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4 changed files with 326 additions and 312 deletions
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@ -40,14 +40,11 @@ comments: true
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class GraphAdjMat:
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class GraphAdjMat:
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"""基于邻接矩阵实现的无向图类"""
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"""基于邻接矩阵实现的无向图类"""
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# 顶点列表,元素代表“顶点值”,索引代表“顶点索引”
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vertices: list[int] = []
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# 邻接矩阵,行列索引对应“顶点索引”
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adj_mat: list[list[int]] = []
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def __init__(self, vertices: list[int], edges: list[list[int]]):
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def __init__(self, vertices: list[int], edges: list[list[int]]):
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"""构造方法"""
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"""构造方法"""
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# 顶点列表,元素代表“顶点值”,索引代表“顶点索引”
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self.vertices: list[int] = []
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self.vertices: list[int] = []
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# 邻接矩阵,行列索引对应“顶点索引”
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self.adj_mat: list[list[int]] = []
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self.adj_mat: list[list[int]] = []
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# 添加顶点
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# 添加顶点
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for val in vertices:
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for val in vertices:
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@ -945,24 +942,72 @@ comments: true
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=== "C"
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=== "C"
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```c title="graph_adjacency_matrix.c"
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```c title="graph_adjacency_matrix.c"
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/* 基于邻接矩阵实现的无向图类结构 */
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/* 基于邻接矩阵实现的无向图结构体 */
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typedef struct {
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typedef struct {
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int *vertices; // 顶点列表
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int vertices[MAX_SIZE];
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int **adjMat; // 邻接矩阵,元素代表“边”,索引代表“顶点索引”
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int adjMat[MAX_SIZE][MAX_SIZE];
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int size; // 顶点数量
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int size;
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int capacity; // 图容量
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} GraphAdjMat;
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} GraphAdjMat;
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/* 构造函数 */
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GraphAdjMat *newGraphAdjMat() {
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GraphAdjMat *graph = (GraphAdjMat *)malloc(sizeof(GraphAdjMat));
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graph->size = 0;
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for (int i = 0; i < MAX_SIZE; i++) {
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for (int j = 0; j < MAX_SIZE; j++) {
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graph->adjMat[i][j] = 0;
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}
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}
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return graph;
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}
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/* 添加顶点 */
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void addVertex(GraphAdjMat *graph, int val) {
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if (graph->size == MAX_SIZE) {
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fprintf(stderr, "图的顶点数量已达最大值\n");
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return;
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}
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// 添加第 n 个顶点,并将第 n 行和列置零
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int n = graph->size;
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graph->vertices[n] = val;
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for (int i = 0; i <= n; i++) {
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graph->adjMat[n][i] = graph->adjMat[i][n] = 0;
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}
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graph->size++;
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}
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/* 删除顶点 */
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void removeVertex(GraphAdjMat *graph, int index) {
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if (index < 0 || index >= graph->size) {
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fprintf(stderr, "顶点索引越界\n");
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return;
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}
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// 在顶点列表中移除索引 index 的顶点
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for (int i = index; i < graph->size - 1; i++) {
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graph->vertices[i] = graph->vertices[i + 1];
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}
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// 在邻接矩阵中删除索引 index 的行
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for (int i = index; i < graph->size - 1; i++) {
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for (int j = 0; j < graph->size; j++) {
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graph->adjMat[i][j] = graph->adjMat[i + 1][j];
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}
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}
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// 在邻接矩阵中删除索引 index 的列
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for (int i = 0; i < graph->size; i++) {
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for (int j = index; j < graph->size - 1; j++) {
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graph->adjMat[i][j] = graph->adjMat[i][j + 1];
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}
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}
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graph->size--;
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}
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/* 添加边 */
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/* 添加边 */
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// 参数 i, j 对应 vertices 元素索引
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// 参数 i, j 对应 vertices 元素索引
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void addEdge(GraphAdjMat *graph, int i, int j) {
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void addEdge(GraphAdjMat *graph, int i, int j) {
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// 越界检查
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if (i < 0 || j < 0 || i >= graph->size || j >= graph->size || i == j) {
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if (i < 0 || j < 0 || i >= graph->size || j >= graph->size || i == j) {
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printf("Out of range in %s:%d\n", __FILE__, __LINE__);
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fprintf(stderr, "边索引越界或相等\n");
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exit(1);
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return;
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}
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}
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// 添加边
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// 参数 i, j 对应 vertices 元素索引
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graph->adjMat[i][j] = 1;
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graph->adjMat[i][j] = 1;
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graph->adjMat[j][i] = 1;
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graph->adjMat[j][i] = 1;
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}
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}
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@ -970,137 +1015,22 @@ comments: true
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/* 删除边 */
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/* 删除边 */
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// 参数 i, j 对应 vertices 元素索引
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// 参数 i, j 对应 vertices 元素索引
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void removeEdge(GraphAdjMat *graph, int i, int j) {
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void removeEdge(GraphAdjMat *graph, int i, int j) {
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// 越界检查
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if (i < 0 || j < 0 || i >= graph->size || j >= graph->size || i == j) {
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if (i < 0 || j < 0 || i >= graph->size || j >= graph->size || i == j) {
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printf("Out of range in %s:%d\n", __FILE__, __LINE__);
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fprintf(stderr, "边索引越界或相等\n");
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exit(1);
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return;
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}
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}
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// 删除边
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// 参数 i, j 对应 vertices 元素索引
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graph->adjMat[i][j] = 0;
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graph->adjMat[i][j] = 0;
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graph->adjMat[j][i] = 0;
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graph->adjMat[j][i] = 0;
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}
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}
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/* 添加顶点 */
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/* 打印邻接矩阵 */
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void addVertex(GraphAdjMat *graph, int val) {
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void printGraphAdjMat(GraphAdjMat *graph) {
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// 如果实际使用不大于预设空间,则直接初始化新空间
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printf("顶点列表 = ");
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if (graph->size < graph->capacity) {
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printArray(graph->vertices, graph->size);
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graph->vertices[graph->size] = val; // 初始化新顶点值
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printf("邻接矩阵 =\n");
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for (int i = 0; i < graph->size; i++) {
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for (int i = 0; i < graph->size; i++) {
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graph->adjMat[i][graph->size] = 0; // 邻接矩新列阵置0
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printArray(graph->adjMat[i], graph->size);
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}
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}
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memset(graph->adjMat[graph->size], 0, sizeof(int) * (graph->size + 1)); // 将新增行置 0
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graph->size++;
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return;
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}
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// 扩容,申请新的顶点数组
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int *temp = (int *)malloc(sizeof(int) * (graph->size * 2));
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memcpy(temp, graph->vertices, sizeof(int) * graph->size);
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temp[graph->size] = val;
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// 释放原数组
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free(graph->vertices);
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graph->vertices = temp;
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// 扩容,申请新的二维数组
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int **tempMat = (int **)malloc(sizeof(int *) * graph->size * 2);
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int *tempMatLine = (int *)malloc(sizeof(int) * (graph->size * 2) * (graph->size * 2));
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memset(tempMatLine, 0, sizeof(int) * (graph->size * 2) * (graph->size * 2));
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for (int k = 0; k < graph->size * 2; k++) {
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tempMat[k] = tempMatLine + k * (graph->size * 2);
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}
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for (int i = 0; i < graph->size; i++) {
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memcpy(tempMat[i], graph->adjMat[i], sizeof(int) * graph->size); // 原数据复制到新数组
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}
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for (int i = 0; i < graph->size; i++) {
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tempMat[i][graph->size] = 0; // 将新增列置 0
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}
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memset(tempMat[graph->size], 0, sizeof(int) * (graph->size + 1)); // 将新增行置 0
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// 释放原数组
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free(graph->adjMat[0]);
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free(graph->adjMat);
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// 扩容后,指向新地址
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graph->adjMat = tempMat; // 指向新的邻接矩阵地址
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graph->capacity = graph->size * 2;
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graph->size++;
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}
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/* 删除顶点 */
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void removeVertex(GraphAdjMat *graph, int index) {
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// 越界检查
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if (index < 0 || index >= graph->size) {
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printf("Out of range in %s:%d\n", __FILE__, __LINE__);
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exit(1);
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}
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for (int i = index; i < graph->size - 1; i++) {
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graph->vertices[i] = graph->vertices[i + 1]; // 清除删除的顶点,并将其后所有顶点前移
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}
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graph->vertices[graph->size - 1] = 0; // 将被前移的最后一个顶点置 0
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// 清除邻接矩阵中删除的列
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for (int i = 0; i < graph->size - 1; i++) {
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if (i < index) {
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for (int j = index; j < graph->size - 1; j++) {
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graph->adjMat[i][j] = graph->adjMat[i][j + 1]; // 被删除列后的所有列前移
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}
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} else {
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memcpy(graph->adjMat[i], graph->adjMat[i + 1], sizeof(int) * graph->size); // 被删除行的下方所有行上移
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for (int j = index; j < graph->size; j++) {
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graph->adjMat[i][j] = graph->adjMat[i][j + 1]; // 被删除列后的所有列前移
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}
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}
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}
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graph->size--;
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}
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/* 打印顶点与邻接矩阵 */
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void printGraph(GraphAdjMat *graph) {
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if (graph->size == 0) {
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printf("graph is empty\n");
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return;
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}
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printf("顶点列表 = [");
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for (int i = 0; i < graph->size; i++) {
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if (i != graph->size - 1) {
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printf("%d, ", graph->vertices[i]);
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} else {
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printf("%d", graph->vertices[i]);
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}
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}
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printf("]\n");
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printf("邻接矩阵 =\n[\n");
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for (int i = 0; i < graph->size; i++) {
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printf(" [");
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for (int j = 0; j < graph->size; j++) {
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if (j != graph->size - 1) {
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printf("%u, ", graph->adjMat[i][j]);
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} else {
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printf("%u", graph->adjMat[i][j]);
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}
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}
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printf("],\n");
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}
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printf("]\n");
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}
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/* 构造函数 */
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GraphAdjMat *newGraphAjdMat(int numberVertices, int *vertices, int **adjMat) {
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// 申请内存
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GraphAdjMat *newGraph = (GraphAdjMat *)malloc(sizeof(GraphAdjMat)); // 为图分配内存
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newGraph->vertices = (int *)malloc(sizeof(int) * numberVertices * 2); // 为顶点列表分配内存
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newGraph->adjMat = (int **)malloc(sizeof(int *) * numberVertices * 2); // 为邻接矩阵分配二维内存
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int *temp = (int *)malloc(sizeof(int) * numberVertices * 2 * numberVertices * 2); // 为邻接矩阵分配一维内存
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newGraph->size = numberVertices; // 初始化顶点数量
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newGraph->capacity = numberVertices * 2; // 初始化图容量
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// 配置二维数组
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for (int i = 0; i < numberVertices * 2; i++) {
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newGraph->adjMat[i] = temp + i * numberVertices * 2; // 将二维指针指向一维数组
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}
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// 赋值
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memcpy(newGraph->vertices, vertices, sizeof(int) * numberVertices);
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for (int i = 0; i < numberVertices; i++) {
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memcpy(newGraph->adjMat[i], adjMat[i],
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sizeof(int) * numberVertices); // 将传入的邻接矩阵赋值给结构体内邻接矩阵
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}
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// 返回结构体指针
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return newGraph;
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}
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}
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```
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```
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@ -1967,120 +1897,160 @@ comments: true
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=== "C"
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=== "C"
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```c title="graph_adjacency_list.c"
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```c title="graph_adjacency_list.c"
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/* 基于邻接链表实现的无向图类结构 */
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/* 节点结构体 */
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typedef struct AdjListNode {
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Vertex *vertex; // 顶点
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struct AdjListNode *next; // 后继节点
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} AdjListNode;
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/* 查找顶点对应的节点 */
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AdjListNode *findNode(GraphAdjList *graph, Vertex *vet) {
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for (int i = 0; i < graph->size; i++) {
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if (graph->heads[i]->vertex == vet) {
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return graph->heads[i];
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}
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}
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return NULL;
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}
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/* 添加边辅助函数 */
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void addEdgeHelper(AdjListNode *head, Vertex *vet) {
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AdjListNode *node = (AdjListNode *)malloc(sizeof(AdjListNode));
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node->vertex = vet;
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// 头插法
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node->next = head->next;
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head->next = node;
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}
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/* 删除边辅助函数 */
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void removeEdgeHelper(AdjListNode *head, Vertex *vet) {
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AdjListNode *pre = head;
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AdjListNode *cur = head->next;
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// 在链表中搜索 vet 对应节点
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while (cur != NULL && cur->vertex != vet) {
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pre = cur;
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cur = cur->next;
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}
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if (cur == NULL)
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return;
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// 将 vet 对应节点从链表中删除
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pre->next = cur->next;
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// 释放内存
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free(cur);
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}
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/* 基于邻接表实现的无向图类 */
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typedef struct {
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typedef struct {
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Vertex **vertices; // 邻接表
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AdjListNode *heads[MAX_SIZE]; // 节点数组
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unsigned int size; // 顶点数量
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int size; // 节点数量
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unsigned int capacity; // 顶点容量
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} GraphAdjList;
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} GraphAdjList;
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/* 添加边 */
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/* 构造函数 */
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void addEdge(GraphAdjList *graph, int i, int j) {
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GraphAdjList *newGraphAdjList() {
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// 越界检查
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GraphAdjList *graph = (GraphAdjList *)malloc(sizeof(GraphAdjList));
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if (i < 0 || j < 0 || i == j || i >= graph->size || j >= graph->size) {
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if (!graph) {
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printf("Out of range in %s:%d\n", __FILE__, __LINE__);
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return NULL;
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return;
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}
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}
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// 查找欲添加边的顶点 vet1 - vet2
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graph->size = 0;
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Vertex *vet1 = graph->vertices[i];
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for (int i = 0; i < MAX_SIZE; i++) {
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Vertex *vet2 = graph->vertices[j];
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graph->heads[i] = NULL;
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// 连接顶点 vet1 - vet2
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}
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pushBack(vet1->list, vet2);
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return graph;
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pushBack(vet2->list, vet1);
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}
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/* 析构函数 */
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void delGraphAdjList(GraphAdjList *graph) {
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||||||
|
for (int i = 0; i < graph->size; i++) {
|
||||||
|
AdjListNode *cur = graph->heads[i];
|
||||||
|
while (cur != NULL) {
|
||||||
|
AdjListNode *next = cur->next;
|
||||||
|
if (cur != graph->heads[i]) {
|
||||||
|
free(cur);
|
||||||
|
}
|
||||||
|
cur = next;
|
||||||
|
}
|
||||||
|
free(graph->heads[i]->vertex);
|
||||||
|
free(graph->heads[i]);
|
||||||
|
}
|
||||||
|
free(graph);
|
||||||
|
}
|
||||||
|
|
||||||
|
/* 查找顶点对应的节点 */
|
||||||
|
AdjListNode *findNode(GraphAdjList *graph, Vertex *vet) {
|
||||||
|
for (int i = 0; i < graph->size; i++) {
|
||||||
|
if (graph->heads[i]->vertex == vet) {
|
||||||
|
return graph->heads[i];
|
||||||
|
}
|
||||||
|
}
|
||||||
|
return NULL;
|
||||||
|
}
|
||||||
|
|
||||||
|
/* 添加边 */
|
||||||
|
void addEdge(GraphAdjList *graph, Vertex *vet1, Vertex *vet2) {
|
||||||
|
AdjListNode *head1 = findNode(graph, vet1);
|
||||||
|
AdjListNode *head2 = findNode(graph, vet2);
|
||||||
|
assert(head1 != NULL && head2 != NULL && head1 != head2);
|
||||||
|
// 添加边 vet1 - vet2
|
||||||
|
addEdgeHelper(head1, vet2);
|
||||||
|
addEdgeHelper(head2, vet1);
|
||||||
}
|
}
|
||||||
|
|
||||||
/* 删除边 */
|
/* 删除边 */
|
||||||
void removeEdge(GraphAdjList *graph, int i, int j) {
|
void removeEdge(GraphAdjList *graph, Vertex *vet1, Vertex *vet2) {
|
||||||
// 越界检查
|
AdjListNode *head1 = findNode(graph, vet1);
|
||||||
if (i < 0 || j < 0 || i == j || i >= graph->size || j >= graph->size) {
|
AdjListNode *head2 = findNode(graph, vet2);
|
||||||
printf("Out of range in %s:%d\n", __FILE__, __LINE__);
|
assert(head1 != NULL && head2 != NULL);
|
||||||
return;
|
// 删除边 vet1 - vet2
|
||||||
}
|
removeEdgeHelper(head1, head2->vertex);
|
||||||
// 查找欲删除边的顶点 vet1 - vet2
|
removeEdgeHelper(head2, head1->vertex);
|
||||||
Vertex *vet1 = graph->vertices[i];
|
|
||||||
Vertex *vet2 = graph->vertices[j];
|
|
||||||
// 移除待删除边 vet1 - vet2
|
|
||||||
removeLink(vet1->list, vet2);
|
|
||||||
removeLink(vet2->list, vet1);
|
|
||||||
}
|
}
|
||||||
|
|
||||||
/* 添加顶点 */
|
/* 添加顶点 */
|
||||||
void addVertex(GraphAdjList *graph, int val) {
|
void addVertex(GraphAdjList *graph, Vertex *vet) {
|
||||||
// 若大小超过容量,则扩容
|
assert(graph != NULL && graph->size < MAX_SIZE);
|
||||||
if (graph->size >= graph->capacity) {
|
AdjListNode *head = (AdjListNode *)malloc(sizeof(AdjListNode));
|
||||||
Vertex **tempList = (Vertex **)malloc(sizeof(Vertex *) * 2 * graph->capacity);
|
head->vertex = vet;
|
||||||
memcpy(tempList, graph->vertices, sizeof(Vertex *) * graph->size);
|
head->next = NULL;
|
||||||
free(graph->vertices); // 释放原邻接表内存
|
// 在邻接表中添加一个新链表
|
||||||
graph->vertices = tempList; // 指向新邻接表
|
graph->heads[graph->size++] = head;
|
||||||
graph->capacity = graph->capacity * 2; // 容量扩大至2倍
|
|
||||||
}
|
|
||||||
// 申请新顶点内存并将新顶点地址存入顶点列表
|
|
||||||
Vertex *newV = newVertex(val); // 建立新顶点
|
|
||||||
newV->pos = graph->size; // 为新顶点标记下标
|
|
||||||
newV->list = newLinklist(newV); // 为新顶点建立链表
|
|
||||||
graph->vertices[graph->size] = newV; // 将新顶点加入邻接表
|
|
||||||
graph->size++;
|
|
||||||
}
|
}
|
||||||
|
|
||||||
/* 删除顶点 */
|
/* 删除顶点 */
|
||||||
void removeVertex(GraphAdjList *graph, unsigned int index) {
|
void removeVertex(GraphAdjList *graph, Vertex *vet) {
|
||||||
// 越界检查
|
AdjListNode *node = findNode(graph, vet);
|
||||||
if (index < 0 || index >= graph->size) {
|
assert(node != NULL);
|
||||||
printf("Out of range in %s:%d\n", __FILE__, __LINE__);
|
// 在邻接表中删除顶点 vet 对应的链表
|
||||||
exit(1);
|
AdjListNode *cur = node, *pre = NULL;
|
||||||
|
while (cur) {
|
||||||
|
pre = cur;
|
||||||
|
cur = cur->next;
|
||||||
|
free(pre);
|
||||||
}
|
}
|
||||||
Vertex *vet = graph->vertices[index]; // 查找待删节点
|
// 遍历其他顶点的链表,删除所有包含 vet 的边
|
||||||
if (vet == 0) { // 若不存在该节点,则返回
|
|
||||||
printf("index is:%d\n", index);
|
|
||||||
printf("Out of range in %s:%d\n", __FILE__, __LINE__);
|
|
||||||
return;
|
|
||||||
}
|
|
||||||
// 遍历待删除顶点的链表,将所有与待删除节点有关的边删除
|
|
||||||
Node *temp = vet->list->head->next;
|
|
||||||
while (temp != 0) {
|
|
||||||
removeLink(temp->val->list, vet); // 删除与该顶点有关的边
|
|
||||||
temp = temp->next;
|
|
||||||
}
|
|
||||||
// 将顶点前移
|
|
||||||
for (int i = index; i < graph->size - 1; i++) {
|
|
||||||
graph->vertices[i] = graph->vertices[i + 1]; // 顶点前移
|
|
||||||
graph->vertices[i]->pos--; // 所有前移的顶点索引值减 1
|
|
||||||
}
|
|
||||||
graph->vertices[graph->size - 1] = 0;
|
|
||||||
graph->size--;
|
|
||||||
// 释放内存
|
|
||||||
freeVertex(vet);
|
|
||||||
}
|
|
||||||
|
|
||||||
/* 打印顶点与邻接矩阵 */
|
|
||||||
void printGraph(GraphAdjList *graph) {
|
|
||||||
printf("邻接表 =\n");
|
|
||||||
for (int i = 0; i < graph->size; i++) {
|
for (int i = 0; i < graph->size; i++) {
|
||||||
Node *n = graph->vertices[i]->list->head->next;
|
cur = graph->heads[i];
|
||||||
printf("%d: [", graph->vertices[i]->val);
|
pre = NULL;
|
||||||
while (n != 0) {
|
while (cur) {
|
||||||
if (n->next != 0) {
|
pre = cur;
|
||||||
printf("%d, ", n->val->val);
|
cur = cur->next;
|
||||||
} else {
|
if (cur && cur->vertex == vet) {
|
||||||
printf("%d", n->val->val);
|
pre->next = cur->next;
|
||||||
}
|
free(cur);
|
||||||
n = n->next;
|
break;
|
||||||
}
|
|
||||||
printf("]\n");
|
|
||||||
}
|
}
|
||||||
}
|
}
|
||||||
|
}
|
||||||
/* 构造函数 */
|
// 将该顶点之后的顶点向前移动,以填补空缺
|
||||||
GraphAdjList *newGraphAdjList(unsigned int verticesCapacity) {
|
int i;
|
||||||
// 申请内存
|
for (i = 0; i < graph->size; i++) {
|
||||||
GraphAdjList *newGraph = (GraphAdjList *)malloc(sizeof(GraphAdjList));
|
if (graph->heads[i] == node)
|
||||||
// 建立顶点表并分配内存
|
break;
|
||||||
newGraph->vertices = (Vertex **)malloc(sizeof(Vertex *) * verticesCapacity); // 为顶点列表分配内存
|
}
|
||||||
memset(newGraph->vertices, 0, sizeof(Vertex *) * verticesCapacity); // 顶点列表置 0
|
for (int j = i; j < graph->size - 1; j++) {
|
||||||
newGraph->size = 0; // 初始化顶点数量
|
graph->heads[j] = graph->heads[j + 1];
|
||||||
newGraph->capacity = verticesCapacity; // 初始化顶点容量
|
}
|
||||||
// 返回图指针
|
graph->size--;
|
||||||
return newGraph;
|
free(vet);
|
||||||
}
|
}
|
||||||
```
|
```
|
||||||
|
|
||||||
|
|
|
@ -342,43 +342,73 @@ BFS 通常借助队列来实现。队列具有“先入先出”的性质,这
|
||||||
=== "C"
|
=== "C"
|
||||||
|
|
||||||
```c title="graph_bfs.c"
|
```c title="graph_bfs.c"
|
||||||
/* 广度优先遍历 */
|
/* 节点队列结构体 */
|
||||||
|
typedef struct {
|
||||||
|
Vertex *vertices[MAX_SIZE];
|
||||||
|
int front, rear, size;
|
||||||
|
} Queue;
|
||||||
|
|
||||||
|
/* 构造函数 */
|
||||||
|
Queue *newQueue() {
|
||||||
|
Queue *q = (Queue *)malloc(sizeof(Queue));
|
||||||
|
q->front = q->rear = q->size = 0;
|
||||||
|
return q;
|
||||||
|
}
|
||||||
|
|
||||||
|
/* 判断队列是否为空 */
|
||||||
|
int isEmpty(Queue *q) {
|
||||||
|
return q->size == 0;
|
||||||
|
}
|
||||||
|
|
||||||
|
/* 入队操作 */
|
||||||
|
void enqueue(Queue *q, Vertex *vet) {
|
||||||
|
q->vertices[q->rear] = vet;
|
||||||
|
q->rear = (q->rear + 1) % MAX_SIZE;
|
||||||
|
q->size++;
|
||||||
|
}
|
||||||
|
|
||||||
|
/* 出队操作 */
|
||||||
|
Vertex *dequeue(Queue *q) {
|
||||||
|
Vertex *vet = q->vertices[q->front];
|
||||||
|
q->front = (q->front + 1) % MAX_SIZE;
|
||||||
|
q->size--;
|
||||||
|
return vet;
|
||||||
|
}
|
||||||
|
|
||||||
|
/* 检查顶点是否已被访问 */
|
||||||
|
int isVisited(Vertex **visited, int size, Vertex *vet) {
|
||||||
|
// 遍历查找节点,使用 O(n) 时间
|
||||||
|
for (int i = 0; i < size; i++) {
|
||||||
|
if (visited[i] == vet)
|
||||||
|
return 1;
|
||||||
|
}
|
||||||
|
return 0;
|
||||||
|
}
|
||||||
|
|
||||||
|
/* 广度优先遍历 BFS */
|
||||||
// 使用邻接表来表示图,以便获取指定顶点的所有邻接顶点
|
// 使用邻接表来表示图,以便获取指定顶点的所有邻接顶点
|
||||||
Vertex **graphBFS(GraphAdjList *t, Vertex *startVet) {
|
void graphBFS(GraphAdjList *graph, Vertex *startVet, Vertex **res, int *resSize, Vertex **visited, int *visitedSize) {
|
||||||
// 顶点遍历序列
|
|
||||||
Vertex **res = (Vertex **)malloc(sizeof(Vertex *) * t->size);
|
|
||||||
memset(res, 0, sizeof(Vertex *) * t->size);
|
|
||||||
// 队列用于实现 BFS
|
// 队列用于实现 BFS
|
||||||
Queue *que = newQueue(t->size);
|
Queue *queue = newQueue();
|
||||||
// 哈希表,用于记录已被访问过的顶点
|
enqueue(queue, startVet);
|
||||||
HashTable *visited = newHash(t->size);
|
visited[(*visitedSize)++] = startVet;
|
||||||
int resIndex = 0;
|
|
||||||
queuePush(que, startVet); // 将第一个元素入队
|
|
||||||
hashMark(visited, startVet->pos); // 标记第一个入队的顶点
|
|
||||||
// 以顶点 vet 为起点,循环直至访问完所有顶点
|
// 以顶点 vet 为起点,循环直至访问完所有顶点
|
||||||
while (que->head < que->tail) {
|
while (!isEmpty(queue)) {
|
||||||
// 遍历该顶点的边链表,将所有与该顶点有连接的,并且未被标记的顶点入队
|
Vertex *vet = dequeue(queue); // 队首顶点出队
|
||||||
Node *n = queueTop(que)->list->head->next;
|
res[(*resSize)++] = vet; // 记录访问顶点
|
||||||
while (n != 0) {
|
// 遍历该顶点的所有邻接顶点
|
||||||
// 查询哈希表,若该索引的顶点已入队,则跳过,否则入队并标记
|
AdjListNode *node = findNode(graph, vet);
|
||||||
if (hashQuery(visited, n->val->pos) == 1) {
|
while (node != NULL) {
|
||||||
n = n->next;
|
// 跳过已被访问过的顶点
|
||||||
continue; // 跳过已被访问过的顶点
|
if (!isVisited(visited, *visitedSize, node->vertex)) {
|
||||||
|
enqueue(queue, node->vertex); // 只入队未访问的顶点
|
||||||
|
visited[(*visitedSize)++] = node->vertex; // 标记该顶点已被访问
|
||||||
}
|
}
|
||||||
queuePush(que, n->val); // 只入队未访问的顶点
|
node = node->next;
|
||||||
hashMark(visited, n->val->pos); // 标记该顶点已被访问
|
|
||||||
}
|
}
|
||||||
// 队首元素存入数组
|
|
||||||
res[resIndex] = queueTop(que); // 队首顶点加入顶点遍历序列
|
|
||||||
resIndex++;
|
|
||||||
queuePop(que); // 队首元素出队
|
|
||||||
}
|
}
|
||||||
// 释放内存
|
// 释放内存
|
||||||
freeQueue(que);
|
free(queue);
|
||||||
freeHash(visited);
|
|
||||||
resIndex = 0;
|
|
||||||
// 返回顶点遍历序列
|
|
||||||
return res;
|
|
||||||
}
|
}
|
||||||
```
|
```
|
||||||
|
|
||||||
|
@ -749,39 +779,37 @@ BFS 通常借助队列来实现。队列具有“先入先出”的性质,这
|
||||||
=== "C"
|
=== "C"
|
||||||
|
|
||||||
```c title="graph_dfs.c"
|
```c title="graph_dfs.c"
|
||||||
|
/* 检查顶点是否已被访问 */
|
||||||
|
int isVisited(Vertex **res, int size, Vertex *vet) {
|
||||||
|
// 遍历查找节点,使用 O(n) 时间
|
||||||
|
for (int i = 0; i < size; i++) {
|
||||||
|
if (res[i] == vet) {
|
||||||
|
return 1;
|
||||||
|
}
|
||||||
|
}
|
||||||
|
return 0;
|
||||||
|
}
|
||||||
|
|
||||||
/* 深度优先遍历 DFS 辅助函数 */
|
/* 深度优先遍历 DFS 辅助函数 */
|
||||||
int resIndex = 0;
|
void dfs(GraphAdjList *graph, Vertex **res, int *resSize, Vertex *vet) {
|
||||||
void dfs(GraphAdjList *graph, HashTable *visited, Vertex *vet, Vertex **res) {
|
// 记录访问顶点
|
||||||
if (hashQuery(visited, vet->pos) == 1) {
|
res[(*resSize)++] = vet;
|
||||||
return; // 跳过已被访问过的顶点
|
// 遍历该顶点的所有邻接顶点
|
||||||
}
|
AdjListNode *node = findNode(graph, vet);
|
||||||
hashMark(visited, vet->pos); // 标记顶点并将顶点存入数组
|
while (node != NULL) {
|
||||||
res[resIndex] = vet; // 将顶点存入数组
|
// 跳过已被访问过的顶点
|
||||||
resIndex++;
|
if (!isVisited(res, *resSize, node->vertex)) {
|
||||||
// 遍历该顶点链表
|
|
||||||
Node *n = vet->list->head->next;
|
|
||||||
while (n != 0) {
|
|
||||||
// 递归访问邻接顶点
|
// 递归访问邻接顶点
|
||||||
dfs(graph, visited, n->val, res);
|
dfs(graph, res, resSize, node->vertex);
|
||||||
n = n->next;
|
}
|
||||||
|
node = node->next;
|
||||||
}
|
}
|
||||||
return;
|
|
||||||
}
|
}
|
||||||
|
|
||||||
/* 深度优先遍历 DFS */
|
/* 深度优先遍历 DFS */
|
||||||
// 使用邻接表来表示图,以便获取指定顶点的所有邻接顶点
|
// 使用邻接表来表示图,以便获取指定顶点的所有邻接顶点
|
||||||
Vertex **graphDFS(GraphAdjList *graph, Vertex *startVet) {
|
void graphDFS(GraphAdjList *graph, Vertex *startVet, Vertex **res, int *resSize) {
|
||||||
// 顶点遍历序列
|
dfs(graph, res, resSize, startVet);
|
||||||
Vertex **res = (Vertex **)malloc(sizeof(Vertex *) * graph->size);
|
|
||||||
memset(res, 0, sizeof(Vertex *) * graph->size);
|
|
||||||
// 哈希表,用于记录已被访问过的顶点
|
|
||||||
HashTable *visited = newHash(graph->size);
|
|
||||||
dfs(graph, visited, startVet, res);
|
|
||||||
// 释放哈希表内存并将数组索引归零
|
|
||||||
freeHash(visited);
|
|
||||||
resIndex = 0;
|
|
||||||
// 返回遍历数组
|
|
||||||
return res;
|
|
||||||
}
|
}
|
||||||
```
|
```
|
||||||
|
|
||||||
|
|
|
@ -1164,7 +1164,7 @@ comments: true
|
||||||
Node **buckets; // 桶数组
|
Node **buckets; // 桶数组
|
||||||
} HashMapChaining;
|
} HashMapChaining;
|
||||||
|
|
||||||
/* 构造方法 */
|
/* 构造函数 */
|
||||||
HashMapChaining *initHashMapChaining() {
|
HashMapChaining *initHashMapChaining() {
|
||||||
HashMapChaining *hashMap = (HashMapChaining *)malloc(sizeof(HashMapChaining));
|
HashMapChaining *hashMap = (HashMapChaining *)malloc(sizeof(HashMapChaining));
|
||||||
hashMap->size = 0;
|
hashMap->size = 0;
|
||||||
|
@ -1178,7 +1178,7 @@ comments: true
|
||||||
return hashMap;
|
return hashMap;
|
||||||
}
|
}
|
||||||
|
|
||||||
/* 析构方法 */
|
/* 析构函数 */
|
||||||
void freeHashMapChaining(HashMapChaining *hashMap) {
|
void freeHashMapChaining(HashMapChaining *hashMap) {
|
||||||
for (int i = 0; i < hashMap->capacity; i++) {
|
for (int i = 0; i < hashMap->capacity; i++) {
|
||||||
Node *cur = hashMap->buckets[i];
|
Node *cur = hashMap->buckets[i];
|
||||||
|
@ -2682,7 +2682,7 @@ comments: true
|
||||||
Pair *TOMBSTONE; // 删除标记
|
Pair *TOMBSTONE; // 删除标记
|
||||||
} HashMapOpenAddressing;
|
} HashMapOpenAddressing;
|
||||||
|
|
||||||
/* 构造方法 */
|
/* 构造函数 */
|
||||||
HashMapOpenAddressing *newHashMapOpenAddressing() {
|
HashMapOpenAddressing *newHashMapOpenAddressing() {
|
||||||
HashMapOpenAddressing *hashMap = (HashMapOpenAddressing *)malloc(sizeof(HashMapOpenAddressing));
|
HashMapOpenAddressing *hashMap = (HashMapOpenAddressing *)malloc(sizeof(HashMapOpenAddressing));
|
||||||
hashMap->size = 0;
|
hashMap->size = 0;
|
||||||
|
@ -2697,7 +2697,7 @@ comments: true
|
||||||
return hashMap;
|
return hashMap;
|
||||||
}
|
}
|
||||||
|
|
||||||
/* 析构方法 */
|
/* 析构函数 */
|
||||||
void delHashMapOpenAddressing(HashMapOpenAddressing *hashMap) {
|
void delHashMapOpenAddressing(HashMapOpenAddressing *hashMap) {
|
||||||
for (int i = 0; i < hashMap->capacity; i++) {
|
for (int i = 0; i < hashMap->capacity; i++) {
|
||||||
Pair *pair = hashMap->buckets[i];
|
Pair *pair = hashMap->buckets[i];
|
||||||
|
|
|
@ -259,33 +259,49 @@ comments: true
|
||||||
=== "TS"
|
=== "TS"
|
||||||
|
|
||||||
```typescript title="top_k.ts"
|
```typescript title="top_k.ts"
|
||||||
[class]{}-[func]{pushMinHeap}
|
/* 元素入堆 */
|
||||||
|
function pushMinHeap(maxHeap: MaxHeap, val: number): void {
|
||||||
|
// 元素取反
|
||||||
|
maxHeap.push(-val);
|
||||||
|
}
|
||||||
|
|
||||||
[class]{}-[func]{popMinHeap}
|
/* 元素出堆 */
|
||||||
|
function popMinHeap(maxHeap: MaxHeap): number {
|
||||||
|
// 元素取反
|
||||||
|
return -maxHeap.pop();
|
||||||
|
}
|
||||||
|
|
||||||
[class]{}-[func]{peekMinHeap}
|
/* 访问堆顶元素 */
|
||||||
|
function peekMinHeap(maxHeap: MaxHeap): number {
|
||||||
|
// 元素取反
|
||||||
|
return -maxHeap.peek();
|
||||||
|
}
|
||||||
|
|
||||||
[class]{}-[func]{getMinHeap}
|
/* 取出堆中元素 */
|
||||||
|
function getMinHeap(maxHeap: MaxHeap): number[] {
|
||||||
|
// 元素取反
|
||||||
|
return maxHeap.getMaxHeap().map((num: number) => -num);
|
||||||
|
}
|
||||||
|
|
||||||
/* 基于堆查找数组中最大的 k 个元素 */
|
/* 基于堆查找数组中最大的 k 个元素 */
|
||||||
function topKHeap(nums: number[], k: number): number[] {
|
function topKHeap(nums: number[], k: number): number[] {
|
||||||
// 将堆中所有元素取反,从而用大顶堆来模拟小顶堆
|
// 初始化小顶堆
|
||||||
const invertedNums = nums.map((num) => -num);
|
// 请注意:我们将堆中所有元素取反,从而用大顶堆来模拟小顶堆
|
||||||
|
const maxHeap = new MaxHeap([]);
|
||||||
// 将数组的前 k 个元素入堆
|
// 将数组的前 k 个元素入堆
|
||||||
const heap = new MaxHeap(invertedNums.slice(0, k));
|
for (let i = 0; i < k; i++) {
|
||||||
|
pushMinHeap(maxHeap, nums[i]);
|
||||||
|
}
|
||||||
// 从第 k+1 个元素开始,保持堆的长度为 k
|
// 从第 k+1 个元素开始,保持堆的长度为 k
|
||||||
for (let i = k; i < invertedNums.length; i++) {
|
for (let i = k; i < nums.length; i++) {
|
||||||
// 若当前元素小于堆顶元素,则将堆顶元素出堆、当前元素入堆
|
// 若当前元素大于堆顶元素,则将堆顶元素出堆、当前元素入堆
|
||||||
if (invertedNums[i] < heap.peek()) {
|
if (nums[i] > peekMinHeap(maxHeap)) {
|
||||||
heap.pop();
|
popMinHeap(maxHeap);
|
||||||
heap.push(invertedNums[i]);
|
pushMinHeap(maxHeap, nums[i]);
|
||||||
}
|
}
|
||||||
}
|
}
|
||||||
// 取出堆中元素
|
// 返回堆中元素
|
||||||
const maxHeap = heap.getMaxHeap();
|
return getMinHeap(maxHeap);
|
||||||
// 对堆中元素取相反数
|
|
||||||
const invertedMaxHeap = maxHeap.map((num) => -num);
|
|
||||||
return invertedMaxHeap;
|
|
||||||
}
|
}
|
||||||
```
|
```
|
||||||
|
|
||||||
|
|
Loading…
Reference in a new issue