| blob | fdd94d2c14bdda60cabd3d9d4b780fbe3e88b707 |
1 /* Calculate (post)dominators in slightly super-linear time.
2 Copyright (C) 2000, 2003, 2004, 2005, 2006, 2007 Free Software Foundation, Inc.
3 Contributed by Michael Matz (matz@ifh.de).
5 This file is part of GCC.
7 GCC is free software; you can redistribute it and/or modify it
8 under the terms of the GNU General Public License as published by
9 the Free Software Foundation; either version 3, or (at your option)
10 any later version.
12 GCC is distributed in the hope that it will be useful, but WITHOUT
13 ANY WARRANTY; without even the implied warranty of MERCHANTABILITY
14 or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public
15 License for more details.
17 You should have received a copy of the GNU General Public License
18 along with GCC; see the file COPYING3. If not see
19 <http://www.gnu.org/licenses/>. */
21 /* This file implements the well known algorithm from Lengauer and Tarjan
22 to compute the dominators in a control flow graph. A basic block D is said
23 to dominate another block X, when all paths from the entry node of the CFG
24 to X go also over D. The dominance relation is a transitive reflexive
25 relation and its minimal transitive reduction is a tree, called the
26 dominator tree. So for each block X besides the entry block exists a
27 block I(X), called the immediate dominator of X, which is the parent of X
28 in the dominator tree.
30 The algorithm computes this dominator tree implicitly by computing for
31 each block its immediate dominator. We use tree balancing and path
32 compression, so it's the O(e*a(e,v)) variant, where a(e,v) is the very
33 slowly growing functional inverse of the Ackerman function. */
50 /* We name our nodes with integers, beginning with 1. Zero is reserved for
51 'undefined' or 'end of list'. The name of each node is given by the dfs
52 number of the corresponding basic block. Please note, that we include the
53 artificial ENTRY_BLOCK (or EXIT_BLOCK in the post-dom case) in our lists to
54 support multiple entry points. Its dfs number is of course 1. */
56 /* Type of Basic Block aka. TBB */
59 /* We work in a poor-mans object oriented fashion, and carry an instance of
60 this structure through all our 'methods'. It holds various arrays
61 reflecting the (sub)structure of the flowgraph. Most of them are of type
62 TBB and are also indexed by TBB. */
64 struct dom_info
65 {
66 /* The parent of a node in the DFS tree. */
68 /* For a node x key[x] is roughly the node nearest to the root from which
69 exists a way to x only over nodes behind x. Such a node is also called
70 semidominator. */
72 /* The value in path_min[x] is the node y on the path from x to the root of
73 the tree x is in with the smallest key[y]. */
75 /* bucket[x] points to the first node of the set of nodes having x as key. */
77 /* And next_bucket[x] points to the next node. */
79 /* After the algorithm is done, dom[x] contains the immediate dominator
80 of x. */
83 /* The following few fields implement the structures needed for disjoint
84 sets. */
85 /* set_chain[x] is the next node on the path from x to the representant
86 of the set containing x. If set_chain[x]==0 then x is a root. */
88 /* set_size[x] is the number of elements in the set named by x. */
90 /* set_child[x] is used for balancing the tree representing a set. It can
91 be understood as the next sibling of x. */
94 /* If b is the number of a basic block (BB->index), dfs_order[b] is the
95 number of that node in DFS order counted from 1. This is an index
96 into most of the other arrays in this structure. */
98 /* If x is the DFS-index of a node which corresponds with a basic block,
99 dfs_to_bb[x] is that basic block. Note, that in our structure there are
100 more nodes that basic blocks, so only dfs_to_bb[dfs_order[bb->index]]==bb
101 is true for every basic block bb, but not the opposite. */
104 /* This is the next free DFS number when creating the DFS tree. */
106 /* The number of nodes in the DFS tree (==dfsnum-1). */
109 /* Blocks with bits set here have a fake edge to EXIT. These are used
110 to turn a DFS forest into a proper tree. */
111 bitmap fake_exit_edge;
112 };
125 /* Helper macro for allocating and initializing an array,
126 for aesthetic reasons. */
127 #define init_ar(var, type, num, content) \
128 do \
129 { \
131 if (! (content)) \
132 (var) = XCNEWVEC (type, num); \
133 else \
134 { \
135 (var) = XNEWVEC (type, (num)); \
136 for (i = 0; i < num; i++) \
137 (var)[i] = (content); \
138 } \
139 } \
140 while (0)
142 /* Allocate all needed memory in a pessimistic fashion (so we round up).
143 This initializes the contents of DI, which already must be allocated. */
145 static void
147 {
148 /* We need memory for n_basic_blocks nodes. */
169 {
179 }
180 }
182 #undef init_ar
184 /* Map dominance calculation type to array index used for various
185 dominance information arrays. This version is simple -- it will need
186 to be modified, obviously, if additional values are added to
187 cdi_direction. */
189 static unsigned int
191 {
194 }
196 /* Free all allocated memory in DI, but not DI itself. */
198 static void
200 {
213 }
215 /* The nonrecursive variant of creating a DFS tree. DI is our working
216 structure, BB the starting basic block for this tree and REVERSE
217 is true, if predecessors should be visited instead of successors of a
218 node. After this is done all nodes reachable from BB were visited, have
219 assigned their dfs number and are linked together to form a tree. */
221 static void
223 {
224 /* We call this _only_ if bb is not already visited. */
225 edge e;
230 /* Start block (ENTRY_BLOCK_PTR for forward problem, EXIT_BLOCK for backward
231 problem). */
232 basic_block en_block;
233 /* Ending block. */
234 basic_block ex_block;
239 /* Initialize our border blocks, and the first edge. */
241 {
245 }
246 else
247 {
251 }
253 /* When the stack is empty we break out of this loop. */
255 {
256 basic_block bn;
258 /* This loop traverses edges e in depth first manner, and fills the
259 stack. */
261 {
264 /* Deduce from E the current and the next block (BB and BN), and the
265 next edge. */
267 {
270 /* If the next node BN is either already visited or a border
271 block the current edge is useless, and simply overwritten
272 with the next edge out of the current node. */
274 {
277 }
280 }
281 else
282 {
285 {
288 }
291 }
295 /* Fill the DFS tree info calculatable _before_ recursing. */
298 else
304 /* Save the current point in the CFG on the stack, and recurse. */
307 }
313 /* OK. The edge-list was exhausted, meaning normally we would
314 end the recursion. After returning from the recursive call,
315 there were (may be) other statements which were run after a
316 child node was completely considered by DFS. Here is the
317 point to do it in the non-recursive variant.
318 E.g. The block just completed is in e->dest for forward DFS,
319 the block not yet completed (the parent of the one above)
320 in e->src. This could be used e.g. for computing the number of
321 descendants or the tree depth. */
323 }
325 }
327 /* The main entry for calculating the DFS tree or forest. DI is our working
328 structure and REVERSE is true, if we are interested in the reverse flow
329 graph. In that case the result is not necessarily a tree but a forest,
330 because there may be nodes from which the EXIT_BLOCK is unreachable. */
332 static void
334 {
335 /* The first block is the ENTRY_BLOCK (or EXIT_BLOCK if REVERSE). */
344 {
345 /* In the post-dom case we may have nodes without a path to EXIT_BLOCK.
346 They are reverse-unreachable. In the dom-case we disallow such
347 nodes, but in post-dom we have to deal with them.
349 There are two situations in which this occurs. First, noreturn
350 functions. Second, infinite loops. In the first case we need to
351 pretend that there is an edge to the exit block. In the second
352 case, we wind up with a forest. We need to process all noreturn
353 blocks before we know if we've got any infinite loops. */
355 basic_block b;
359 {
361 {
365 }
372 }
375 {
377 {
386 }
387 }
388 }
392 /* This aborts e.g. when there is _no_ path from ENTRY to EXIT at all. */
394 }
396 /* Compress the path from V to the root of its set and update path_min at the
397 same time. After compress(di, V) set_chain[V] is the root of the set V is
398 in and path_min[V] is the node with the smallest key[] value on the path
399 from V to that root. */
401 static void
403 {
404 /* Btw. It's not worth to unrecurse compress() as the depth is usually not
405 greater than 5 even for huge graphs (I've not seen call depth > 4).
406 Also performance wise compress() ranges _far_ behind eval(). */
409 {
414 }
415 }
417 /* Compress the path from V to the set root of V if needed (when the root has
418 changed since the last call). Returns the node with the smallest key[]
419 value on the path from V to the root. */
423 {
424 /* The representant of the set V is in, also called root (as the set
425 representation is a tree). */
428 /* V itself is the root. */
432 /* Compress only if necessary. */
434 {
437 }
441 else
443 }
445 /* This essentially merges the two sets of V and W, giving a single set with
446 the new root V. The internal representation of these disjoint sets is a
447 balanced tree. Currently link(V,W) is only used with V being the parent
448 of W. */
450 static void
452 {
455 /* Rebalance the tree. */
457 {
460 {
463 }
464 else
465 {
468 }
469 }
474 {
478 }
480 /* Merge all subtrees. */
482 {
485 }
486 }
488 /* This calculates the immediate dominators (or post-dominators if REVERSE is
489 true). DI is our working structure and should hold the DFS forest.
490 On return the immediate dominator to node V is in di->dom[V]. */
492 static void
494 {
496 basic_block en_block;
501 else
504 /* Go backwards in DFS order, to first look at the leafs. */
507 {
509 edge e;
517 {
518 /* If this block has a fake edge to exit, process that first. */
520 {
524 }
525 }
527 /* Search all direct predecessors for the smallest node with a path
528 to them. That way we have the smallest node with also a path to
529 us only over nodes behind us. In effect we search for our
530 semidominator. */
532 {
533 TBB k1;
534 basic_block b;
542 {
543 do_fake_exit_edge:
545 }
546 else
549 /* Call eval() only if really needed. If k1 is above V in DFS tree,
550 then we know, that eval(k1) == k1 and key[k1] == k1. */
557 }
564 /* Transform semidominators into dominators. */
566 {
570 else
572 }
573 /* We don't need to cleanup next_bucket[]. */
575 v--;
576 }
578 /* Explicitly define the dominators. */
583 }
585 /* Assign dfs numbers starting from NUM to NODE and its sons. */
587 static void
589 {
595 {
599 }
602 }
604 /* Compute the data necessary for fast resolving of dominator queries in a
605 static dominator tree. */
607 static void
609 {
611 basic_block bb;
620 {
623 }
626 }
628 /* The main entry point into this module. DIR is set depending on whether
629 we want to compute dominators or postdominators. */
631 void
633 {
635 basic_block b;
644 {
648 {
650 }
658 {
663 }
667 }
672 }
674 /* Free dominance information for direction DIR. */
675 void
677 {
678 basic_block bb;
685 {
688 }
694 }
696 /* Return the immediate dominator of basic block BB. */
697 basic_block
699 {
709 }
711 /* Set the immediate dominator of the block possibly removing
712 existing edge. NULL can be used to remove any edge. */
715 basic_block dominated_by)
716 {
723 {
727 }
734 }
736 /* Returns the list of basic blocks immediately dominated by BB, in the
737 direction DIR. */
740 {
756 }
758 /* Returns the list of basic blocks that are immediately dominated (in
759 direction DIR) by some block between N_REGION ones stored in REGION,
760 except for blocks in the REGION itself. */
765 {
767 basic_block dom;
774 dom;
782 }
784 /* Redirect all edges pointing to BB to TO. */
785 void
787 basic_block to)
788 {
801 {
806 }
810 }
812 /* Find first basic block in the tree dominating both BB1 and BB2. */
813 basic_block
815 {
826 }
829 /* Find the nearest common dominator for the basic blocks in BLOCKS,
830 using dominance direction DIR. */
832 basic_block
834 {
836 bitmap_iterator bi;
837 basic_block dom;
846 }
848 /* Given a dominator tree, we can determine whether one thing
849 dominates another in constant time by using two DFS numbers:
851 1. The number for when we visit a node on the way down the tree
852 2. The number for when we visit a node on the way back up the tree
854 You can view these as bounds for the range of dfs numbers the
855 nodes in the subtree of the dominator tree rooted at that node
856 will contain.
858 The dominator tree is always a simple acyclic tree, so there are
859 only three possible relations two nodes in the dominator tree have
860 to each other:
862 1. Node A is above Node B (and thus, Node A dominates node B)
864 A
865 |
866 C
867 / \
868 B D
871 In the above case, DFS_Number_In of A will be <= DFS_Number_In of
872 B, and DFS_Number_Out of A will be >= DFS_Number_Out of B. This is
873 because we must hit A in the dominator tree *before* B on the walk
874 down, and we will hit A *after* B on the walk back up
876 2. Node A is below node B (and thus, node B dominates node A)
879 B
880 |
881 A
882 / \
883 C D
885 In the above case, DFS_Number_In of A will be >= DFS_Number_In of
886 B, and DFS_Number_Out of A will be <= DFS_Number_Out of B.
888 This is because we must hit A in the dominator tree *after* B on
889 the walk down, and we will hit A *before* B on the walk back up
891 3. Node A and B are siblings (and thus, neither dominates the other)
893 C
894 |
895 D
896 / \
897 A B
899 In the above case, DFS_Number_In of A will *always* be <=
900 DFS_Number_In of B, and DFS_Number_Out of A will *always* be <=
901 DFS_Number_Out of B. This is because we will always finish the dfs
902 walk of one of the subtrees before the other, and thus, the dfs
903 numbers for one subtree can't intersect with the range of dfs
904 numbers for the other subtree. If you swap A and B's position in
905 the dominator tree, the comparison changes direction, but the point
906 is that both comparisons will always go the same way if there is no
907 dominance relationship.
909 Thus, it is sufficient to write
911 A_Dominates_B (node A, node B)
912 {
913 return DFS_Number_In(A) <= DFS_Number_In(B)
914 && DFS_Number_Out (A) >= DFS_Number_Out(B);
915 }
917 A_Dominated_by_B (node A, node B)
918 {
919 return DFS_Number_In(A) >= DFS_Number_In(A)
920 && DFS_Number_Out (A) <= DFS_Number_Out(B);
921 } */
923 /* Return TRUE in case BB1 is dominated by BB2. */
924 bool
926 {
937 }
939 /* Returns the entry dfs number for basic block BB, in the direction DIR. */
941 unsigned
943 {
949 }
951 /* Returns the exit dfs number for basic block BB, in the direction DIR. */
953 unsigned
955 {
961 }
963 /* Verify invariants of dominator structure. */
964 void
966 {
979 {
982 {
985 }
989 {
993 }
994 }
998 }
1000 /* Determine immediate dominator (or postdominator, according to DIR) of BB,
1001 assuming that dominators of other blocks are correct. We also use it to
1002 recompute the dominators in a restricted area, by iterating it until it
1003 reaches a fixed point. */
1005 basic_block
1007 {
1010 edge e;
1011 edge_iterator ei;
1016 {
1018 {
1021 }
1022 }
1023 else
1024 {
1026 {
1029 }
1030 }
1033 }
1035 /* Use simple heuristics (see iterate_fix_dominators) to determine dominators
1036 of BBS. We assume that all the immediate dominators except for those of the
1037 blocks in BBS are correct. If CONSERVATIVE is true, we also assume that the
1038 currently recorded immediate dominators of blocks in BBS really dominate the
1039 blocks. The basic blocks for that we determine the dominator are removed
1040 from BBS. */
1042 static void
1045 {
1049 edge_iterator ei;
1050 edge e;
1053 {
1058 {
1061 }
1069 {
1075 else
1076 {
1079 }
1080 }
1085 {
1088 }
1090 fail:
1091 i++;
1094 succeed:
1096 }
1097 }
1099 /* Returns root of the dominance tree in the direction DIR that contains
1100 BB. */
1102 static basic_block
1104 {
1106 }
1108 /* See the comment in iterate_fix_dominators. Finds the immediate dominators
1109 for the sons of Y, found using the SON and BROTHER arrays representing
1110 the dominance tree of graph G. BBS maps the vertices of G to the basic
1111 blocks. */
1113 static void
1116 {
1117 bitmap gprime;
1122 edge e;
1123 edge_iterator ei;
1129 else
1133 {
1134 /* Handle the common case Y has just one son specially. */
1140 }
1154 {
1157 {
1160 {
1165 }
1166 }
1170 {
1173 }
1174 }
1182 }
1184 /* Recompute dominance information for basic blocks in the set BBS. The
1185 function assumes that the immediate dominators of all the other blocks
1186 in CFG are correct, and that there are no unreachable blocks.
1188 If CONSERVATIVE is true, we additionally assume that all the ancestors of
1189 a block of BBS in the current dominance tree dominate it. */
1191 void
1194 {
1200 edge e;
1201 edge_iterator ei;
1206 /* We only support updating dominators. There are some problems with
1207 updating postdominators (need to add fake edges from infinite loops
1208 and noreturn functions), and since we do not currently use
1209 iterate_fix_dominators for postdominators, any attempt to handle these
1210 problems would be unused, untested, and almost surely buggy. We keep
1211 the DIR argument for consistency with the rest of the dominator analysis
1212 interface. */
1216 /* The algorithm we use takes inspiration from the following papers, although
1217 the details are quite different from any of them:
1219 [1] G. Ramalingam, T. Reps, An Incremental Algorithm for Maintaining the
1220 Dominator Tree of a Reducible Flowgraph
1221 [2] V. C. Sreedhar, G. R. Gao, Y.-F. Lee: Incremental computation of
1222 dominator trees
1223 [3] K. D. Cooper, T. J. Harvey and K. Kennedy: A Simple, Fast Dominance
1224 Algorithm
1226 First, we use the following heuristics to decrease the size of the BBS
1227 set:
1228 a) if BB has a single predecessor, then its immediate dominator is this
1229 predecessor
1230 additionally, if CONSERVATIVE is true:
1231 b) if all the predecessors of BB except for one (X) are dominated by BB,
1232 then X is the immediate dominator of BB
1233 c) if the nearest common ancestor of the predecessors of BB is X and
1234 X -> BB is an edge in CFG, then X is the immediate dominator of BB
1236 Then, we need to establish the dominance relation among the basic blocks
1237 in BBS. We split the dominance tree by removing the immediate dominator
1238 edges from BBS, creating a forest F. We form a graph G whose vertices
1239 are BBS and ENTRY and X -> Y is an edge of G if there exists an edge
1240 X' -> Y in CFG such that X' belongs to the tree of the dominance forest
1241 whose root is X. We then determine dominance tree of G. Note that
1242 for X, Y in BBS, X dominates Y in CFG if and only if X dominates Y in G.
1243 In this step, we can use arbitrary algorithm to determine dominators.
1244 We decided to prefer the algorithm [3] to the algorithm of
1245 Lengauer and Tarjan, since the set BBS is usually small (rarely exceeding
1246 10 during gcc bootstrap), and [3] should perform better in this case.
1248 Finally, we need to determine the immediate dominators for the basic
1249 blocks of BBS. If the immediate dominator of X in G is Y, then
1250 the immediate dominator of X in CFG belongs to the tree of F rooted in
1251 Y. We process the dominator tree T of G recursively, starting from leaves.
1252 Suppose that X_1, X_2, ..., X_k are the sons of Y in T, and that the
1253 subtrees of the dominance tree of CFG rooted in X_i are already correct.
1254 Let G' be the subgraph of G induced by {X_1, X_2, ..., X_k}. We make
1255 the following observations:
1256 (i) the immediate dominator of all blocks in a strongly connected
1257 component of G' is the same
1258 (ii) if X has no predecessors in G', then the immediate dominator of X
1259 is the nearest common ancestor of the predecessors of X in the
1260 subtree of F rooted in Y
1261 Therefore, it suffices to find the topological ordering of G', and
1262 process the nodes X_i in this order using the rules (i) and (ii).
1263 Then, we contract all the nodes X_i with Y in G, so that the further
1264 steps work correctly. */
1267 {
1268 /* Split the tree now. If the idoms of blocks in BBS are not
1269 conservatively correct, setting the dominators using the
1270 heuristics in prune_bbs_to_update_dominators could
1271 create cycles in the dominance "tree", and cause ICE. */
1274 }
1283 {
1288 }
1290 /* Construct the graph G. */
1293 {
1294 /* If the dominance tree is conservatively correct, split it now. */
1298 }
1305 {
1307 {
1314 /* Do not include parallel edges to G. */
1320 }
1321 }
1326 /* Find the dominator tree of G. */
1332 /* Finally, traverse the tree and find the immediate dominators. */
1336 {
1340 {
1344 }
1345 else
1347 }
1354 }
1356 void
1358 {
1370 }
1372 void
1374 {
1385 }
1387 /* Returns the first son of BB in the dominator or postdominator tree
1388 as determined by DIR. */
1390 basic_block
1392 {
1397 }
1399 /* Returns the next dominance son after BB in the dominator or postdominator
1400 tree as determined by DIR, or NULL if it was the last one. */
1402 basic_block
1404 {
1409 }
1411 /* Return dominance availability for dominance info DIR. */
1413 enum dom_state
1415 {
1419 }
1421 /* Set the dominance availability for dominance info DIR to NEW_STATE. */
1423 void
1425 {
1429 }
1431 /* Returns true if dominance information for direction DIR is available. */
1433 bool
1435 {
1439 }
1441 void
1443 {
1448 }
1450 /* Prints to stderr representation of the dominance tree (for direction DIR)
1451 rooted in ROOT, indented by INDENT tabulators. If INDENT_FIRST is false,
1452 the first line of the output is not indented. */
1454 static void
1457 {
1458 basic_block son;
1468 son;
1470 {
1473 }
1477 }
1479 /* Prints to stderr representation of the dominance tree (for direction DIR)
1480 rooted in ROOT. */
1482 void
1484 {
1486 }