 

  164. 	(setq tree (rtree-right tree)))
    165. 

  165.        ;; Add a new node.
    166. 

  166.        (t
    167. 

  167. 	(let ((new-node (rtree-make-node)))
    168. 

  168. 	  (rtree-set-low new-node number)
    169. 

  169. 	  (rtree-set-high new-node number)
    170. 

  170. 	  (rtree-set-right tree new-node)
    171. 

  171. 	  (setq tree nil))))))))
    172. 

  172. 

  173. (defun rtree-delq (tree number)
    174. 

  174.   "Remove NUMBER from TREE destructively.  Returns the new tree."
    175. 

  175.   (let ((result tree)
    176. 

  176. 	prev)
    177. 

  177.     (while tree
    178. 

  178.       (cond
    179. 

  179.        ((< number (rtree-low tree))
    180. 

  180. 	(setq prev tree
    181. 

  181. 	      tree (rtree-left tree)))
    182. 

  182.        ((> number (rtree-high tree))
    183. 

  183. 	(setq prev tree
    184. 

  184. 	      tree (rtree-right tree)))
    185. 

  185.        ;; The number is in this node.
    186. 

  186.        (t
    187. 

  187. 	(cond
    188. 

  188. 	 ;; The only entry; delete the node.
    189. 

  189. 	 ((= (rtree-low tree) (rtree-high tree))
    190. 

  190. 	  (cond
    191. 

  191. 	   ;; Two children.  Replace with successor value.
    192. 

  192. 	   ((and (rtree-left tree) (rtree-right tree))
    193. 

  193. 	    (let ((parent tree)
    194. 

  194. 		  (successor (rtree-right tree)))
    195. 

  195. 	      (while (rtree-left successor)
    196. 

  196. 		(setq parent successor
    197. 

  197. 		      successor (rtree-left successor)))
    198. 

  198. 	      ;; We now have the leftmost child of our right child.
    199. 

  199. 	      (rtree-set-range tree (rtree-range successor))
    200. 

  200. 	      ;; Transplant the child (if any) to the parent.
    201. 

  201. 	      (rtree-set-left parent (rtree-right successor))))
    202. 

  202. 	   (t
    203. 

  203. 	    (let ((rest (or (rtree-left tree)
    204. 

  204. 			    (rtree-right tree))))
    205. 

  205. 	      ;; One or zero children.  Remove the node.
    206. 

  206. 	      (cond
    207. 

  207. 	       ((null prev)
    208. 

  208. 		(setq result rest))
    209. 

  209. 	       ((eq (rtree-left prev) tree)
    210. 

  210. 		(rtree-set-left prev rest))
    211. 

  211. 	       (t
    212. 

  212. 		(rtree-set-right prev rest)))))))
    213. 

  213. 	 ;; The lowest in the range; just adjust.
    214. 

  214. 	 ((= number (rtree-low tree))
    215. 

  215. 	  (rtree-set-low tree (1+ number)))
    216. 

  216. 	 ;; The highest in the range; just adjust.
    217. 

  217. 	 ((= number (rtree-high tree))
    218. 

  218. 	  (rtree-set-high tree (1- number)))
    219. 

  219. 	 ;; We have to split this range.
    220. 

  220. 	 (t
    221. 

  221. 	  (let ((new-node (rtree-make-node)))
    222. 

  222. 	    (rtree-set-low new-node (rtree-low tree))
    223. 

  223. 	    (rtree-set-high new-node (1- number))
    224. 

  224. 	    (rtree-set-low tree (1+ number))
    225. 

  225. 	    (cond
    226. 

  226. 	     ;; Two children; insert the new node as the predecessor
    227. 

  227. 	     ;; node.
    228. 

  228. 	     ((and (rtree-left tree) (rtree-right tree))
    229. 

  229. 	      (let ((predecessor (rtree-left tree)))
    230. 

  230. 		(while (rtree-right predecessor)
    231. 

  231. 		  (setq predecessor (rtree-right predecessor)))
    232. 

  232. 		(rtree-set-right predecessor new-node)))
    233. 

  233. 	     ((rtree-left tree)
    234. 

  234. 	      (rtree-set-right new-node tree)
    235. 

  235. 	      (rtree-set-left new-node (rtree-left tree))
    236. 

  236. 	      (rtree-set-left tree nil)
    237. 

  237. 	      (cond
    238. 

  238. 	       ((null prev)
    239. 

  239. 		(setq result new-node))
    240. 

  240. 	       ((eq (rtree-left prev) tree)
    241. 

  241. 		(rtree-set-left prev new-node))
    242. 

  242. 	       (t
    243. 

  243. 		(rtree-set-right prev new-node))))
    244. 

  244. 	     (t
    245. 

  245. 	      (rtree-set-left tree new-node))))))
    246. 

  246. 	(setq tree nil))))
    247. 

  247.     result))
    248. 

  248. 

  249. (defun rtree-extract (tree)
    250. 

  250.   "Convert TREE to range form."
    251. 

  251.   (let (stack result)
    252. 

  252.     (while (or stack
    253. 

  253. 	       tree)
    254. 

  254.       (if tree
    255. 

  255. 	  (progn
    256. 

  256. 	    (push tree stack)
    257. 

  257. 	    (setq tree (rtree-right tree)))
    258. 

  258. 	(setq tree (pop stack))
    259. 

  259. 	(push (if (= (rtree-low tree)
    260. 

  260. 		     (rtree-high tree))
    261. 

  261. 		  (rtree-low tree)
    262. 

  262. 		(rtree-range tree))
    263. 

  263. 	      result)
    264. 

  264. 	(setq tree (rtree-left tree))))
    265. 

  265.     result))
    266. 

  266. 

  267. (defun rtree-length (tree)
    268. 

  268.   "Return the number of numbers stored in TREE."
    269. 

  269.   (if (null tree)
    270. 

  270.       0
    271. 

  271.     (+ (rtree-length (rtree-left tree))
    272. 

  272.        (1+ (- (rtree-high tree)
    273. 

  273. 	      (rtree-low tree)))
    274. 

  274.        (rtree-length (rtree-right tree)))))
    275. 

  275. 

  276. (provide 'rtree)
    277. 

  277. 

  278. ;;; rtree.el ends here
    279. 

  279.