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llvm-mirror/lib/CodeGen/PBQP/HeuristicBase.h
Lang Hames 91856859d6 New PBQP solver.
* Fixed a reduction bug which occasionally led to infinite-cost (invalid)
  register allocation solutions despite the existence finite-cost solutions.
* Significantly reduced memory usage (>50% reduction).
* Simplified a lot of the solver code.

llvm-svn: 94514
2010-01-26 04:49:58 +00:00

243 lines
9.2 KiB
C++

//===-- HeuristcBase.h --- Heuristic base class for PBQP --------*- C++ -*-===//
//
// The LLVM Compiler Infrastructure
//
// This file is distributed under the University of Illinois Open Source
// License. See LICENSE.TXT for details.
//
//===----------------------------------------------------------------------===//
#ifndef LLVM_CODEGEN_PBQP_HEURISTICBASE_H
#define LLVM_CODEGEN_PBQP_HEURISTICBASE_H
#include "HeuristicSolver.h"
namespace PBQP {
/// \brief Abstract base class for heuristic implementations.
///
/// This class provides a handy base for heuristic implementations with common
/// solver behaviour implemented for a number of methods.
///
/// To implement your own heuristic using this class as a base you'll have to
/// implement, as a minimum, the following methods:
/// <ul>
/// <li> void addToHeuristicList(Graph::NodeItr) : Add a node to the
/// heuristic reduction list.
/// <li> void heuristicReduce() : Perform a single heuristic reduction.
/// <li> void preUpdateEdgeCosts(Graph::EdgeItr) : Handle the (imminent)
/// change to the cost matrix on the given edge (by R2).
/// <li> void postUpdateEdgeCostts(Graph::EdgeItr) : Handle the new
/// costs on the given edge.
/// <li> void handleAddEdge(Graph::EdgeItr) : Handle the addition of a new
/// edge into the PBQP graph (by R2).
/// <li> void handleRemoveEdge(Graph::EdgeItr, Graph::NodeItr) : Handle the
/// disconnection of the given edge from the given node.
/// <li> A constructor for your derived class : to pass back a reference to
/// the solver which is using this heuristic.
/// </ul>
///
/// These methods are implemented in this class for documentation purposes,
/// but will assert if called.
///
/// Note that this class uses the curiously recursive template idiom to
/// forward calls to the derived class. These methods need not be made
/// virtual, and indeed probably shouldn't for performance reasons.
///
/// You'll also need to provide NodeData and EdgeData structs in your class.
/// These can be used to attach data relevant to your heuristic to each
/// node/edge in the PBQP graph.
template <typename HImpl>
class HeuristicBase {
private:
typedef std::list<Graph::NodeItr> OptimalList;
HeuristicSolverImpl<HImpl> &s;
Graph &g;
OptimalList optimalList;
// Return a reference to the derived heuristic.
HImpl& impl() { return static_cast<HImpl&>(*this); }
// Add the given node to the optimal reductions list. Keep an iterator to
// its location for fast removal.
void addToOptimalReductionList(Graph::NodeItr nItr) {
optimalList.insert(optimalList.end(), nItr);
}
public:
/// \brief Construct an instance with a reference to the given solver.
/// @param solver The solver which is using this heuristic instance.
HeuristicBase(HeuristicSolverImpl<HImpl> &solver)
: s(solver), g(s.getGraph()) { }
/// \brief Get the solver which is using this heuristic instance.
/// @return The solver which is using this heuristic instance.
///
/// You can use this method to get access to the solver in your derived
/// heuristic implementation.
HeuristicSolverImpl<HImpl>& getSolver() { return s; }
/// \brief Get the graph representing the problem to be solved.
/// @return The graph representing the problem to be solved.
Graph& getGraph() { return g; }
/// \brief Tell the solver to simplify the graph before the reduction phase.
/// @return Whether or not the solver should run a simplification phase
/// prior to the main setup and reduction.
///
/// HeuristicBase returns true from this method as it's a sensible default,
/// however you can over-ride it in your derived class if you want different
/// behaviour.
bool solverRunSimplify() const { return true; }
/// \brief Decide whether a node should be optimally or heuristically
/// reduced.
/// @return Whether or not the given node should be listed for optimal
/// reduction (via R0, R1 or R2).
///
/// HeuristicBase returns true for any node with degree less than 3. This is
/// sane and sensible for many situations, but not all. You can over-ride
/// this method in your derived class if you want a different selection
/// criteria. Note however that your criteria for selecting optimal nodes
/// should be <i>at least</i> as strong as this. I.e. Nodes of degree 3 or
/// higher should not be selected under any circumstances.
bool shouldOptimallyReduce(Graph::NodeItr nItr) {
if (g.getNodeDegree(nItr) < 3)
return true;
// else
return false;
}
/// \brief Add the given node to the list of nodes to be optimally reduced.
/// @return nItr Node iterator to be added.
///
/// You probably don't want to over-ride this, except perhaps to record
/// statistics before calling this implementation. HeuristicBase relies on
/// its behaviour.
void addToOptimalReduceList(Graph::NodeItr nItr) {
optimalList.push_back(nItr);
}
/// \brief Initialise the heuristic.
///
/// HeuristicBase iterates over all nodes in the problem and adds them to
/// the appropriate list using addToOptimalReduceList or
/// addToHeuristicReduceList based on the result of shouldOptimallyReduce.
///
/// This behaviour should be fine for most situations.
void setup() {
for (Graph::NodeItr nItr = g.nodesBegin(), nEnd = g.nodesEnd();
nItr != nEnd; ++nItr) {
if (impl().shouldOptimallyReduce(nItr)) {
addToOptimalReduceList(nItr);
} else {
impl().addToHeuristicReduceList(nItr);
}
}
}
/// \brief Optimally reduce one of the nodes in the optimal reduce list.
/// @return True if a reduction takes place, false if the optimal reduce
/// list is empty.
///
/// Selects a node from the optimal reduce list and removes it, applying
/// R0, R1 or R2 as appropriate based on the selected node's degree.
bool optimalReduce() {
if (optimalList.empty())
return false;
Graph::NodeItr nItr = optimalList.front();
optimalList.pop_front();
switch (s.getSolverDegree(nItr)) {
case 0: s.applyR0(nItr); break;
case 1: s.applyR1(nItr); break;
case 2: s.applyR2(nItr); break;
default: assert(false &&
"Optimal reductions of degree > 2 nodes is invalid.");
}
return true;
}
/// \brief Perform the PBQP reduction process.
///
/// Reduces the problem to the empty graph by repeated application of the
/// reduction rules R0, R1, R2 and RN.
/// R0, R1 or R2 are always applied if possible before RN is used.
void reduce() {
bool finished = false;
while (!finished) {
if (!optimalReduce())
if (!impl().heuristicReduce())
finished = true;
}
}
/// \brief Add a node to the heuristic reduce list.
/// @param nItr Node iterator to add to the heuristic reduce list.
void addToHeuristicList(Graph::NodeItr nItr) {
assert(false && "Must be implemented in derived class.");
}
/// \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.
void heuristicReduce() {
assert(false && "Must be implemented in derived class.");
}
/// \brief Prepare a change in the costs on the given edge.
/// @param eItr Edge iterator.
void preUpdateEdgeCosts(Graph::EdgeItr eItr) {
assert(false && "Must be implemented in derived class.");
}
/// \brief Handle the change in the costs on the given edge.
/// @param eItr Edge iterator.
void postUpdateEdgeCostts(Graph::EdgeItr eItr) {
assert(false && "Must be implemented in derived class.");
}
/// \brief Handle the addition of a new edge into the PBQP graph.
/// @param eItr Edge iterator for the added edge.
void handleAddEdge(Graph::EdgeItr eItr) {
assert(false && "Must be implemented in derived class.");
}
/// \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.
///
/// Edges are frequently removed due to the removal of a node. This
/// method allows for the effect to be computed only for the remaining
/// node in the graph.
void handleRemoveEdge(Graph::EdgeItr eItr, Graph::NodeItr nItr) {
assert(false && "Must be implemented in derived class.");
}
/// \brief Clean up any structures used by HeuristicBase.
///
/// At present this just performs a sanity check: that the optimal reduce
/// list is empty now that reduction has completed.
///
/// If your derived class has more complex structures which need tearing
/// down you should over-ride this method but include a call back to this
/// implementation.
void cleanup() {
assert(optimalList.empty() && "Nodes left over in optimal reduce list?");
}
};
}
#endif // LLVM_CODEGEN_PBQP_HEURISTICBASE_H