给定左上角和右下角座标,将矩阵切割成一个个小矩形,依次遍历输出,注意有可能e同行或同列的情况
public static void spiralOrderPrint(int[][] matrix) {
int tR = 0;
int tC = 0;
int dR = matrix.length - 1;
int dC = matrix[0].length - 1;
while (tR <= dR && tC <= dC) {
printEdge(matrix, tR++, tC++, dR--, dC--);
}
}
/**
*tR 左上角行
*tC 左上角列
*dR 右下角行
*dC 右下角列
*/
public static void printEdge(int[][] m, int tR, int tC, int dR, int dC) {
if (tR == dR) {//同行,则从左到右输出
for (int i = tC; i <= dC; i++) {
System.out.print(m[tR][i] + " ");
}
} else if (tC == dC) {//同列,则从上到下输出
for (int i = tR; i <= dR; i++) {
System.out.print(m[i][tC] + " ");
}
} else {//若构成一个矩形
int curC = tC;
int curR = tR;
while (curC != dC) {
System.out.print(m[tR][curC] + " ");
curC++;
}
while (curR != dR) {
System.out.print(m[curR][dC] + " ");
curR++;
}
while (curC != tC) {
System.out.print(m[dR][curC] + " ");
curC--;
}
while (curR != tR) {
System.out.print(m[curR][tC] + " ");
curR--;
}
}
}
正方形旋转也是同上思路,不过要扣边界
public static void rotate(int[][] matrix) {
int tR = 0;
int tC = 0;
int dR = matrix.length - 1;
int dC = matrix[0].length - 1;
while (tR < dR) {
rotateEdge(matrix, tR++, tC++, dR--, dC--);
}
}
public static void rotateEdge(int[][] m, int tR, int tC, int dR, int dC) {
int times = dC - tC;
int tmp = 0;
for (int i = 0; i != times; i++) {
tmp = m[tR][tC + i];
m[tR][tC + i] = m[dR - i][tC];
m[dR - i][tC] = m[dR][dC - i];
m[dR][dC - i] = m[tR + i][dC];
m[tR + i][dC] = tmp;
}
}
public static void printMatrixZigZag(int[][] matrix) {
int tR = 0;
int tC = 0;
int dR = 0;
int dC = 0;
int endR = matrix.length - 1;
int endC = matrix[0].length - 1;
boolean fromUp = false;
while (tR != endR + 1) {
printLevel(matrix, tR, tC, dR, dC, fromUp);
tR = tC == endC ? tR + 1 : tR;
tC = tC == endC ? tC : tC + 1;
dC = dR == endR ? dC + 1 : dC;
dR = dR == endR ? dR : dR + 1;
fromUp = !fromUp;
}
System.out.println();
}
public static void printLevel(int[][] m, int tR, int tC, int dR, int dC,
boolean f) {
if (f) {
while (tR != dR + 1) {
System.out.print(m[tR++][tC--] + " ");
}
} else {
while (dR != tR - 1) {
System.out.print(m[dR--][dC++] + " ");
}
}
}
public static void main(String[] args) {
int[][] matrix = { { 1, 2, 3, 4 }, { 5, 6, 7, 8 }, { 9, 10, 11, 12 } };
printMatrixZigZag(matrix);
}
最经典的就是三目运算,将每个点与其他点联系起来
行和列排好序,要求时间O(N+M),空间O1