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Auto merge of #111596 - cjgillot:dominator-bucket, r=Mark-Simulacrum
Process current bucket instead of parent's bucket when starting loop for dominators. The linked paper by Georgiadis suggests in §2.2.3 to process `bucket[w]` when beginning the loop, instead of `bucket[parent[w]]` when finishing it. In the test case, we correctly computed `idom[2] = 0` and `sdom[3] = 1`, but the algorithm returned `idom[3] = 1`, instead of the correct value 0, because of the path 0-7-2-3. This provoked LLVM ICE in https://github.com/rust-lang/rust/pull/111061#issuecomment-1546912112. LLVM checks that SSA assignments dominate uses using its own implementation of Lengauer-Tarjan, and saw case where rustc was breaking the dominance property. r? `@Mark-Simulacrum`
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@ -109,28 +109,27 @@ pub fn dominators<G: ControlFlowGraph>(graph: G) -> Dominators<G::Node> {
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// they have been placed in the bucket.
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//
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// We compute a partial set of immediate dominators here.
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let z = parent[w];
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for &v in bucket[z].iter() {
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for &v in bucket[w].iter() {
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// This uses the result of Lemma 5 from section 2 from the original
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// 1979 paper, to compute either the immediate or relative dominator
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// for a given vertex v.
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//
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// eval returns a vertex y, for which semi[y] is minimum among
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// vertices semi[v] +> y *> v. Note that semi[v] = z as we're in the
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// z bucket.
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// vertices semi[v] +> y *> v. Note that semi[v] = w as we're in the
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// w bucket.
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//
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// Given such a vertex y, semi[y] <= semi[v] and idom[y] = idom[v].
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// If semi[y] = semi[v], though, idom[v] = semi[v].
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//
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// Using this, we can either set idom[v] to be:
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// * semi[v] (i.e. z), if semi[y] is z
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// * semi[v] (i.e. w), if semi[y] is w
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// * idom[y], otherwise
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//
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// We don't directly set to idom[y] though as it's not necessarily
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// known yet. The second preorder traversal will cleanup by updating
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// the idom for any that were missed in this pass.
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let y = eval(&mut parent, lastlinked, &semi, &mut label, v);
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idom[v] = if semi[y] < z { y } else { z };
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idom[v] = if semi[y] < w { y } else { w };
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}
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// This loop computes the semi[w] for w.
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@ -213,10 +212,11 @@ pub fn dominators<G: ControlFlowGraph>(graph: G) -> Dominators<G::Node> {
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// If we don't yet know the idom directly, then push this vertex into
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// our semidominator's bucket, where it will get processed at a later
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// stage to compute its immediate dominator.
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if parent[w] != semi[w] {
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let z = parent[w];
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if z != semi[w] {
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bucket[semi[w]].push(w);
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} else {
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idom[w] = parent[w];
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idom[w] = z;
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}
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// Optimization: We share the parent array between processed and not
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@ -53,3 +53,30 @@ fn immediate_dominator() {
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assert_eq!(dominators.immediate_dominator(2), Some(1));
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assert_eq!(dominators.immediate_dominator(3), Some(2));
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}
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#[test]
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fn transitive_dominator() {
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let graph = TestGraph::new(
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0,
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&[
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// First tree branch.
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(0, 1),
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(1, 2),
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(2, 3),
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(3, 4),
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// Second tree branch.
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(1, 5),
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(5, 6),
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// Third tree branch.
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(0, 7),
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// These links make 0 the dominator for 2 and 3.
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(7, 2),
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(5, 3),
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],
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);
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let dom_tree = dominators(&graph);
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let immediate_dominators = &dom_tree.immediate_dominators;
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assert_eq!(immediate_dominators[2], Some(0));
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assert_eq!(immediate_dominators[3], Some(0)); // This used to return Some(1).
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}
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