图的邻接表存储实现:http://www.jb51.cc/article/p-nvwvgedf-bcb.html
图的邻接表DFS和BFS算法:http://www.jb51.cc/article/p-syijtjxb-bcb.html
这里则介绍图的另外一种存储方式:邻接矩阵。参考资料《大话数据结构》《C算法:卷二》
一、图的数据结构
图的邻接矩阵存储方式是用两个数据来表示。一个一维数组存储图中顶点信息,一个二维数组(称为邻接矩阵)存储图中的边的信息。
见下图:(图片来源于《大话数据结构》)
/*图的邻接矩阵存储*/
typedef int VertexType;
typedef int EdgeType;
#define MAXVEX 100
#define INFI 65535
typedef struct
{
VertexType vexs[MAXVEX]; /*顶点表*/
EdgeType matrix[MAXVEX][MAXVEX]; /*邻接矩阵*/
unsigned int numVertexes; /*顶点数*/
unsigned int numEdges; /*边数*/
}Graph;
二、创建一个图
/*创建一个邻接矩阵无向图*/
Graph* CreateGraph()
{
Graph *pGragh = new Graph;
if (NULL == pGragh)
return NULL;
cout << "输入顶点数和边数:" << endl;
cin >> pGragh->numVertexes >> pGragh->numEdges;
for (int i = 0; i < pGragh->numVertexes; ++i)/*建立顶点表*/
(pGragh->vexs)[i] = i;
for (int i = 0; i < pGragh->numVertexes; ++i)/*邻接矩阵初始化*/
{
for (int j = 0; j < pGragh->numVertexes; ++j)
{
(pGragh->matrix)[i][j] = INFI;
if (i == j)
(pGragh->matrix)[i][j] = 0;
}
}
for (int k = 0; k < pGragh->numEdges; ++k)
{
int i,j,w;
cout << "输入边(vi,vj)上的下标i,下标j和权重w:" << endl;
cin >> i >> j >> w;
(pGragh->matrix)[i][j] = w;
(pGragh->matrix)[j][i] = (pGragh->matrix)[i][j];//无向图是对称矩阵
}
return pGragh;
}
/*创建一个邻接矩阵有向图*/
Graph* CreateDiGraph()
{
Graph *pGragh = new Graph;
if (NULL == pGragh)
return NULL;
cout << "输入顶点数和边数:" << endl;
cin >> pGragh->numVertexes >> pGragh->numEdges;
for (int i = 0; i < pGragh->numVertexes; ++i)/*建立顶点表*/
(pGragh->vexs)[i] = i;
for (int i = 0; i < pGragh->numVertexes; ++i)/*邻接矩阵初始化*/
{
for (int j = 0; j < pGragh->numVertexes; ++j)
{
(pGragh->matrix)[i][j] = INFI;
if (i == j)
(pGragh->matrix)[i][j] = 0;
}
}
for (int k = 0; k < pGragh->numEdges; ++k)
{
int i,w;
cout << "输入边<vi,vj>上的下标i,下标j和权重w:" << endl;
cin >> i >> j >> w;
(pGragh->matrix)[i][j] = w;//清楚上面输入的顺序,有向边的开始点和终点
}
return pGragh;
}
三、检查图中两个顶点间是否有边
/*检查两个顶点之间是否有边
对于邻接矩阵存储图,这比较简单。其中有向图对输入顶点顺序有要求*/
bool GraphHasEdge(Graph *pGraph,unsigned int begin,unsigned int end)
{
if (NULL == pGraph || begin >= pGraph->numVertexes || end >= pGraph->numVertexes)
return false;
if (begin == end)
return false;
return ((pGraph->matrix)[begin][end] != INFI) ? true : false;
}
四、DFS
关于DFS与BFS的介绍见开篇链接
/*DFS*/
/*邻接矩阵的深度优先递归算法*/
void DFSUtil(Graph *pGraph,int start,bool visited[])
{
visited[start] = true;
cout << start << endl;
for (int j = 0; j < pGraph->numVertexes; ++j)
{
if ((pGraph->matrix)[start][j] != 0 && (pGraph->matrix)[start][j] != INFI && !visited[j])
DFSUtil(pGraph,visited);
}
}
/*邻接矩阵的深度优先搜索*/
void DFS(Graph *pGraph)
{
if (NULL == pGraph)
return;
bool *visited = new bool[pGraph->numVertexes];
memset(visited,false,pGraph->numVertexes);
for (int i = 0; i < pGraph->numVertexes; ++i)
{
if (!visited[i])
DFSUtil(pGraph,i,visited);
}
delete[] visited;
}
五、BFS
/*BFS*/
void BFS(Graph *pGraph)
{
if (NULL == pGraph)
return;
bool *visited = new bool[pGraph->numVertexes];
memset(visited,pGraph->numVertexes);
list<int> queue;//利用链表构造一个队列
for (int i = 0; i < pGraph->numVertexes; ++i)
{
if (!visited[i])
{
visited[i] = true;
cout << pGraph->vexs[i] << endl;
queue.push_back(i);
while (!queue.empty())
{
i = *queue.begin();
queue.pop_front();
for (int j = 0; j < pGraph->numVertexes; ++j)
{
if ((pGraph->matrix)[i][j] != 0 && (pGraph->matrix)[i][j] != INFI && !visited[j])
{
visited[j] = true;
cout << pGraph->vexs[j] << endl;
queue.push_back(j);
}
}
}
}
}
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