// (C) Copyright Andrew Sutton 2007
//
// Use, modification and distribution are subject to the
// Boost Software License, Version 1.0 (See accompanying file
// LICENSE_1_0.txt or http://www.boost.org/LICENSE_1_0.txt)
#ifndef BOOST_GRAPH_GEODESIC_DISTANCE_HPP
#define BOOST_GRAPH_GEODESIC_DISTANCE_HPP
#include <boost/graph/detail/geodesic.hpp>
#include <boost/graph/exterior_property.hpp>
#include <boost/concept/assert.hpp>
namespace boost
{
template <typename Graph,
typename DistanceType,
typename ResultType,
typename Divides = std::divides<ResultType> >
struct mean_geodesic_measure
: public geodesic_measure<Graph, DistanceType, ResultType>
{
typedef geodesic_measure<Graph, DistanceType, ResultType> base_type;
typedef typename base_type::distance_type distance_type;
typedef typename base_type::result_type result_type;
result_type operator ()(distance_type d, const Graph& g)
{
BOOST_CONCEPT_ASSERT(( VertexListGraphConcept<Graph> ));
BOOST_CONCEPT_ASSERT(( NumericValueConcept<DistanceType> ));
BOOST_CONCEPT_ASSERT(( NumericValueConcept<ResultType> ));
BOOST_CONCEPT_ASSERT(( AdaptableBinaryFunctionConcept<Divides,ResultType,ResultType,ResultType> ));
return (d == base_type::infinite_distance())
? base_type::infinite_result()
: div(result_type(d), result_type(num_vertices(g) - 1));
}
Divides div;
};
template <typename Graph, typename DistanceMap>
inline mean_geodesic_measure<Graph, typename property_traits<DistanceMap>::value_type, double>
measure_mean_geodesic(const Graph&, DistanceMap)
{
return mean_geodesic_measure<Graph, typename property_traits<DistanceMap>::value_type, double>();
}
template <typename T, typename Graph, typename DistanceMap>
inline mean_geodesic_measure<Graph, typename property_traits<DistanceMap>::value_type, T>
measure_mean_geodesic(const Graph&, DistanceMap)
{
return mean_geodesic_measure<Graph, typename property_traits<DistanceMap>::value_type, T>();
}
// This is a little different because it's expected that the result type
// should (must?) be the same as the distance type. There's a type of
// transitivity in this thinking... If the average of distances has type
// X then the average of x's should also be type X. Is there a case where this
// is not true?
//
// This type is a little under-genericized... It needs generic parameters
// for addition and division.
template <typename Graph, typename DistanceType>
struct mean_graph_distance_measure
: public geodesic_measure<Graph, DistanceType, DistanceType>
{
typedef geodesic_measure<Graph, DistanceType, DistanceType> base_type;
typedef typename base_type::distance_type distance_type;
typedef typename base_type::result_type result_type;
inline result_type operator ()(distance_type d, const Graph& g)
{
BOOST_CONCEPT_ASSERT(( VertexListGraphConcept<Graph> ));
BOOST_CONCEPT_ASSERT(( NumericValueConcept<DistanceType> ));
if(d == base_type::infinite_distance()) {
return base_type::infinite_result();
}
else {
return d / result_type(num_vertices(g));
}
}
};
template <typename Graph, typename DistanceMap>
inline mean_graph_distance_measure<Graph, typename property_traits<DistanceMap>::value_type>
measure_graph_mean_geodesic(const Graph&, DistanceMap)
{
typedef typename property_traits<DistanceMap>::value_type T;
return mean_graph_distance_measure<Graph, T>();
}
template <typename Graph,
typename DistanceMap,
typename Measure,
typename Combinator>
inline typename Measure::result_type
mean_geodesic(const Graph& g,
DistanceMap dist,
Measure measure,
Combinator combine)
{
BOOST_CONCEPT_ASSERT(( DistanceMeasureConcept<Measure,Graph> ));
typedef typename Measure::distance_type Distance;
Distance n = detail::combine_distances(g, dist, combine, Distance(0));
return measure(n, g);
}
template <typename Graph,
typename DistanceMap,
typename Measure>
inline typename Measure::result_type
mean_geodesic(const Graph& g, DistanceMap dist, Measure measure)
{
BOOST_CONCEPT_ASSERT(( DistanceMeasureConcept<Measure,Graph> ));
typedef typename Measure::distance_type Distance;
return mean_geodesic(g, dist, measure, std::plus<Distance>());
}
template <typename Graph, typename DistanceMap>
inline double
mean_geodesic(const Graph& g, DistanceMap dist)
{ return mean_geodesic(g, dist, measure_mean_geodesic(g, dist)); }
template <typename T, typename Graph, typename DistanceMap>
inline T
mean_geodesic(const Graph& g, DistanceMap dist)
{ return mean_geodesic(g, dist, measure_mean_geodesic<T>(g, dist)); }
template <typename Graph,
typename DistanceMatrixMap,
typename GeodesicMap,
typename Measure>
inline typename property_traits<GeodesicMap>::value_type
all_mean_geodesics(const Graph& g,
DistanceMatrixMap dist,
GeodesicMap geo,
Measure measure)
{
BOOST_CONCEPT_ASSERT(( VertexListGraphConcept<Graph> ));
typedef typename graph_traits<Graph>::vertex_descriptor Vertex;
typedef typename graph_traits<Graph>::vertex_iterator VertexIterator;
BOOST_CONCEPT_ASSERT(( ReadablePropertyMapConcept<DistanceMatrixMap,Vertex> ));
typedef typename property_traits<DistanceMatrixMap>::value_type DistanceMap;
BOOST_CONCEPT_ASSERT(( DistanceMeasureConcept<Measure,Graph> ));
typedef typename Measure::result_type Result;
BOOST_CONCEPT_ASSERT(( WritablePropertyMapConcept<GeodesicMap,Vertex> ));
BOOST_CONCEPT_ASSERT(( NumericValueConcept<Result> ));
// NOTE: We could compute the mean geodesic here by performing additional
// computations (i.e., adding and dividing). However, I don't really feel
// like fully genericizing the entire operation yet so I'm not going to.
Result inf = numeric_values<Result>::infinity();
Result sum = numeric_values<Result>::zero();
VertexIterator i, end;
for(boost::tie(i, end) = vertices(g); i != end; ++i) {
DistanceMap dm = get(dist, *i);
Result r = mean_geodesic(g, dm, measure);
put(geo, *i, r);
// compute the sum along with geodesics
if(r == inf) {
sum = inf;
}
else if(sum != inf) {
sum += r;
}
}
// return the average of averages.
return sum / Result(num_vertices(g));
}
template <typename Graph, typename DistanceMatrixMap, typename GeodesicMap>
inline typename property_traits<GeodesicMap>::value_type
all_mean_geodesics(const Graph& g, DistanceMatrixMap dist, GeodesicMap geo)
{
BOOST_CONCEPT_ASSERT(( GraphConcept<Graph> ));
typedef typename graph_traits<Graph>::vertex_descriptor Vertex;
BOOST_CONCEPT_ASSERT(( ReadablePropertyMapConcept<DistanceMatrixMap,Vertex> ));
typedef typename property_traits<DistanceMatrixMap>::value_type DistanceMap;
BOOST_CONCEPT_ASSERT(( WritablePropertyMapConcept<GeodesicMap,Vertex> ));
typedef typename property_traits<GeodesicMap>::value_type Result;
return all_mean_geodesics(g, dist, geo, measure_mean_geodesic<Result>(g, DistanceMap()));
}
template <typename Graph, typename GeodesicMap, typename Measure>
inline typename Measure::result_type
small_world_distance(const Graph& g, GeodesicMap geo, Measure measure)
{
BOOST_CONCEPT_ASSERT(( DistanceMeasureConcept<Measure,Graph> ));
typedef typename Measure::result_type Result;
Result sum = detail::combine_distances(g, geo, std::plus<Result>(), Result(0));
return measure(sum, g);
}
template <typename Graph, typename GeodesicMap>
inline typename property_traits<GeodesicMap>::value_type
small_world_distance(const Graph& g, GeodesicMap geo)
{ return small_world_distance(g, geo, measure_graph_mean_geodesic(g, geo)); }
}
#endif