llvm-6502/lib/CodeGen/PBQP/Heuristics/Briggs.h
Lang Hames 5cef638855 * Updated the cost matrix normalization proceedure to better handle infinite costs.
* Enabled R1/R2 application for nodes with infinite spill costs in the Briggs heuristic (made
safe by the changes to the normalization proceedure).
* Removed a redundant header.


git-svn-id: https://llvm.org/svn/llvm-project/llvm/trunk@95973 91177308-0d34-0410-b5e6-96231b3b80d8
2010-02-12 09:43:37 +00:00

466 lines
17 KiB
C++

//===-- Briggs.h --- Briggs Heuristic for PBQP ------------------*- C++ -*-===//
//
// The LLVM Compiler Infrastructure
//
// This file is distributed under the University of Illinois Open Source
// License. See LICENSE.TXT for details.
//
//===----------------------------------------------------------------------===//
//
// This class implements the Briggs test for "allocability" of nodes in a
// PBQP graph representing a register allocation problem. Nodes which can be
// proven allocable (by a safe and relatively accurate test) are removed from
// the PBQP graph first. If no provably allocable node is present in the graph
// then the node with the minimal spill-cost to degree ratio is removed.
//
//===----------------------------------------------------------------------===//
#ifndef LLVM_CODEGEN_PBQP_HEURISTICS_BRIGGS_H
#define LLVM_CODEGEN_PBQP_HEURISTICS_BRIGGS_H
#include "llvm/Support/Compiler.h"
#include "../HeuristicSolver.h"
#include "../HeuristicBase.h"
#include <set>
#include <limits>
namespace PBQP {
namespace Heuristics {
/// \brief PBQP Heuristic which applies an allocability test based on
/// Briggs.
///
/// This heuristic assumes that the elements of cost vectors in the PBQP
/// problem represent storage options, with the first being the spill
/// option and subsequent elements representing legal registers for the
/// corresponding node. Edge cost matrices are likewise assumed to represent
/// register constraints.
/// If one or more nodes can be proven allocable by this heuristic (by
/// inspection of their constraint matrices) then the allocable node of
/// highest degree is selected for the next reduction and pushed to the
/// solver stack. If no nodes can be proven allocable then the node with
/// the lowest estimated spill cost is selected and push to the solver stack
/// instead.
///
/// This implementation is built on top of HeuristicBase.
class Briggs : public HeuristicBase<Briggs> {
private:
class LinkDegreeComparator {
public:
LinkDegreeComparator(HeuristicSolverImpl<Briggs> &s) : s(&s) {}
bool operator()(Graph::NodeItr n1Itr, Graph::NodeItr n2Itr) const {
if (s->getSolverDegree(n1Itr) > s->getSolverDegree(n2Itr))
return true;
if (s->getSolverDegree(n1Itr) < s->getSolverDegree(n2Itr))
return false;
return (&*n1Itr < &*n2Itr);
}
private:
HeuristicSolverImpl<Briggs> *s;
};
class SpillCostComparator {
public:
SpillCostComparator(HeuristicSolverImpl<Briggs> &s)
: s(&s), g(&s.getGraph()) {}
bool operator()(Graph::NodeItr n1Itr, Graph::NodeItr n2Itr) const {
PBQPNum cost1 = g->getNodeCosts(n1Itr)[0] / s->getSolverDegree(n1Itr),
cost2 = g->getNodeCosts(n2Itr)[0] / s->getSolverDegree(n2Itr);
if (cost1 < cost2)
return true;
if (cost1 > cost2)
return false;
return (&*n1Itr < &*n2Itr);
}
private:
HeuristicSolverImpl<Briggs> *s;
Graph *g;
};
typedef std::list<Graph::NodeItr> RNAllocableList;
typedef RNAllocableList::iterator RNAllocableListItr;
typedef std::list<Graph::NodeItr> RNUnallocableList;
typedef RNUnallocableList::iterator RNUnallocableListItr;
public:
struct NodeData {
typedef std::vector<unsigned> UnsafeDegreesArray;
bool isHeuristic, isAllocable, isInitialized;
unsigned numDenied, numSafe;
UnsafeDegreesArray unsafeDegrees;
RNAllocableListItr rnaItr;
RNUnallocableListItr rnuItr;
NodeData()
: isHeuristic(false), isAllocable(false), isInitialized(false),
numDenied(0), numSafe(0) { }
};
struct EdgeData {
typedef std::vector<unsigned> UnsafeArray;
unsigned worst, reverseWorst;
UnsafeArray unsafe, reverseUnsafe;
bool isUpToDate;
EdgeData() : worst(0), reverseWorst(0), isUpToDate(false) {}
};
/// \brief Construct an instance of the Briggs heuristic.
/// @param solver A reference to the solver which is using this heuristic.
Briggs(HeuristicSolverImpl<Briggs> &solver) :
HeuristicBase<Briggs>(solver) {}
/// \brief Determine whether a node should be reduced using optimal
/// reduction.
/// @param nItr Node iterator to be considered.
/// @return True if the given node should be optimally reduced, false
/// otherwise.
///
/// Selects nodes of degree 0, 1 or 2 for optimal reduction, with one
/// exception. Nodes whose spill cost (element 0 of their cost vector) is
/// infinite are checked for allocability first. Allocable nodes may be
/// optimally reduced, but nodes whose allocability cannot be proven are
/// selected for heuristic reduction instead.
bool shouldOptimallyReduce(Graph::NodeItr nItr) {
if (getSolver().getSolverDegree(nItr) < 3) {
return true;
}
// else
return false;
}
/// \brief Add a node to the heuristic reduce list.
/// @param nItr Node iterator to add to the heuristic reduce list.
void addToHeuristicReduceList(Graph::NodeItr nItr) {
NodeData &nd = getHeuristicNodeData(nItr);
initializeNode(nItr);
nd.isHeuristic = true;
if (nd.isAllocable) {
nd.rnaItr = rnAllocableList.insert(rnAllocableList.end(), nItr);
} else {
nd.rnuItr = rnUnallocableList.insert(rnUnallocableList.end(), nItr);
}
}
/// \brief Heuristically reduce one of the nodes in the heuristic
/// reduce list.
/// @return True if a reduction takes place, false if the heuristic reduce
/// list is empty.
///
/// If the list of allocable nodes is non-empty a node is selected
/// from it and pushed to the stack. Otherwise if the non-allocable list
/// is non-empty a node is selected from it and pushed to the stack.
/// If both lists are empty the method simply returns false with no action
/// taken.
bool heuristicReduce() {
if (!rnAllocableList.empty()) {
RNAllocableListItr rnaItr =
min_element(rnAllocableList.begin(), rnAllocableList.end(),
LinkDegreeComparator(getSolver()));
Graph::NodeItr nItr = *rnaItr;
rnAllocableList.erase(rnaItr);
handleRemoveNode(nItr);
getSolver().pushToStack(nItr);
return true;
} else if (!rnUnallocableList.empty()) {
RNUnallocableListItr rnuItr =
min_element(rnUnallocableList.begin(), rnUnallocableList.end(),
SpillCostComparator(getSolver()));
Graph::NodeItr nItr = *rnuItr;
rnUnallocableList.erase(rnuItr);
handleRemoveNode(nItr);
getSolver().pushToStack(nItr);
return true;
}
// else
return false;
}
/// \brief Prepare a change in the costs on the given edge.
/// @param eItr Edge iterator.
void preUpdateEdgeCosts(Graph::EdgeItr eItr) {
Graph &g = getGraph();
Graph::NodeItr n1Itr = g.getEdgeNode1(eItr),
n2Itr = g.getEdgeNode2(eItr);
NodeData &n1 = getHeuristicNodeData(n1Itr),
&n2 = getHeuristicNodeData(n2Itr);
if (n1.isHeuristic)
subtractEdgeContributions(eItr, getGraph().getEdgeNode1(eItr));
if (n2.isHeuristic)
subtractEdgeContributions(eItr, getGraph().getEdgeNode2(eItr));
EdgeData &ed = getHeuristicEdgeData(eItr);
ed.isUpToDate = false;
}
/// \brief Handle the change in the costs on the given edge.
/// @param eItr Edge iterator.
void postUpdateEdgeCosts(Graph::EdgeItr eItr) {
// This is effectively the same as adding a new edge now, since
// we've factored out the costs of the old one.
handleAddEdge(eItr);
}
/// \brief Handle the addition of a new edge into the PBQP graph.
/// @param eItr Edge iterator for the added edge.
///
/// Updates allocability of any nodes connected by this edge which are
/// being managed by the heuristic. If allocability changes they are
/// moved to the appropriate list.
void handleAddEdge(Graph::EdgeItr eItr) {
Graph &g = getGraph();
Graph::NodeItr n1Itr = g.getEdgeNode1(eItr),
n2Itr = g.getEdgeNode2(eItr);
NodeData &n1 = getHeuristicNodeData(n1Itr),
&n2 = getHeuristicNodeData(n2Itr);
// If neither node is managed by the heuristic there's nothing to be
// done.
if (!n1.isHeuristic && !n2.isHeuristic)
return;
// Ok - we need to update at least one node.
computeEdgeContributions(eItr);
// Update node 1 if it's managed by the heuristic.
if (n1.isHeuristic) {
bool n1WasAllocable = n1.isAllocable;
addEdgeContributions(eItr, n1Itr);
updateAllocability(n1Itr);
if (n1WasAllocable && !n1.isAllocable) {
rnAllocableList.erase(n1.rnaItr);
n1.rnuItr =
rnUnallocableList.insert(rnUnallocableList.end(), n1Itr);
}
}
// Likewise for node 2.
if (n2.isHeuristic) {
bool n2WasAllocable = n2.isAllocable;
addEdgeContributions(eItr, n2Itr);
updateAllocability(n2Itr);
if (n2WasAllocable && !n2.isAllocable) {
rnAllocableList.erase(n2.rnaItr);
n2.rnuItr =
rnUnallocableList.insert(rnUnallocableList.end(), n2Itr);
}
}
}
/// \brief Handle disconnection of an edge from a node.
/// @param eItr Edge iterator for edge being disconnected.
/// @param nItr Node iterator for the node being disconnected from.
///
/// Updates allocability of the given node and, if appropriate, moves the
/// node to a new list.
void handleRemoveEdge(Graph::EdgeItr eItr, Graph::NodeItr nItr) {
NodeData &nd = getHeuristicNodeData(nItr);
// If the node is not managed by the heuristic there's nothing to be
// done.
if (!nd.isHeuristic)
return;
EdgeData &ed ATTRIBUTE_UNUSED = getHeuristicEdgeData(eItr);
assert(ed.isUpToDate && "Edge data is not up to date.");
// Update node.
bool ndWasAllocable = nd.isAllocable;
subtractEdgeContributions(eItr, nItr);
updateAllocability(nItr);
// If the node has gone optimal...
if (shouldOptimallyReduce(nItr)) {
nd.isHeuristic = false;
addToOptimalReduceList(nItr);
if (ndWasAllocable) {
rnAllocableList.erase(nd.rnaItr);
} else {
rnUnallocableList.erase(nd.rnuItr);
}
} else {
// Node didn't go optimal, but we might have to move it
// from "unallocable" to "allocable".
if (!ndWasAllocable && nd.isAllocable) {
rnUnallocableList.erase(nd.rnuItr);
nd.rnaItr = rnAllocableList.insert(rnAllocableList.end(), nItr);
}
}
}
private:
NodeData& getHeuristicNodeData(Graph::NodeItr nItr) {
return getSolver().getHeuristicNodeData(nItr);
}
EdgeData& getHeuristicEdgeData(Graph::EdgeItr eItr) {
return getSolver().getHeuristicEdgeData(eItr);
}
// Work out what this edge will contribute to the allocability of the
// nodes connected to it.
void computeEdgeContributions(Graph::EdgeItr eItr) {
EdgeData &ed = getHeuristicEdgeData(eItr);
if (ed.isUpToDate)
return; // Edge data is already up to date.
Matrix &eCosts = getGraph().getEdgeCosts(eItr);
unsigned numRegs = eCosts.getRows() - 1,
numReverseRegs = eCosts.getCols() - 1;
std::vector<unsigned> rowInfCounts(numRegs, 0),
colInfCounts(numReverseRegs, 0);
ed.worst = 0;
ed.reverseWorst = 0;
ed.unsafe.clear();
ed.unsafe.resize(numRegs, 0);
ed.reverseUnsafe.clear();
ed.reverseUnsafe.resize(numReverseRegs, 0);
for (unsigned i = 0; i < numRegs; ++i) {
for (unsigned j = 0; j < numReverseRegs; ++j) {
if (eCosts[i + 1][j + 1] ==
std::numeric_limits<PBQPNum>::infinity()) {
ed.unsafe[i] = 1;
ed.reverseUnsafe[j] = 1;
++rowInfCounts[i];
++colInfCounts[j];
if (colInfCounts[j] > ed.worst) {
ed.worst = colInfCounts[j];
}
if (rowInfCounts[i] > ed.reverseWorst) {
ed.reverseWorst = rowInfCounts[i];
}
}
}
}
ed.isUpToDate = true;
}
// Add the contributions of the given edge to the given node's
// numDenied and safe members. No action is taken other than to update
// these member values. Once updated these numbers can be used by clients
// to update the node's allocability.
void addEdgeContributions(Graph::EdgeItr eItr, Graph::NodeItr nItr) {
EdgeData &ed = getHeuristicEdgeData(eItr);
assert(ed.isUpToDate && "Using out-of-date edge numbers.");
NodeData &nd = getHeuristicNodeData(nItr);
unsigned numRegs = getGraph().getNodeCosts(nItr).getLength() - 1;
bool nIsNode1 = nItr == getGraph().getEdgeNode1(eItr);
EdgeData::UnsafeArray &unsafe =
nIsNode1 ? ed.unsafe : ed.reverseUnsafe;
nd.numDenied += nIsNode1 ? ed.worst : ed.reverseWorst;
for (unsigned r = 0; r < numRegs; ++r) {
if (unsafe[r]) {
if (nd.unsafeDegrees[r]==0) {
--nd.numSafe;
}
++nd.unsafeDegrees[r];
}
}
}
// Subtract the contributions of the given edge to the given node's
// numDenied and safe members. No action is taken other than to update
// these member values. Once updated these numbers can be used by clients
// to update the node's allocability.
void subtractEdgeContributions(Graph::EdgeItr eItr, Graph::NodeItr nItr) {
EdgeData &ed = getHeuristicEdgeData(eItr);
assert(ed.isUpToDate && "Using out-of-date edge numbers.");
NodeData &nd = getHeuristicNodeData(nItr);
unsigned numRegs = getGraph().getNodeCosts(nItr).getLength() - 1;
bool nIsNode1 = nItr == getGraph().getEdgeNode1(eItr);
EdgeData::UnsafeArray &unsafe =
nIsNode1 ? ed.unsafe : ed.reverseUnsafe;
nd.numDenied -= nIsNode1 ? ed.worst : ed.reverseWorst;
for (unsigned r = 0; r < numRegs; ++r) {
if (unsafe[r]) {
if (nd.unsafeDegrees[r] == 1) {
++nd.numSafe;
}
--nd.unsafeDegrees[r];
}
}
}
void updateAllocability(Graph::NodeItr nItr) {
NodeData &nd = getHeuristicNodeData(nItr);
unsigned numRegs = getGraph().getNodeCosts(nItr).getLength() - 1;
nd.isAllocable = nd.numDenied < numRegs || nd.numSafe > 0;
}
void initializeNode(Graph::NodeItr nItr) {
NodeData &nd = getHeuristicNodeData(nItr);
if (nd.isInitialized)
return; // Node data is already up to date.
unsigned numRegs = getGraph().getNodeCosts(nItr).getLength() - 1;
nd.numDenied = 0;
nd.numSafe = numRegs;
nd.unsafeDegrees.resize(numRegs, 0);
typedef HeuristicSolverImpl<Briggs>::SolverEdgeItr SolverEdgeItr;
for (SolverEdgeItr aeItr = getSolver().solverEdgesBegin(nItr),
aeEnd = getSolver().solverEdgesEnd(nItr);
aeItr != aeEnd; ++aeItr) {
Graph::EdgeItr eItr = *aeItr;
computeEdgeContributions(eItr);
addEdgeContributions(eItr, nItr);
}
updateAllocability(nItr);
nd.isInitialized = true;
}
void handleRemoveNode(Graph::NodeItr xnItr) {
typedef HeuristicSolverImpl<Briggs>::SolverEdgeItr SolverEdgeItr;
std::vector<Graph::EdgeItr> edgesToRemove;
for (SolverEdgeItr aeItr = getSolver().solverEdgesBegin(xnItr),
aeEnd = getSolver().solverEdgesEnd(xnItr);
aeItr != aeEnd; ++aeItr) {
Graph::NodeItr ynItr = getGraph().getEdgeOtherNode(*aeItr, xnItr);
handleRemoveEdge(*aeItr, ynItr);
edgesToRemove.push_back(*aeItr);
}
while (!edgesToRemove.empty()) {
getSolver().removeSolverEdge(edgesToRemove.back());
edgesToRemove.pop_back();
}
}
RNAllocableList rnAllocableList;
RNUnallocableList rnUnallocableList;
};
}
}
#endif // LLVM_CODEGEN_PBQP_HEURISTICS_BRIGGS_H