doc/gwrappers.dox
author deba
Fri, 04 Mar 2005 17:12:36 +0000
changeset 1189 9203a299ce4e
parent 1164 80bb73097736
child 1252 4fee8e9d9014
permissions -rw-r--r--
Bug fix
     1 /**
     2    @defgroup gwrappers Wrapper Classes for Graphs
     3    \brief This group contains several wrapper classes for graphs
     4    @ingroup graphs
     5    
     6    The main parts of LEMON are the different graph structures, 
     7    generic graph algorithms, graph concepts which couple these, and 
     8    graph wrappers. While the previous ones are more or less clear, the 
     9    latter notion needs further explanation.
    10    Graph wrappers are graph classes which serve for considering graph 
    11    structures in different ways. A short example makes the notion much 
    12    clearer. 
    13    Suppose that we have an instance \c g of a directed graph
    14    type say \c ListGraph and an algorithm 
    15    \code template<typename Graph> int algorithm(const Graph&); \endcode 
    16    is needed to run on the reversely oriented graph. 
    17    It may be expensive (in time or in memory usage) to copy 
    18    \c g with the reverse orientation. 
    19    Thus, a wrapper class
    20    \code template<typename Graph> class RevGraphWrapper; \endcode is used. 
    21    The code looks as follows
    22    \code
    23    ListGraph g;
    24    RevGraphWrapper<ListGraph> rgw(g);
    25    int result=algorithm(rgw);
    26    \endcode
    27    After running the algorithm, the original graph \c g 
    28    remains untouched. Thus the graph wrapper used above is to consider the 
    29    original graph with reverse orientation. 
    30    This techniques gives rise to an elegant code, and 
    31    based on stable graph wrappers, complex algorithms can be 
    32    implemented easily. 
    33    In flow, circulation and bipartite matching problems, the residual 
    34    graph is of particular importance. Combining a wrapper implementing 
    35    this, shortest path algorithms and minimum mean cycle algorithms, 
    36    a range of weighted and cardinality optimization algorithms can be 
    37    obtained. For lack of space, for other examples, 
    38    the interested user is referred to the detailed documentation of graph 
    39    wrappers. 
    40    The behavior of graph wrappers can be very different. Some of them keep 
    41    capabilities of the original graph while in other cases this would be 
    42    meaningless. This means that the concepts that they are a model of depend 
    43    on the graph wrapper, and the wrapped graph(s). 
    44    If an edge of \c rgw is deleted, this is carried out by 
    45    deleting the corresponding edge of \c g. But for a residual 
    46    graph, this operation has no sense. 
    47    Let we stand one more example here to simplify your work. 
    48    wrapper class
    49    \code template<typename Graph> class RevGraphWrapper; \endcode 
    50    has constructor 
    51    <tt> RevGraphWrapper(Graph& _g)</tt>. 
    52    This means that in a situation, 
    53    when a <tt> const ListGraph& </tt> reference to a graph is given, 
    54    then it have to be instantiated with <tt>Graph=const ListGraph</tt>.
    55    \code
    56    int algorithm1(const ListGraph& g) {
    57    RevGraphWrapper<const ListGraph> rgw(g);
    58    return algorithm2(rgw);
    59    }
    60    \endcode
    61 */