relaxed_heap.hpp
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HPP
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// Copyright 2004 The Trustees of Indiana University.
// Use, modification and distribution is subject to the Boost Software
// License, Version 1.0. (See accompanying file LICENSE_1_0.txt or copy at
// http://www.boost.org/LICENSE_1_0.txt)
// Authors: Douglas Gregor
// Andrew Lumsdaine
#ifndef BOOST_RELAXED_HEAP_HEADER
#define BOOST_RELAXED_HEAP_HEADER
#include <functional>
#include <boost/property_map.hpp>
#include <boost/optional.hpp>
#include <vector>
#ifdef BOOST_RELAXED_HEAP_DEBUG
# include <iostream>
#endif // BOOST_RELAXED_HEAP_DEBUG
#if defined(BOOST_MSVC)
# pragma warning(push)
# pragma warning(disable:4355) // complaint about using 'this' to
#endif // initialize a member
namespace boost {
template<typename IndexedType,
typename Compare = std::less<IndexedType>,
typename ID = identity_property_map>
class relaxed_heap
{
struct group;
typedef relaxed_heap self_type;
typedef std::size_t rank_type;
public:
typedef IndexedType value_type;
typedef rank_type size_type;
private:
/**
* The kind of key that a group has. The actual values are discussed
* in-depth in the documentation of the @c kind field of the @c group
* structure. Note that the order of the enumerators *IS* important
* and must not be changed.
*/
enum group_key_kind { smallest_key, stored_key, largest_key };
struct group {
explicit group(group_key_kind kind = largest_key)
: kind(kind), parent(this), rank(0) { }
/** The value associated with this group. This value is only valid
* when @c kind!=largest_key (which indicates a deleted
* element). Note that the use of boost::optional increases the
* memory requirements slightly but does not result in extraneous
* memory allocations or deallocations. The optional could be
* eliminated when @c value_type is a model of
* DefaultConstructible.
*/
::boost::optional<value_type> value;
/**
* The kind of key stored at this group. This may be @c
* smallest_key, which indicates that the key is infinitely small;
* @c largest_key, which indicates that the key is infinitely
* large; or @c stored_key, which means that the key is unknown,
* but its relationship to other keys can be determined via the
* comparison function object.
*/
group_key_kind kind;
/// The parent of this group. Will only be NULL for the dummy root group
group* parent;
/// The rank of this group. Equivalent to the number of children in
/// the group.
rank_type rank;
/** The children of this group. For the dummy root group, these are
* the roots. This is an array of length log n containing pointers
* to the child groups.
*/
group** children;
};
size_type log_base_2(size_type n) // log2 is a macro on some platforms
{
size_type leading_zeroes = 0;
do {
size_type next = n << 1;
if (n == (next >> 1)) {
++leading_zeroes;
n = next;
} else {
break;
}
} while (true);
return sizeof(size_type) * CHAR_BIT - leading_zeroes - 1;
}
public:
relaxed_heap(size_type n, const Compare& compare = Compare(),
const ID& id = ID())
: compare(compare), id(id), root(smallest_key), groups(n),
smallest_value(0)
{
if (n == 0) {
root.children = new group*[1];
return;
}
log_n = log_base_2(n);
if (log_n == 0) log_n = 1;
size_type g = n / log_n;
if (n % log_n > 0) ++g;
size_type log_g = log_base_2(g);
size_type r = log_g;
// Reserve an appropriate amount of space for data structures, so
// that we do not need to expand them.
index_to_group.resize(g);
A.resize(r + 1, 0);
root.rank = r + 1;
root.children = new group*[(log_g + 1) * (g + 1)];
for (rank_type i = 0; i < r+1; ++i) root.children[i] = 0;
// Build initial heap
size_type idx = 0;
while (idx < g) {
root.children[r] = &index_to_group[idx];
idx = build_tree(root, idx, r, log_g + 1);
if (idx != g)
r = static_cast<size_type>(log_base_2(g-idx));
}
}
~relaxed_heap() { delete [] root.children; }
void push(const value_type& x)
{
groups[get(id, x)] = x;
update(x);
}
void update(const value_type& x)
{
group* a = &index_to_group[get(id, x) / log_n];
if (!a->value
|| *a->value == x
|| compare(x, *a->value)) {
if (a != smallest_value) smallest_value = 0;
a->kind = stored_key;
a->value = x;
promote(a);
}
}
void remove(const value_type& x)
{
group* a = &index_to_group[get(id, x) / log_n];
assert(groups[get(id, x)] != 0);
a->value = x;
a->kind = smallest_key;
promote(a);
smallest_value = a;
pop();
}
value_type& top()
{
find_smallest();
assert(smallest_value->value != 0);
return *smallest_value->value;
}
const value_type& top() const
{
find_smallest();
assert(smallest_value->value != 0);
return *smallest_value->value;
}
bool empty() const
{
find_smallest();
return !smallest_value || (smallest_value->kind == largest_key);
}
bool contains(const value_type& x) const { return groups[get(id, x)]; }
void pop()
{
// Fill in smallest_value. This is the group x.
find_smallest();
group* x = smallest_value;
smallest_value = 0;
// Make x a leaf, giving it the smallest value within its group
rank_type r = x->rank;
group* p = x->parent;
{
assert(x->value != 0);
// Find x's group
size_type start = get(id, *x->value) - get(id, *x->value) % log_n;
size_type end = start + log_n;
if (end > groups.size()) end = groups.size();
// Remove the smallest value from the group, and find the new
// smallest value.
groups[get(id, *x->value)].reset();
x->value.reset();
x->kind = largest_key;
for (size_type i = start; i < end; ++i) {
if (groups[i] && (!x->value || compare(*groups[i], *x->value))) {
x->kind = stored_key;
x->value = groups[i];
}
}
}
x->rank = 0;
// Combine prior children of x with x
group* y = x;
for (size_type c = 0; c < r; ++c) {
group* child = x->children[c];
if (A[c] == child) A[c] = 0;
y = combine(y, child);
}
// If we got back something other than x, let y take x's place
if (y != x) {
y->parent = p;
p->children[r] = y;
assert(r == y->rank);
if (A[y->rank] == x)
A[y->rank] = do_compare(y, p)? y : 0;
}
}
#ifdef BOOST_RELAXED_HEAP_DEBUG
/*************************************************************************
* Debugging support *
*************************************************************************/
void dump_tree() { dump_tree(std::cout); }
void dump_tree(std::ostream& out) { dump_tree(out, &root); }
void dump_tree(std::ostream& out, group* p, bool in_progress = false)
{
if (!in_progress) {
out << "digraph heap {\n"
<< " edge[dir=\"back\"];\n";
}
size_type p_index = 0;
if (p != &root) while (&index_to_group[p_index] != p) ++p_index;
for (size_type i = 0; i < p->rank; ++i) {
group* c = p->children[i];
if (c) {
size_type c_index = 0;
if (c != &root) while (&index_to_group[c_index] != c) ++c_index;
out << " ";
if (p == &root) out << 'p'; else out << p_index;
out << " -> ";
if (c == &root) out << 'p'; else out << c_index;
if (A[c->rank] == c) out << " [style=\"dotted\"]";
out << ";\n";
dump_tree(out, c, true);
// Emit node information
out << " ";
if (c == &root) out << 'p'; else out << c_index;
out << " [label=\"";
if (c == &root) out << 'p'; else out << c_index;
out << ":";
size_type start = c_index * log_n;
size_type end = start + log_n;
if (end > groups.size()) end = groups.size();
while (start != end) {
if (groups[start]) {
out << " " << get(id, *groups[start]);
if (*groups[start] == *c->value) out << "(*)";
}
++start;
}
out << '"';
if (do_compare(c, p)) {
out << " ";
if (c == &root) out << 'p'; else out << c_index;
out << ", style=\"filled\", fillcolor=\"gray\"";
}
out << "];\n";
} else {
assert(p->parent == p);
}
}
if (!in_progress) out << "}\n";
}
bool valid()
{
// Check that the ranks in the A array match the ranks of the
// groups stored there. Also, the active groups must be the last
// child of their parent.
for (size_type r = 0; r < A.size(); ++r) {
if (A[r] && A[r]->rank != r) return false;
if (A[r] && A[r]->parent->children[A[r]->parent->rank-1] != A[r])
return false;
}
// The root must have no value and a key of -Infinity
if (root.kind != smallest_key) return false;
return valid(&root);
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