1 /* 2 * CDDL HEADER START 3 * 4 * The contents of this file are subject to the terms of the 5 * Common Development and Distribution License (the "License"). 6 * You may not use this file except in compliance with the License. 7 * 8 * You can obtain a copy of the license at usr/src/OPENSOLARIS.LICENSE 9 * or http://www.opensolaris.org/os/licensing. 10 * See the License for the specific language governing permissions 11 * and limitations under the License. 12 * 13 * When distributing Covered Code, include this CDDL HEADER in each 14 * file and include the License file at usr/src/OPENSOLARIS.LICENSE. 15 * If applicable, add the following below this CDDL HEADER, with the 16 * fields enclosed by brackets "[]" replaced with your own identifying 17 * information: Portions Copyright [yyyy] [name of copyright owner] 18 * 19 * CDDL HEADER END 20 */ 21 /* 22 * Copyright 2009 Sun Microsystems, Inc. All rights reserved. 23 * Use is subject to license terms. 24 */ 25 26 /* 27 * Copyright 2015 Nexenta Systems, Inc. All rights reserved. 28 * Copyright (c) 2015 by Delphix. All rights reserved. 29 */ 30 31 /* 32 * AVL - generic AVL tree implementation for kernel use 33 * 34 * A complete description of AVL trees can be found in many CS textbooks. 35 * 36 * Here is a very brief overview. An AVL tree is a binary search tree that is 37 * almost perfectly balanced. By "almost" perfectly balanced, we mean that at 38 * any given node, the left and right subtrees are allowed to differ in height 39 * by at most 1 level. 40 * 41 * This relaxation from a perfectly balanced binary tree allows doing 42 * insertion and deletion relatively efficiently. Searching the tree is 43 * still a fast operation, roughly O(log(N)). 44 * 45 * The key to insertion and deletion is a set of tree manipulations called 46 * rotations, which bring unbalanced subtrees back into the semi-balanced state. 47 * 48 * This implementation of AVL trees has the following peculiarities: 49 * 50 * - The AVL specific data structures are physically embedded as fields 51 * in the "using" data structures. To maintain generality the code 52 * must constantly translate between "avl_node_t *" and containing 53 * data structure "void *"s by adding/subtracting the avl_offset. 54 * 55 * - Since the AVL data is always embedded in other structures, there is 56 * no locking or memory allocation in the AVL routines. This must be 57 * provided for by the enclosing data structure's semantics. Typically, 58 * avl_insert()/_add()/_remove()/avl_insert_here() require some kind of 59 * exclusive write lock. Other operations require a read lock. 60 * 61 * - The implementation uses iteration instead of explicit recursion, 62 * since it is intended to run on limited size kernel stacks. Since 63 * there is no recursion stack present to move "up" in the tree, 64 * there is an explicit "parent" link in the avl_node_t. 65 * 66 * - The left/right children pointers of a node are in an array. 67 * In the code, variables (instead of constants) are used to represent 68 * left and right indices. The implementation is written as if it only 69 * dealt with left handed manipulations. By changing the value assigned 70 * to "left", the code also works for right handed trees. The 71 * following variables/terms are frequently used: 72 * 73 * int left; // 0 when dealing with left children, 74 * // 1 for dealing with right children 75 * 76 * int left_heavy; // -1 when left subtree is taller at some node, 77 * // +1 when right subtree is taller 78 * 79 * int right; // will be the opposite of left (0 or 1) 80 * int right_heavy;// will be the opposite of left_heavy (-1 or 1) 81 * 82 * int direction; // 0 for "<" (ie. left child); 1 for ">" (right) 83 * 84 * Though it is a little more confusing to read the code, the approach 85 * allows using half as much code (and hence cache footprint) for tree 86 * manipulations and eliminates many conditional branches. 87 * 88 * - The avl_index_t is an opaque "cookie" used to find nodes at or 89 * adjacent to where a new value would be inserted in the tree. The value 90 * is a modified "avl_node_t *". The bottom bit (normally 0 for a 91 * pointer) is set to indicate if that the new node has a value greater 92 * than the value of the indicated "avl_node_t *". 93 * 94 * Note - in addition to userland (e.g. libavl and libutil) and the kernel 95 * (e.g. genunix), avl.c is compiled into ld.so and kmdb's genunix module, 96 * which each have their own compilation environments and subsequent 97 * requirements. Each of these environments must be considered when adding 98 * dependencies from avl.c. 99 * 100 * Link to Illumos.org for more information on avl function: 101 * [1] https://illumos.org/man/9f/avl 102 */ 103 104 #include <sys/types.h> 105 #include <sys/param.h> 106 #include <sys/debug.h> 107 #include <sys/avl.h> 108 #include <sys/cmn_err.h> 109 #include <sys/mod.h> 110 111 /* 112 * Walk from one node to the previous valued node (ie. an infix walk 113 * towards the left). At any given node we do one of 2 things: 114 * 115 * - If there is a left child, go to it, then to it's rightmost descendant. 116 * 117 * - otherwise we return through parent nodes until we've come from a right 118 * child. 119 * 120 * Return Value: 121 * NULL - if at the end of the nodes 122 * otherwise next node 123 */ 124 void * 125 avl_walk(avl_tree_t *tree, void *oldnode, int left) 126 { 127 size_t off = tree->avl_offset; 128 avl_node_t *node = AVL_DATA2NODE(oldnode, off); 129 int right = 1 - left; 130 int was_child; 131 132 133 /* 134 * nowhere to walk to if tree is empty 135 */ 136 if (node == NULL) 137 return (NULL); 138 139 /* 140 * Visit the previous valued node. There are two possibilities: 141 * 142 * If this node has a left child, go down one left, then all 143 * the way right. 144 */ 145 if (node->avl_child[left] != NULL) { 146 for (node = node->avl_child[left]; 147 node->avl_child[right] != NULL; 148 node = node->avl_child[right]) 149 ; 150 /* 151 * Otherwise, return through left children as far as we can. 152 */ 153 } else { 154 for (;;) { 155 was_child = AVL_XCHILD(node); 156 node = AVL_XPARENT(node); 157 if (node == NULL) 158 return (NULL); 159 if (was_child == right) 160 break; 161 } 162 } 163 164 return (AVL_NODE2DATA(node, off)); 165 } 166 167 /* 168 * Return the lowest valued node in a tree or NULL. 169 * (leftmost child from root of tree) 170 */ 171 void * 172 avl_first(avl_tree_t *tree) 173 { 174 avl_node_t *node; 175 avl_node_t *prev = NULL; 176 size_t off = tree->avl_offset; 177 178 for (node = tree->avl_root; node != NULL; node = node->avl_child[0]) 179 prev = node; 180 181 if (prev != NULL) 182 return (AVL_NODE2DATA(prev, off)); 183 return (NULL); 184 } 185 186 /* 187 * Return the highest valued node in a tree or NULL. 188 * (rightmost child from root of tree) 189 */ 190 void * 191 avl_last(avl_tree_t *tree) 192 { 193 avl_node_t *node; 194 avl_node_t *prev = NULL; 195 size_t off = tree->avl_offset; 196 197 for (node = tree->avl_root; node != NULL; node = node->avl_child[1]) 198 prev = node; 199 200 if (prev != NULL) 201 return (AVL_NODE2DATA(prev, off)); 202 return (NULL); 203 } 204 205 /* 206 * Access the node immediately before or after an insertion point. 207 * 208 * "avl_index_t" is a (avl_node_t *) with the bottom bit indicating a child 209 * 210 * Return value: 211 * NULL: no node in the given direction 212 * "void *" of the found tree node 213 */ 214 void * 215 avl_nearest(avl_tree_t *tree, avl_index_t where, int direction) 216 { 217 int child = AVL_INDEX2CHILD(where); 218 avl_node_t *node = AVL_INDEX2NODE(where); 219 void *data; 220 size_t off = tree->avl_offset; 221 222 if (node == NULL) { 223 ASSERT(tree->avl_root == NULL); 224 return (NULL); 225 } 226 data = AVL_NODE2DATA(node, off); 227 if (child != direction) 228 return (data); 229 230 return (avl_walk(tree, data, direction)); 231 } 232 233 234 /* 235 * Search for the node which contains "value". The algorithm is a 236 * simple binary tree search. 237 * 238 * return value: 239 * NULL: the value is not in the AVL tree 240 * *where (if not NULL) is set to indicate the insertion point 241 * "void *" of the found tree node 242 */ 243 void * 244 avl_find(avl_tree_t *tree, const void *value, avl_index_t *where) 245 { 246 avl_node_t *node; 247 avl_node_t *prev = NULL; 248 int child = 0; 249 int diff; 250 size_t off = tree->avl_offset; 251 252 for (node = tree->avl_root; node != NULL; 253 node = node->avl_child[child]) { 254 255 prev = node; 256 257 diff = tree->avl_compar(value, AVL_NODE2DATA(node, off)); 258 ASSERT(-1 <= diff && diff <= 1); 259 if (diff == 0) { 260 #ifdef ZFS_DEBUG 261 if (where != NULL) 262 *where = 0; 263 #endif 264 return (AVL_NODE2DATA(node, off)); 265 } 266 child = (diff > 0); 267 } 268 269 if (where != NULL) 270 *where = AVL_MKINDEX(prev, child); 271 272 return (NULL); 273 } 274 275 276 /* 277 * Perform a rotation to restore balance at the subtree given by depth. 278 * 279 * This routine is used by both insertion and deletion. The return value 280 * indicates: 281 * 0 : subtree did not change height 282 * !0 : subtree was reduced in height 283 * 284 * The code is written as if handling left rotations, right rotations are 285 * symmetric and handled by swapping values of variables right/left[_heavy] 286 * 287 * On input balance is the "new" balance at "node". This value is either 288 * -2 or +2. 289 */ 290 static int 291 avl_rotation(avl_tree_t *tree, avl_node_t *node, int balance) 292 { 293 int left = !(balance < 0); /* when balance = -2, left will be 0 */ 294 int right = 1 - left; 295 int left_heavy = balance >> 1; 296 int right_heavy = -left_heavy; 297 avl_node_t *parent = AVL_XPARENT(node); 298 avl_node_t *child = node->avl_child[left]; 299 avl_node_t *cright; 300 avl_node_t *gchild; 301 avl_node_t *gright; 302 avl_node_t *gleft; 303 int which_child = AVL_XCHILD(node); 304 int child_bal = AVL_XBALANCE(child); 305 306 /* 307 * case 1 : node is overly left heavy, the left child is balanced or 308 * also left heavy. This requires the following rotation. 309 * 310 * (node bal:-2) 311 * / \ 312 * / \ 313 * (child bal:0 or -1) 314 * / \ 315 * / \ 316 * cright 317 * 318 * becomes: 319 * 320 * (child bal:1 or 0) 321 * / \ 322 * / \ 323 * (node bal:-1 or 0) 324 * / \ 325 * / \ 326 * cright 327 * 328 * we detect this situation by noting that child's balance is not 329 * right_heavy. 330 */ 331 if (child_bal != right_heavy) { 332 333 /* 334 * compute new balance of nodes 335 * 336 * If child used to be left heavy (now balanced) we reduced 337 * the height of this sub-tree -- used in "return...;" below 338 */ 339 child_bal += right_heavy; /* adjust towards right */ 340 341 /* 342 * move "cright" to be node's left child 343 */ 344 cright = child->avl_child[right]; 345 node->avl_child[left] = cright; 346 if (cright != NULL) { 347 AVL_SETPARENT(cright, node); 348 AVL_SETCHILD(cright, left); 349 } 350 351 /* 352 * move node to be child's right child 353 */ 354 child->avl_child[right] = node; 355 AVL_SETBALANCE(node, -child_bal); 356 AVL_SETCHILD(node, right); 357 AVL_SETPARENT(node, child); 358 359 /* 360 * update the pointer into this subtree 361 */ 362 AVL_SETBALANCE(child, child_bal); 363 AVL_SETCHILD(child, which_child); 364 AVL_SETPARENT(child, parent); 365 if (parent != NULL) 366 parent->avl_child[which_child] = child; 367 else 368 tree->avl_root = child; 369 370 return (child_bal == 0); 371 } 372 373 /* 374 * case 2 : When node is left heavy, but child is right heavy we use 375 * a different rotation. 376 * 377 * (node b:-2) 378 * / \ 379 * / \ 380 * / \ 381 * (child b:+1) 382 * / \ 383 * / \ 384 * (gchild b: != 0) 385 * / \ 386 * / \ 387 * gleft gright 388 * 389 * becomes: 390 * 391 * (gchild b:0) 392 * / \ 393 * / \ 394 * / \ 395 * (child b:?) (node b:?) 396 * / \ / \ 397 * / \ / \ 398 * gleft gright 399 * 400 * computing the new balances is more complicated. As an example: 401 * if gchild was right_heavy, then child is now left heavy 402 * else it is balanced 403 */ 404 gchild = child->avl_child[right]; 405 gleft = gchild->avl_child[left]; 406 gright = gchild->avl_child[right]; 407 408 /* 409 * move gright to left child of node and 410 * 411 * move gleft to right child of node 412 */ 413 node->avl_child[left] = gright; 414 if (gright != NULL) { 415 AVL_SETPARENT(gright, node); 416 AVL_SETCHILD(gright, left); 417 } 418 419 child->avl_child[right] = gleft; 420 if (gleft != NULL) { 421 AVL_SETPARENT(gleft, child); 422 AVL_SETCHILD(gleft, right); 423 } 424 425 /* 426 * move child to left child of gchild and 427 * 428 * move node to right child of gchild and 429 * 430 * fixup parent of all this to point to gchild 431 */ 432 balance = AVL_XBALANCE(gchild); 433 gchild->avl_child[left] = child; 434 AVL_SETBALANCE(child, (balance == right_heavy ? left_heavy : 0)); 435 AVL_SETPARENT(child, gchild); 436 AVL_SETCHILD(child, left); 437 438 gchild->avl_child[right] = node; 439 AVL_SETBALANCE(node, (balance == left_heavy ? right_heavy : 0)); 440 AVL_SETPARENT(node, gchild); 441 AVL_SETCHILD(node, right); 442 443 AVL_SETBALANCE(gchild, 0); 444 AVL_SETPARENT(gchild, parent); 445 AVL_SETCHILD(gchild, which_child); 446 if (parent != NULL) 447 parent->avl_child[which_child] = gchild; 448 else 449 tree->avl_root = gchild; 450 451 return (1); /* the new tree is always shorter */ 452 } 453 454 455 /* 456 * Insert a new node into an AVL tree at the specified (from avl_find()) place. 457 * 458 * Newly inserted nodes are always leaf nodes in the tree, since avl_find() 459 * searches out to the leaf positions. The avl_index_t indicates the node 460 * which will be the parent of the new node. 461 * 462 * After the node is inserted, a single rotation further up the tree may 463 * be necessary to maintain an acceptable AVL balance. 464 */ 465 void 466 avl_insert(avl_tree_t *tree, void *new_data, avl_index_t where) 467 { 468 avl_node_t *node; 469 avl_node_t *parent = AVL_INDEX2NODE(where); 470 int old_balance; 471 int new_balance; 472 int which_child = AVL_INDEX2CHILD(where); 473 size_t off = tree->avl_offset; 474 475 #ifdef _LP64 476 ASSERT(((uintptr_t)new_data & 0x7) == 0); 477 #endif 478 479 node = AVL_DATA2NODE(new_data, off); 480 481 /* 482 * First, add the node to the tree at the indicated position. 483 */ 484 ++tree->avl_numnodes; 485 486 node->avl_child[0] = NULL; 487 node->avl_child[1] = NULL; 488 489 AVL_SETCHILD(node, which_child); 490 AVL_SETBALANCE(node, 0); 491 AVL_SETPARENT(node, parent); 492 if (parent != NULL) { 493 ASSERT(parent->avl_child[which_child] == NULL); 494 parent->avl_child[which_child] = node; 495 } else { 496 ASSERT(tree->avl_root == NULL); 497 tree->avl_root = node; 498 } 499 /* 500 * Now, back up the tree modifying the balance of all nodes above the 501 * insertion point. If we get to a highly unbalanced ancestor, we 502 * need to do a rotation. If we back out of the tree we are done. 503 * If we brought any subtree into perfect balance (0), we are also done. 504 */ 505 for (;;) { 506 node = parent; 507 if (node == NULL) 508 return; 509 510 /* 511 * Compute the new balance 512 */ 513 old_balance = AVL_XBALANCE(node); 514 new_balance = old_balance + (which_child ? 1 : -1); 515 516 /* 517 * If we introduced equal balance, then we are done immediately 518 */ 519 if (new_balance == 0) { 520 AVL_SETBALANCE(node, 0); 521 return; 522 } 523 524 /* 525 * If both old and new are not zero we went 526 * from -1 to -2 balance, do a rotation. 527 */ 528 if (old_balance != 0) 529 break; 530 531 AVL_SETBALANCE(node, new_balance); 532 parent = AVL_XPARENT(node); 533 which_child = AVL_XCHILD(node); 534 } 535 536 /* 537 * perform a rotation to fix the tree and return 538 */ 539 (void) avl_rotation(tree, node, new_balance); 540 } 541 542 /* 543 * Insert "new_data" in "tree" in the given "direction" either after or 544 * before (AVL_AFTER, AVL_BEFORE) the data "here". 545 * 546 * Insertions can only be done at empty leaf points in the tree, therefore 547 * if the given child of the node is already present we move to either 548 * the AVL_PREV or AVL_NEXT and reverse the insertion direction. Since 549 * every other node in the tree is a leaf, this always works. 550 * 551 * To help developers using this interface, we assert that the new node 552 * is correctly ordered at every step of the way in DEBUG kernels. 553 */ 554 void 555 avl_insert_here( 556 avl_tree_t *tree, 557 void *new_data, 558 void *here, 559 int direction) 560 { 561 avl_node_t *node; 562 int child = direction; /* rely on AVL_BEFORE == 0, AVL_AFTER == 1 */ 563 #ifdef ZFS_DEBUG 564 int diff; 565 #endif 566 567 ASSERT(tree != NULL); 568 ASSERT(new_data != NULL); 569 ASSERT(here != NULL); 570 ASSERT(direction == AVL_BEFORE || direction == AVL_AFTER); 571 572 /* 573 * If corresponding child of node is not NULL, go to the neighboring 574 * node and reverse the insertion direction. 575 */ 576 node = AVL_DATA2NODE(here, tree->avl_offset); 577 578 #ifdef ZFS_DEBUG 579 diff = tree->avl_compar(new_data, here); 580 ASSERT(-1 <= diff && diff <= 1); 581 ASSERT(diff != 0); 582 ASSERT(diff > 0 ? child == 1 : child == 0); 583 #endif 584 585 if (node->avl_child[child] != NULL) { 586 node = node->avl_child[child]; 587 child = 1 - child; 588 while (node->avl_child[child] != NULL) { 589 #ifdef ZFS_DEBUG 590 diff = tree->avl_compar(new_data, 591 AVL_NODE2DATA(node, tree->avl_offset)); 592 ASSERT(-1 <= diff && diff <= 1); 593 ASSERT(diff != 0); 594 ASSERT(diff > 0 ? child == 1 : child == 0); 595 #endif 596 node = node->avl_child[child]; 597 } 598 #ifdef ZFS_DEBUG 599 diff = tree->avl_compar(new_data, 600 AVL_NODE2DATA(node, tree->avl_offset)); 601 ASSERT(-1 <= diff && diff <= 1); 602 ASSERT(diff != 0); 603 ASSERT(diff > 0 ? child == 1 : child == 0); 604 #endif 605 } 606 ASSERT(node->avl_child[child] == NULL); 607 608 avl_insert(tree, new_data, AVL_MKINDEX(node, child)); 609 } 610 611 /* 612 * Add a new node to an AVL tree. Strictly enforce that no duplicates can 613 * be added to the tree with a VERIFY which is enabled for non-DEBUG builds. 614 */ 615 void 616 avl_add(avl_tree_t *tree, void *new_node) 617 { 618 avl_index_t where = 0; 619 620 VERIFY(avl_find(tree, new_node, &where) == NULL); 621 622 avl_insert(tree, new_node, where); 623 } 624 625 /* 626 * Delete a node from the AVL tree. Deletion is similar to insertion, but 627 * with 2 complications. 628 * 629 * First, we may be deleting an interior node. Consider the following subtree: 630 * 631 * d c c 632 * / \ / \ / \ 633 * b e b e b e 634 * / \ / \ / 635 * a c a a 636 * 637 * When we are deleting node (d), we find and bring up an adjacent valued leaf 638 * node, say (c), to take the interior node's place. In the code this is 639 * handled by temporarily swapping (d) and (c) in the tree and then using 640 * common code to delete (d) from the leaf position. 641 * 642 * Secondly, an interior deletion from a deep tree may require more than one 643 * rotation to fix the balance. This is handled by moving up the tree through 644 * parents and applying rotations as needed. The return value from 645 * avl_rotation() is used to detect when a subtree did not change overall 646 * height due to a rotation. 647 */ 648 void 649 avl_remove(avl_tree_t *tree, void *data) 650 { 651 avl_node_t *delete; 652 avl_node_t *parent; 653 avl_node_t *node; 654 avl_node_t tmp; 655 int old_balance; 656 int new_balance; 657 int left; 658 int right; 659 int which_child; 660 size_t off = tree->avl_offset; 661 662 delete = AVL_DATA2NODE(data, off); 663 664 /* 665 * Deletion is easiest with a node that has at most 1 child. 666 * We swap a node with 2 children with a sequentially valued 667 * neighbor node. That node will have at most 1 child. Note this 668 * has no effect on the ordering of the remaining nodes. 669 * 670 * As an optimization, we choose the greater neighbor if the tree 671 * is right heavy, otherwise the left neighbor. This reduces the 672 * number of rotations needed. 673 */ 674 if (delete->avl_child[0] != NULL && delete->avl_child[1] != NULL) { 675 676 /* 677 * choose node to swap from whichever side is taller 678 */ 679 old_balance = AVL_XBALANCE(delete); 680 left = (old_balance > 0); 681 right = 1 - left; 682 683 /* 684 * get to the previous value'd node 685 * (down 1 left, as far as possible right) 686 */ 687 for (node = delete->avl_child[left]; 688 node->avl_child[right] != NULL; 689 node = node->avl_child[right]) 690 ; 691 692 /* 693 * create a temp placeholder for 'node' 694 * move 'node' to delete's spot in the tree 695 */ 696 tmp = *node; 697 698 *node = *delete; 699 if (node->avl_child[left] == node) 700 node->avl_child[left] = &tmp; 701 702 parent = AVL_XPARENT(node); 703 if (parent != NULL) 704 parent->avl_child[AVL_XCHILD(node)] = node; 705 else 706 tree->avl_root = node; 707 AVL_SETPARENT(node->avl_child[left], node); 708 AVL_SETPARENT(node->avl_child[right], node); 709 710 /* 711 * Put tmp where node used to be (just temporary). 712 * It always has a parent and at most 1 child. 713 */ 714 delete = &tmp; 715 parent = AVL_XPARENT(delete); 716 parent->avl_child[AVL_XCHILD(delete)] = delete; 717 which_child = (delete->avl_child[1] != 0); 718 if (delete->avl_child[which_child] != NULL) 719 AVL_SETPARENT(delete->avl_child[which_child], delete); 720 } 721 722 723 /* 724 * Here we know "delete" is at least partially a leaf node. It can 725 * be easily removed from the tree. 726 */ 727 ASSERT(tree->avl_numnodes > 0); 728 --tree->avl_numnodes; 729 parent = AVL_XPARENT(delete); 730 which_child = AVL_XCHILD(delete); 731 if (delete->avl_child[0] != NULL) 732 node = delete->avl_child[0]; 733 else 734 node = delete->avl_child[1]; 735 736 /* 737 * Connect parent directly to node (leaving out delete). 738 */ 739 if (node != NULL) { 740 AVL_SETPARENT(node, parent); 741 AVL_SETCHILD(node, which_child); 742 } 743 if (parent == NULL) { 744 tree->avl_root = node; 745 return; 746 } 747 parent->avl_child[which_child] = node; 748 749 750 /* 751 * Since the subtree is now shorter, begin adjusting parent balances 752 * and performing any needed rotations. 753 */ 754 do { 755 756 /* 757 * Move up the tree and adjust the balance 758 * 759 * Capture the parent and which_child values for the next 760 * iteration before any rotations occur. 761 */ 762 node = parent; 763 old_balance = AVL_XBALANCE(node); 764 new_balance = old_balance - (which_child ? 1 : -1); 765 parent = AVL_XPARENT(node); 766 which_child = AVL_XCHILD(node); 767 768 /* 769 * If a node was in perfect balance but isn't anymore then 770 * we can stop, since the height didn't change above this point 771 * due to a deletion. 772 */ 773 if (old_balance == 0) { 774 AVL_SETBALANCE(node, new_balance); 775 break; 776 } 777 778 /* 779 * If the new balance is zero, we don't need to rotate 780 * else 781 * need a rotation to fix the balance. 782 * If the rotation doesn't change the height 783 * of the sub-tree we have finished adjusting. 784 */ 785 if (new_balance == 0) 786 AVL_SETBALANCE(node, new_balance); 787 else if (!avl_rotation(tree, node, new_balance)) 788 break; 789 } while (parent != NULL); 790 } 791 792 #define AVL_REINSERT(tree, obj) \ 793 avl_remove((tree), (obj)); \ 794 avl_add((tree), (obj)) 795 796 boolean_t 797 avl_update_lt(avl_tree_t *t, void *obj) 798 { 799 void *neighbor; 800 801 ASSERT(((neighbor = AVL_NEXT(t, obj)) == NULL) || 802 (t->avl_compar(obj, neighbor) <= 0)); 803 804 neighbor = AVL_PREV(t, obj); 805 if ((neighbor != NULL) && (t->avl_compar(obj, neighbor) < 0)) { 806 AVL_REINSERT(t, obj); 807 return (B_TRUE); 808 } 809 810 return (B_FALSE); 811 } 812 813 boolean_t 814 avl_update_gt(avl_tree_t *t, void *obj) 815 { 816 void *neighbor; 817 818 ASSERT(((neighbor = AVL_PREV(t, obj)) == NULL) || 819 (t->avl_compar(obj, neighbor) >= 0)); 820 821 neighbor = AVL_NEXT(t, obj); 822 if ((neighbor != NULL) && (t->avl_compar(obj, neighbor) > 0)) { 823 AVL_REINSERT(t, obj); 824 return (B_TRUE); 825 } 826 827 return (B_FALSE); 828 } 829 830 boolean_t 831 avl_update(avl_tree_t *t, void *obj) 832 { 833 void *neighbor; 834 835 neighbor = AVL_PREV(t, obj); 836 if ((neighbor != NULL) && (t->avl_compar(obj, neighbor) < 0)) { 837 AVL_REINSERT(t, obj); 838 return (B_TRUE); 839 } 840 841 neighbor = AVL_NEXT(t, obj); 842 if ((neighbor != NULL) && (t->avl_compar(obj, neighbor) > 0)) { 843 AVL_REINSERT(t, obj); 844 return (B_TRUE); 845 } 846 847 return (B_FALSE); 848 } 849 850 void 851 avl_swap(avl_tree_t *tree1, avl_tree_t *tree2) 852 { 853 avl_node_t *temp_node; 854 ulong_t temp_numnodes; 855 856 ASSERT3P(tree1->avl_compar, ==, tree2->avl_compar); 857 ASSERT3U(tree1->avl_offset, ==, tree2->avl_offset); 858 859 temp_node = tree1->avl_root; 860 temp_numnodes = tree1->avl_numnodes; 861 tree1->avl_root = tree2->avl_root; 862 tree1->avl_numnodes = tree2->avl_numnodes; 863 tree2->avl_root = temp_node; 864 tree2->avl_numnodes = temp_numnodes; 865 } 866 867 /* 868 * initialize a new AVL tree 869 */ 870 void 871 avl_create(avl_tree_t *tree, int (*compar) (const void *, const void *), 872 size_t size, size_t offset) 873 { 874 ASSERT(tree); 875 ASSERT(compar); 876 ASSERT(size > 0); 877 ASSERT(size >= offset + sizeof (avl_node_t)); 878 #ifdef _LP64 879 ASSERT((offset & 0x7) == 0); 880 #endif 881 882 tree->avl_compar = compar; 883 tree->avl_root = NULL; 884 tree->avl_numnodes = 0; 885 tree->avl_offset = offset; 886 } 887 888 /* 889 * Delete a tree. 890 */ 891 void 892 avl_destroy(avl_tree_t *tree) 893 { 894 ASSERT(tree); 895 ASSERT(tree->avl_numnodes == 0); 896 ASSERT(tree->avl_root == NULL); 897 } 898 899 900 /* 901 * Return the number of nodes in an AVL tree. 902 */ 903 ulong_t 904 avl_numnodes(avl_tree_t *tree) 905 { 906 ASSERT(tree); 907 return (tree->avl_numnodes); 908 } 909 910 boolean_t 911 avl_is_empty(avl_tree_t *tree) 912 { 913 ASSERT(tree); 914 return (tree->avl_numnodes == 0); 915 } 916 917 #define CHILDBIT (1L) 918 919 /* 920 * Post-order tree walk used to visit all tree nodes and destroy the tree 921 * in post order. This is used for removing all the nodes from a tree without 922 * paying any cost for rebalancing it. 923 * 924 * example: 925 * 926 * void *cookie = NULL; 927 * my_data_t *node; 928 * 929 * while ((node = avl_destroy_nodes(tree, &cookie)) != NULL) 930 * free(node); 931 * avl_destroy(tree); 932 * 933 * The cookie is really an avl_node_t to the current node's parent and 934 * an indication of which child you looked at last. 935 * 936 * On input, a cookie value of CHILDBIT indicates the tree is done. 937 */ 938 void * 939 avl_destroy_nodes(avl_tree_t *tree, void **cookie) 940 { 941 avl_node_t *node; 942 avl_node_t *parent; 943 int child; 944 void *first; 945 size_t off = tree->avl_offset; 946 947 /* 948 * Initial calls go to the first node or it's right descendant. 949 */ 950 if (*cookie == NULL) { 951 first = avl_first(tree); 952 953 /* 954 * deal with an empty tree 955 */ 956 if (first == NULL) { 957 *cookie = (void *)CHILDBIT; 958 return (NULL); 959 } 960 961 node = AVL_DATA2NODE(first, off); 962 parent = AVL_XPARENT(node); 963 goto check_right_side; 964 } 965 966 /* 967 * If there is no parent to return to we are done. 968 */ 969 parent = (avl_node_t *)((uintptr_t)(*cookie) & ~CHILDBIT); 970 if (parent == NULL) { 971 if (tree->avl_root != NULL) { 972 ASSERT(tree->avl_numnodes == 1); 973 tree->avl_root = NULL; 974 tree->avl_numnodes = 0; 975 } 976 return (NULL); 977 } 978 979 /* 980 * Remove the child pointer we just visited from the parent and tree. 981 */ 982 child = (uintptr_t)(*cookie) & CHILDBIT; 983 parent->avl_child[child] = NULL; 984 ASSERT(tree->avl_numnodes > 1); 985 --tree->avl_numnodes; 986 987 /* 988 * If we just removed a right child or there isn't one, go up to parent. 989 */ 990 if (child == 1 || parent->avl_child[1] == NULL) { 991 node = parent; 992 parent = AVL_XPARENT(parent); 993 goto done; 994 } 995 996 /* 997 * Do parent's right child, then leftmost descendent. 998 */ 999 node = parent->avl_child[1]; 1000 while (node->avl_child[0] != NULL) { 1001 parent = node; 1002 node = node->avl_child[0]; 1003 } 1004 1005 /* 1006 * If here, we moved to a left child. It may have one 1007 * child on the right (when balance == +1). 1008 */ 1009 check_right_side: 1010 if (node->avl_child[1] != NULL) { 1011 ASSERT(AVL_XBALANCE(node) == 1); 1012 parent = node; 1013 node = node->avl_child[1]; 1014 ASSERT(node->avl_child[0] == NULL && 1015 node->avl_child[1] == NULL); 1016 } else { 1017 ASSERT(AVL_XBALANCE(node) <= 0); 1018 } 1019 1020 done: 1021 if (parent == NULL) { 1022 *cookie = (void *)CHILDBIT; 1023 ASSERT(node == tree->avl_root); 1024 } else { 1025 *cookie = (void *)((uintptr_t)parent | AVL_XCHILD(node)); 1026 } 1027 1028 return (AVL_NODE2DATA(node, off)); 1029 } 1030 1031 EXPORT_SYMBOL(avl_create); 1032 EXPORT_SYMBOL(avl_find); 1033 EXPORT_SYMBOL(avl_insert); 1034 EXPORT_SYMBOL(avl_insert_here); 1035 EXPORT_SYMBOL(avl_walk); 1036 EXPORT_SYMBOL(avl_first); 1037 EXPORT_SYMBOL(avl_last); 1038 EXPORT_SYMBOL(avl_nearest); 1039 EXPORT_SYMBOL(avl_add); 1040 EXPORT_SYMBOL(avl_swap); 1041 EXPORT_SYMBOL(avl_is_empty); 1042 EXPORT_SYMBOL(avl_remove); 1043 EXPORT_SYMBOL(avl_numnodes); 1044 EXPORT_SYMBOL(avl_destroy_nodes); 1045 EXPORT_SYMBOL(avl_destroy); 1046 EXPORT_SYMBOL(avl_update_lt); 1047 EXPORT_SYMBOL(avl_update_gt); 1048 EXPORT_SYMBOL(avl_update); 1049