EdgeLookUp and AllEdgeLookUp tests added.
4 Here we discuss some advanced map techniques. Like writing your own maps or how to
5 extend/modify a maps functionality with adaptors.
7 \section custom_maps Writing Custom ReadMap
8 \subsection custom_read_maps Readable Maps
10 Readable maps are very frequently used as the input of an
11 algorithm. For this purpose the most straightforward way is the use of the
12 default maps provided by LEMON's graph structures.
13 Very often however, it is more
14 convenient and/or more efficient to write your own readable map.
16 You can find some examples below. In these examples \c Graph is the
17 type of the particular graph structure you use.
20 This simple map assigns \f$\pi\f$ to each edge.
26 typedef Graph::Edge Key;
27 double operator[](Key e) const { return M_PI;}
31 An alternative way to define maps is to use MapBase
34 struct MyMap : public MapBase<Graph::Edge,double>
36 Value operator[](Key e) const { return M_PI;}
40 Here is a bit more complex example.
41 It provides a length function obtained
42 from a base length function shifted by a potential difference.
45 class ReducedLengthMap : public MapBase<Graph::Edge,double>
48 const Graph::EdgeMap<double> &orig_len;
49 const Graph::NodeMap<double> &pot;
52 Value operator[](Key e) const {
53 return orig_len[e]-(pot[g.target(e)]-pot[g.source(e)]);
56 ReducedLengthMap(const Graph &_g,
57 const Graph::EdgeMap &_o,
58 const Graph::NodeMap &_p)
59 : g(_g), orig_len(_o), pot(_p) {};
63 Then, you can call e.g. Dijkstra algoritm on this map like this:
66 ReducedLengthMap rm(g,len,pot);
67 Dijkstra<Graph,ReducedLengthMap> dij(g,rm);